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Quantum optics beam splitter experiments study how single photons, photon pairs, and quantum states of light behave when they meet a partially transmitting optical element. A beam splitter is simple in classical optics, but in quantum optics it reveals interference, indistinguishability, phase relations, and entanglement.

Important examples include Mach-Zehnder interferometry, Hong-Ou-Mandel interference, linear optical quantum computing, and integrated photonic chips. These experiments show how quantum amplitudes combine at optical components and why single-photon paths cannot always be interpreted as ordinary classical alternatives. The page connects beam splitters to quantum information, quantum communication, and modern photonic technology.

Introduction to the beam splitter in quantum optics

Historical developments in beam splitting range from Fizeau’s 1851^[1] interference measurements to the development of the Michelson interferometer. The transition to the quantum regime occurred in 1987 with the first experimental demonstration of the HOM effect.^[2] The KLM protocol(2001) demonstrated that universal linear optical quantum computing is possible by using only beam splitters, phase shifters, and single-photon detectors.It uses a process called Measurement-Induced Nonlinearity.^[3]^[4]

Recent years

Have witnessed significant progress in quantum communication and quantum internet with the emerging quantum photonic chips, whose characteristics of scalability, stability, and low cost, open up new possibilities in miniaturized essentials. This provides an overview of the advances in quantum photonic chips for quantum communication, beginning with a summary of the prevalent photonic integrated fabrication platforms and key components for integrated quantum communication systems. Then discusses a range of quantum communication applications, such as quantum key distribution and quantum teleportation. Finally, the review culminates with a perspective on challenges towards high-performance chip-based quantum communication, as well as a glimpse into future opportunities for integrated quantum networks. Recent advancements in integrated quantum photonics focus on on-chip beam splitters fabricated on silicon, silicon nitride, and femtosecond-laser-written waveguides. These platforms enable high-fidelity interference (visibilities $0.97$ ), even when utilizing independent molecular single-photon sources^[5]^[6]^[7] important for the scalability of the quantum internet.^[8]^[9]

Keywords:

Beam splitter, Integrated photonics, Quantum information,waveguide beam splitter, quantum entanglement, photons, reflection coefficient, phase shift, photon statistics, Hong-Ou-Mandel effect.

Quantum optical classifier

Superexponential speedup classification is a central task in deep learning algorithms. Usually, images are first captured and then processed by a sequence of operations, of which the artificial neuron represents one of the fundamental units. This paradigm requires significant resources that scale (at least) linearly in the image resolution, both in terms of photons and computational operations. Present is a quantum optical pattern recognition method for binary classification tasks. It classifies objects without reconstructing their images, using the rate of two-photon coincidences at the output of a Hong-Ou-Mandel interferometer, where both the input and the classifier parameters are encoded into single-photon states. This method exhibits the behaviour of a classical neuron of unit depth. Once trained, it shows a constant $𝒪 (1)$ complexity in the number of computational operations and photons required by a single classification. This is a superexponential advantage over a classical artificial neuron.

On-chip integration

Of independent channels of indistinguishable single photons is a prerequisite for scalable optical quantum information processing. This requires separate solid-state single-photon emitters to exhibit identical lifetime-limited transitions. This challenging task is usually further exacerbated by spectral diffusion due to complex charge noise near material surfaces made by nanofabrication processes. A molecular quantum photonic chip that demonstrate on-chip Hong–Ou–Mandel quantum interference of indistinguishable single photons from independent molecules is developed. The molecules are embedded in a single-crystalline organic nanosheet and integrated with single-mode waveguides without nanofabrication, thereby ensuring stable, lifetime-limited transitions. With the aid of Stark tuning, 100 waveguide-coupled molecules can be tuned to the same frequency and achieve on-chip Hong–Ou–Mandel interference visibilities exceeding 0.97 for 2 molecules separately coupled to 2 waveguides. For two molecules with a controlled frequency difference, over 100-µs-long quantum beating in the interference, showing both excellent single-photon purity (particle nature) and long coherence (wave nature) of the emission.The results show a possible strategy towards constructing scalable optical universal quantum processors and a promising platform for studying waveguide quantum electrodynamics with identical single emitters wired via photonic circuits.

Integrated Photonics in Quantum Technologies

Integrated photonics in quantum technologies ^[10]^[11]. The advantages of single-photon state encoding are several and include the lack of decoherence phenomena, the possibility to realize information processing at room temperature and to send photons through fibers and free space channels. In the last ten years, improvements in photonic quantum technologies enabled an increase in the complexity of the implemented system, supporting relevant advances in various branches of quantum information, including the demonstration of quantum advantage ^[12]^[13]^[14] and satellite quantum communications ^[15]^[16].
Indistinguishable single photons are a fundamental resource for optical quantum technologies^[5]^[6]^[17], underpinning universal quantum computing, quantum simulation and quantum networks. Although recent demonstrations of some preliminary quantum photonic applications primarily rely on parametric-process-based single-photon sources^[18]^[19], deterministic sources offer greater future promise^[6]^[20]^[21]^[22]^[23]. Solid-state single-quantum emitters, such as quantum dots^[6]^[23], colour centres^[24]^[25]^[26]^[27] and organic molecules^[28]^[29], could serve as a versatile platform

Overview

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Video depicting the quantum teleportation protocol. The goal is to send a quantum state Q from one station, A, to another station, B. At first, a pair of entangled particles is distributed to A and B, which pair is shown as two particles connected by a wavy line and produced by source S. Once this preparation step is finished, the quantum teleportation itself begins. Station A measures its entangled particle together with the particle in state Q and obtains one of four possible results. These results are represented by different positions of an arrow in a "clock". The result is communicated to station B via the classical channel, represented as "radio waves". Based on the received message, station B chooses an appropriate device and applies it to its particle. In the video, the specific result measured by A is represented by an arrow pointing to the bottom right corner and so station B applies the bottom-right device. After the particle leaves the device, its state is Q, which is equal to the original state of the particle at station A. This way, the quantum teleportation of state Q is successfully completed.

Quantum states of light are basic resources for the realization of quantum information processing tasks, starting from pioneering experiments of quantum non-locality and quantum teleportation^[30]^[31] and extending to modern quantum communication and computation efforts. The transition from bulk optics to integrated photonic circuits has been essential for scaling these technologies, enabling the miniaturization of complex interferometric networks on a single chip. The advantages of single-photon encoding include resistance to decoherence effects, the possibility of operation in an ambient temperature environment, and the ability to transfer photons via an optical fiber as well as free space communication links. The last decade has marked a growing complexity of photonic quantum technology efforts that have made possible the enhancement of quantum advantage experiments^[11]^[12]^[13] and quantum communication via satellites ^[14]^[15]

An essential enabling technology in these advances is the coupling of photonic device components supporting the generation, manipulation, and detection of quantum states ^[16]^[32]^[33]. On-chip integration of independent channels of indistinguishable single photons is a prerequisite for scalable optical quantum information processing. Integrated photonics enables the realization of waveguides and reconfigurable optical components, which in turn make possible multi-port reprogrammable optical networks, and most recently, integrated processors merging both quantum state preparation and quantum processing. A molecular quantum photonic chip has been developed, demonstrating on-chip Hong–Ou–Mandel quantum interference of indistinguishable single photons emitted from independent molecules..This requires separate solid-state single-photon emitters to exhibit identical lifetime-limited transitions.While the integration of single-photon detectors is still a challenge, some very promising advances have been made in recent years towards fully integrated photonic platforms. Compared to conventional discrete optical platforms, which demand a very careful alignment of discrete components, experience stability problems, and face cost scalability, quantum photonic chips on a microchip offer advantages in miniaturization, scalability, stability, and potentially low cost mass production. In this sense, quantum photonic chips constitute a highly promising platform for applied quantum communication, specifically in quantum key distribution (QKD), quantum secure direct communication, quantum teleportation^[34]^[35] , and, in general, in quantum networks.

Of all the necessary components of an integrated photonic circuit, beam splitter (BS) is an integral part of it. The theoretical foundations of BS in quantum optics and its relation to photon statistics, entanglement, and other phenomena like Hong-Ou-Mandel effect have long been established. The recent theoretical interest has particularly underscored how waveguide BSs can differ in terms of reflection and transmission coefficients for different frequencies, going against the conventional way of designing a beam splitter. As waveguide BSs play a vital role in designing scaled-down and scalable quantum optical components, a thorough understanding of both conventional and frequency-dependent beam splitters is necessary for carrying out experiments in integrated quantum communication.
An interactive simulation of quantum teleportation in the Virtual Lab by Quantum Flytrap,

History

Key milestones:

1851: The Fizeau experiment to measure the speeds of light in water. The Fizeau experiment, conducted by French physicist Hippolyte Fizeau (1819–1896), was a test to determine how the motion of a medium (water) affects the speed of light propagating through it. This was not a direct measurement of the absolute speed of light in stationary water (that had been approximated earlier), but rather an investigation into the relative speeds of light traveling with and against the flow of moving water.^[1]
1965: Angular momentum theory applied to optical fields, foundational for BS symmetries.^[36]
1966: Density operators for coherent fields at BS, enabling statistical analysis.^[37]
1981: General properties of lossless BS in interferometry.^[38]
1987: Experimental observation of HOM effect, demonstrating two-photon bunching and quantum interference.^[2]
1989: SU(2) symmetry and photon statistics for lossless BS.^[39]
1995: Unitary quantum description of BS.^[40]
2001: KLM protocol for efficient quantum computation with linear optics, establishing scalability using beam splitters, single-photon sources, and detectors.^[4]^[3]
2002: Demonstration that nonclassical inputs are required for BS-generated entanglement.^[41]
2008: Silica-on-silicon waveguide quantum circuits, advancing integrated photonic implementations of BS.^[42]
2018–2020: Theoretical models of frequency-dependent effects in waveguide BS, including fluctuations in HOM detection.^[43]^[44]
2020–2021: Quantum entanglement and reflection coefficients in coupled waveguide BS models; frequency-dependent theory for waveguide BS.^[45]^[46]^[47]
2022: Quantum entanglement for monochromatic and non-monochromatic photons on waveguide BS; comprehensive review systematizing conventional vs. frequency-dependent BS.^[48]

This timeline highlights the historical development from foundational quantum formulas to the recognition of frequency-dependent effects in waveguide implementations, which are important for scalable quantum technologies.

Summary of the features of the principal fabrication technologies for what concerns the operating wavelengths, circuits geometry, integration of sources and detectors, and the interface with external fibers.

Theoretical Framework

In quantum optics, the mathematical description of a beam splitter describes how the incoming annihilation operators ${\hat{a}}_{1}$ and ${\hat{a}}_{2}$ are transformed into the outgoing operators ${\hat{b}}_{1}$ and ${\hat{b}}_{2}$ by means of a unitary matrix. For a traditional beam splitter, this transformation can be written as

$(\begin{matrix} {\hat{b}}_{1} \\ {\hat{b}}_{2} \end{matrix}) = U_{BS} (\begin{matrix} {\hat{a}}_{1} \\ {\hat{a}}_{2} \end{matrix}),$

where the unitary matrix is given by

$U_{BS} = (\begin{matrix} \sqrt{T} e^{i ϕ} & \sqrt{R} \\ - \sqrt{R} e^{- i ϕ} & \sqrt{T} \end{matrix}) .$

In these expressions, $T$ , $R$ , and $ϕ$ represent the transmission coefficient, reflection coefficient, and relative phase, respectively. The unitary nature of $U_{BS}$ guarantees that bosonic commutation relations are preserved.

In the angular-momentum representation, the action of the beam splitter corresponds to an SU(2) rotation generated by angular momentum operators ${\hat{L}}_{i}$ . The associated rotation angles are determined by the reflectivity $R$ and the phase $ϕ$ .

For non-monochromatic light, the spectral degrees of freedom must also be taken into account. In this case, the output quantum state depends on the joint spectral amplitude function $φ (ω_{1}, ω_{2})$ , which must be integrated over the relevant frequency variables.

Frequency-dependent beam splitters, commonly encountered in waveguide couplers, can be derived using coupled-mode theory. Within this framework, both the reflection coefficient $R$ and the phase $ϕ$ depend explicitly on the frequencies $ω_{1}$ and $ω_{2}$ . A representative expression for the reflection coefficient is

$R = \sin^{2} (\frac{Ω t_{BS}}{2 \sqrt{1 + ε^{2}}}) (1 + ε^{2}),$

where

$ε = \frac{ω_{2} - ω_{1}}{Ω},$

$Ω$ characterizes the coupling strength between the modes, and $t_{BS}$ denotes the effective interaction time.

This spectral dependence significantly influences quantum interference and entanglement properties. To observe genuinely quantum effects, non-classical input states such as Fock states or squeezed states are required. Measures of entanglement, including concurrence, decrease when the spectral overlap between modes is limited.

Photon-number statistics also depend on both the input state and the spectral structure. Coherent states exhibit Poissonian statistics, whereas non-classical states can display sub-Poissonian or super-Poissonian behavior. In multimode fields, frequency selectivity can lead to partial photon bunching.

A prominent example of such interference phenomena is the Hong–Ou–Mandel (HOM) effect, in which two identical photons incident on a beam splitter tend to bunch together, resulting in suppressed coincidence counts. When the beam splitter is frequency dependent, spectral variations reduce the visibility of the Hong–Ou–Mandel dip. Generalizations of this effect include formulations based on wave packets as well as analogous interference phenomena involving fermions.

The beam splitter

Dates to classical interferometry in the 19th century (e.g., Michelson interferometer). Quantum applications emerged mid-20th century with quantum electrodynamics and lasers, The Hong-Ou-Mandel effect first demonstrated in 1987^[2] ^[49]^[50]^[51]. Entanglement by a beam splitter (2002) ^[41] . Quantum entanglement and reflection coefficient for coupled harmonic oscillators (2020)^[46]. Quantum entanglement and statistics of photons on a beam splitter in the form of coupled waveguides (2022) ^[47].
Beam Splitters (BS) have a variety of forms, such as a glass plate with a coat of silver or a thin dielectric film, a glass prism with a coat along its diagonal, two parallel glass plates with a coat in between, or a thin film with a deposited coat. Waveguide BSs are formed by bringing two waveguides side by side so that their electromagnetic fields interact with each other^[4].

Beam splitters vary by design and frequency dependence.^[52]^[53]

Waveguide BS (directional couplers):
Evanescent coupling between waveguides, R(ω) = sin²(κ(ω)L).^[54]^[55]^[56]^[57]^[58]^[59]^[60]

Waveguide BS:
enable integration in photonic chips for quantum technologies.^[61]^[62]^[63]

Conventional beam splitters:
Cube, plate, or pellicle BS with nearly constant R, T, φ over bandwidths. Used in free-space experiments.^[64]^[65]^[66]^[67]^[68]

Frequency-dependent beam splitters:
Coupled-mode theory: dâ₁/dz = -i δ â₁ - i κ â₂, yielding frequency-dependent U_ij(ω).^[69]^[45]^[47]^[48]

Theory of Waveguide Beam Splitters

While classical beam splitters are often treated as constant, the scattering matrix for a waveguide beam splitter is explicitly frequency-dependent. The transformation of input modes into output modes is represented as:
$(\begin{matrix} {\hat{a}}_{out, 1} \\ {\hat{a}}_{out, 2} \end{matrix}) = (\begin{matrix} R (ω) & T (ω) \\ - T^{*} (ω) & R (ω) \end{matrix}) (\begin{matrix} {\hat{a}}_{in, 1} \\ {\hat{a}}_{in, 2} \end{matrix})$
Here, the reflection $R (ω)$ and transmission $T (ω)$ coefficients are determined by the coupling constant and the interaction length within the waveguide. This frequency dependence is crucial for accurately describing the interference of non-monochromatic single photons. ^[48]

Waveguide BS

Has some important advantages over a conventional BS: they are significantly more compact and have other advantages in terms of performance and integration^[42]. BS can be classified in different ways, including their characteristics, such as polarizing BS and non-polarizing BS, and other distinct characteristics^[38]. A BS in quantum optics can be described regardless of its physical implementation, as shown in Figure 1(a); BS illustrations vary based on BS type, as in Figure 1(b)^[70]. In quantum optics, aluminium-coated beam splitters Figure 1(c) ^[71] are often modeled as ideal two-port devices characterized solely by 𝑅 R, 𝑇 T, and a relative phase shift 𝜙 ϕ between reflected and transmitted fields. The metallic coating introduces a well-defined phase relation between the output modes, allowing such beam splitters to be used in interference experiments, including Hong–Ou–Mandel–type configurations, despite their intrinsic losses.

Two main parameters characterizing a BS in quantum optics are the reflection coefficient $R$ (or transmission coefficient $T$ , which satisfies $R + T = 1$ ) and the phase angle $ϕ$ ^[39]. In conventional reviews of quantum optics, during calculations concerning the behavior of photons (or electromagnetic waves) in the output ports or in devices incorporating a BS, parameters $R$ and $ϕ$ are considered to be definite numbers^[72].

For instance, in the Hong–Ou–Mandel (HOM) effect, an equal splitter with $R = T = \frac{1}{2}$ is used, which is independent of $ϕ$ ^[2]. $R$ and $ϕ$ are functions of the wavelength or frequency of the incoming light, and $R = R (λ)$ and $ϕ = ϕ (λ)$ in both cases, regardless of which BS is used^[45]. If a fixed wavelength or a small frequency band is used in the experiment, this dependency can be ignored, and the output photons can be considered constant. This has long been considered self-evident^[72].

However, in some cases, $R$ and $ϕ$ are not constant by definition, and their frequency dependence is strong enough to affect, in a substantial way, the quantum state of light waves distributed in the output ports. Phenomena related to entanglement of light waves in a BS, unlike in the constant-parameter setting, behave differently if waveguide BSs (further referred to as fiber-optic BSs) are considered, since they differ from other BSs in this respect^[45]^[47].

There is a theoretical basis for frequency-dependent waveguide BS. It shows that for a waveguide model interpreted as two coupled waveguides, the amplitude reflection and transmission coefficients $R$ and $T$ become frequency-dependent for the photons entering the BS^[45]. Accounting for this frequency dependence requires corrections to established theories, such as HOM interferometer fringe analysis^[43]^[44] and BS-generated entanglement of photons^[47]^[48]. This pronounced frequency dependence of $R$ and $T$ is a distinct characteristic of waveguide BSs^[45].

There is a need for a comprehensive analysis that classifies BS in quantum optics into two types: conventional (frequency-independent) and frequency-dependent. Based on this classification, researchers can examine differences in photon entanglement at the output ports. The present analysis performs exactly this, considering entanglement, photon statistics at the outputs, and the HOM effect^[47]^[43].

Beam splitter in quantum optics

Beam splitters also enable quantum optical neural networks for tasks like image classification and optimal quantum cloning, offering variational quantum algorithms and perceptron models that exploit entanglement for supervised learning.^[73]^[74]^[75]^[76]^[77]^[78] Photonics-based implementations further integrate nonlinear activations and diffractive networks for all-optical machine learning.^[79]^[80]^[81]^[82] Recent QML models address barren plateaus and demonstrate quantum verification of NP problems.^[83]^[84]^[85]"

Since a beam splitter (BS) separates incoming beams, the quantum state of photons at the BS output ports is given by

$| o u t ⟩ = e^{i \hat{H} t_{B S}} | i n ⟩,$

where $\hat{H}$ is the Hamiltonian of the quantized electromagnetic field interacting with matter, $t_{B S}$ is the interaction time, and $| i n ⟩$ is the initial state of the electromagnetic field. $\hat{H}$ can be quite complex, depending on the type of beam splitter.

In general, the initial state can be represented as ^[86]^[37]

$| i n ⟩ = \sum_{s_{1}, s_{2}} C_{s_{1}, s_{2}} \frac{1}{\sqrt{s_{1}! s_{2}!}} ({\hat{a}}_{1}^{†})^{s_{1}} ({\hat{a}}_{2}^{†})^{s_{2}} | 0 ⟩_{1} | 0 ⟩_{2},$ _{(Eq. (1))}

where the creation operators of the first and second modes are ${\hat{a}}_{1}^{†}$ and $\hat{a} 2^{†}$ , respectively. The integers $s_{1}$ and $s_{2}$ are the quantum numbers of the first and second modes (i.e. the number of photons in each mode). The coefficients $C s_{1}, s_{2}$ define the initial state, and $| 0 ⟩_{1} | 0 ⟩_{2}$ are the vacuum states of modes 1 and 2. For convenience, it is $| 0 ⟩_{1} | 0 ⟩_{2} \equiv | 0 ⟩$ .

If the initial states are Fock states, then the coefficients satisfy $C_{s_{1}, s_{2}} = 1$ . In this case, it is straightforward to show (up to an insignificant phase) that ^[87]^[86]^[37]

$| o u t ⟩ = \sum_{s_{1}, s_{2}} C_{s_{1}, s_{2}} \frac{1}{\sqrt{s_{1}! s_{2}!}} ({\hat{b}}_{1}^{†})^{s_{1}} ({\hat{b}}_{2}^{†})^{s_{2}} | 0 ⟩,$

with

${\hat{b}}_{k}^{†} = e^{i \hat{H} t_{B S}} {\hat{a}}_{k}^{†} e^{- i \hat{H} t_{B S}}, k = 1, 2.$ _{(Eq. (2))}

Here ${\hat{b}}_{1}^{†}$ and ${\hat{b}}_{2}^{†}$ are the creation operators at the output ports of the beam splitter for modes 1 and 2, respectively.

For any lossless two-mode beam splitter, the transformation between input and output operators is governed by a unitary matrix, $𝐔_{B S}$ , constrained by the conservation of energy and bosonic commutation relations:^[38]^[39]^[40]

$(\begin{matrix} {\hat{b}}_{1} \hat{b} 2 \end{matrix}) = 𝐔 B S (\begin{matrix} {\hat{a}}_{1} {\hat{a}}_{2} \end{matrix}) = (\begin{matrix} t & r r^{'} & t^{'} \end{matrix}) (\begin{matrix} {\hat{a}}_{1} {\hat{a}}_{2} \end{matrix})$ _{(Eq. (3)}}

The requirement for unitarity ( $𝐔^{†} 𝐔 = 𝐈$ ) implies that the transmission and reflection coefficients satisfy:

$| r |^{2} + | t |^{2} = 1$ (Energy conservation)

$r^{*} t^{'} + t^{*} r^{'} = 0$ (Phase relationship between ports)

For a symmetric 50:50 beam splitter, this is commonly expressed as:

$𝐔_{B S} = \frac{1}{\sqrt{2}} (\begin{matrix} 1 & i i & 1 \end{matrix})$ In the literature, one often encounters different representations of the beam splitter matrix. The most commonly used case corresponds to a phase shift $ϕ = π / 2$ , while another frequently used representation sets $ϕ = 0$ . In these cases the matrix $U_{B S}$ takes the forms

$U_{B S} = (\begin{matrix} \sqrt{T} & i \sqrt{R} \\ i \sqrt{R} & \sqrt{T} \end{matrix}), U_{B S} = (\begin{matrix} \sqrt{T} & \sqrt{R} \\ - \sqrt{R} & \sqrt{T} \end{matrix}) .$ _{(Eq. (4)}

Both representations are valid only when the final result is independent of the phase shift $ϕ$ . As shown below, many quantities of interest in quantum optics, such as quantum entanglement at the output ports of the beam splitter, do not depend on this phase. Nevertheless, using the general form given in Eq. (3).

In reality, photons are not monochromatic and their frequency distribution must be taken into account ^[88]^[89] In this case, the initial wave function of the photons is

$| i n ⟩ = \sum_{s_{1}, s_{2}} C_{s_{1}, s_{2}} \frac{1}{\sqrt{s_{1}! s_{2}!}} \int Φ (ω_{1}, ω_{2}) ({\hat{a}}_{1}^{†})^{s_{1}} ({\hat{a}}_{2}^{†})^{s_{2}} | 0 ⟩ d ω_{1} d ω_{2},$ _{(Eq. (5))}

where $Φ (ω_{1}, ω_{2})$ is the joint spectral amplitude (JSA) of the two-mode wave function. Assuming normalization,

$\int | Φ (ω_{1}, ω_{2}) |^{2} d ω_{1} d ω_{2} = 1,$

the output state is

$| o u t ⟩ = \sum_{s_{1}, s_{2}} C_{s_{1}, s_{2}} \frac{1}{\sqrt{s_{1}! s_{2}!}} \int Φ (ω_{1}, ω_{2}) ({\hat{b}}_{1}^{†})^{s_{1}} ({\hat{b}}_{2}^{†})^{s_{2}} | 0 ⟩ d ω_{1} d ω_{2} .$ _{(Eq. (6))}

Quantum mechanical description

The output state is |Ψ_out⟩ = e^{iĤ t}_BS |Ψ_in⟩, where Ĥ is the Hamiltonian and t_BS the interaction time.^[90]^[91]^[92] For monochromatic light, the input is |Ψ_in⟩ = ∑_s₁,s₂ C_s₁,s₂ (â^†₁^s₁ â^†₂^s₂ / √(s₁! s₂!)) |0⟩₁ |0⟩₂.^[93]^[49] The unitary matrix U_BS is:

(\begin{matrix} {\hat{b}}_{1} {\hat{b}}_{2} \end{matrix}) = (\begin{matrix} \sqrt{T} & e^{i ϕ} \sqrt{R} - e^{- i ϕ} \sqrt{R} & \sqrt{T} \end{matrix}) (\begin{matrix} {\hat{a}}_{1} {\hat{a}}_{2} \end{matrix})

^[94]^[95]^[50]

For non-monochromatic light, integrate over joint spectral amplitude φ(ω₁, ω₂).^[96]^[52]^[97]

Angular momentum representation

BS transformation as SU(2) rotation: L̂_i operators, with L̂² = l̂(l̂ + 1), where l̂ = (n̂₁ + n̂₂)/2.^[98]^[52] Unitary: Û = e^{-i Φ L̂₃} e^{-i Θ L̂₂} e^{-i Ψ L̂₃}, with Θ = 2θ, θ = arcsin√R.^[99]^[51]^[69]

Quantum entanglement

BS generates entanglement if at least one input is non-classical (e.g., squeezed or Fock state). In frequency-dependent BS, entanglement varies with spectral overlap; broadband photons may reduce concurrence.^[41]^[46]^[56]^[57]

Quantum entanglement of photons and their statistics

As described by D.N. Makarov in 2022 ^[48]^{[upper-alpha 1]}. in the Theory for the quantum optics beam splitter. Recent advancements in hybrid integrated circuits ^[100]^[101] have transitioned these theories from bulk optics to scalable chip-based platforms. Quantum states of light are fundamental resources for the implementation of quantum information protocols since the pioneering tests on nonlocality and quantum teleportation.^[10]^[11] The optical device that divides an incident beam of light into two or more output beams, typically a transmitted beam and a reflected beam. In quantum optics, the quantum beam splitter is a fundamental component far beyond classical beam division: it generates quantum superposition and quantum entanglement from non-entangled inputs, reveals non-classical photon statistics, and enables key phenomena like the Hong–Ou–Mandel effect (HOM effect).^[87]^[102]^[70]^[2]^[103]^[4] While conventional beam splitters are often bulk components, recent progress in integrated photonics ^[88] has allowed for on-chip implementations. For example, independent dibenzoterrylene $C_{30} H_{18}$ (DBT) molecules integrated with silicon nitride ( ${S i}_{3} N_{4}$ ) photonic elements, a single-crystalline anthracene nanosheet doped with dibenzoterrylene (DBT) molecules^[104], and gold electrodes for Stark tuning (Methods).^[105]^[106]^[107]^[108] Waveguides have achieved stable, lifetime-limited transitions suitable for scalable quantum networks. ^[5] Stark tuning experiments show how 100 waveguide-coupled molecules can be tuned to the same frequency and achieve on-chip Hong–Ou–Mandel interference. The quantum theory of the beam splitter is remarkably simple, parameterized by the reflection coefficient R (or transmission T, with R + T = 1) and a relative phase shift φ. This minimal description underpins linear-optical quantum protocols, from interferometry to scalable computing.^[72]^[109] Beam splitters are systematized into "conventional" (frequency-independent R and φ) and frequency-dependent types (e.g., waveguide beam splitters), with the latter affecting entanglement and interference for non-monochromatic light.^[110]^[111]^[112] ^[113]^[86] ^[114]^[42] ^[115]^[45] ^[38]^[39]. This article aims at providing an exhaustive framework of the advances of integrated quantum photonic platforms, for what concerns the integration of sources, manipulation, and detectors, as well as the contributions in quantum computing, cryptography and simulations.

Photon statistics

Output distributions depend on input states and BS parameters. Coherent inputs yield coherent outputs; Fock inputs show sub/super-Poissonian statistics.^[87]^[70]^[103] In frequency-dependent BS, statistics vary by mode, leading to selective bunching/antibunching.^[47]^[46]

Hong–Ou–Mandel effect

Recent advancements have leveraged the HOM effect for quantum kernel evaluation, enabling distance computations in feature spaces for machine learning tasks.^[116] This equivalence to the SWAP test further extends HOM to high-dimensional interference in spatial modes.^[117]^[118] Classical analogs achieving 97% visibility dips confirm the role of complementarity in such systems.^[119] Identical photons on 50:50 BS bunch^[120], suppressing coincidence counts (HOM dip).^[94]^[95]^[50]^[96]^[97]
For frequency-dependent BS, dip visibility depends on spectral overlap; fluctuations affect detection.^[45]^[47]^[48]^[46]
Generalizations: bosons/fermions, wavepackets.^[98]^[99]^[51]^[69]
On a molecular quantum photonic chip, on-chip HOM interference was realized with a visibility of over 0.97. ^[6]The high visibility confirms the excellent indistinguishability of photons originating from independent sources on the same chip.Recent experiments have successfully implemented these waveguide principles on-chip. Using independent dibenzoterrylene (DBT) molecules integrated into $S i_{3} N_{4}$ waveguides, researchers observed on-chip quantum interference with a visibility of $0.97 \pm 0.02$ . ^[5] This provides experimental proof that integrated molecular emitters can achieve the high level of indistinguishability required for scalable quantum circuits.In 2025 a novel quantum optical pattern recognition method leveraging the Hong-Ou-Mandel (HOM) effect for binary classification tasks was introduced by Simone Roncallo et all ^[121].This encodes input objects and trainable parameters into single-photon states, measures two-photon coincidence rates at the output of a HOM interferometer, demonstrating a superexponential resource advantage (constant $𝒪 (1)$ complexity in photons and operations versus at least linear scaling in classical artificial neurons).

Quantum optical setup

The quantum optical setup classifies objects without reconstructing their images. The approach relies on the Hong-Ou-Mandel effect, for which the probability that two photons exit a beam splitter in different modes, depends on their distinguishability^[120]^[117]^[119]^[118]. In the implementation, an input object is targeted by a single-photon source, and eventually followed by an arbitrary lens system. The single-photon state interferes with another one, which encodes a set of trainable parameters, e.g. through a spatial light modulator. After the Hong-Ou-Mandel interferometer, the photons are collected by two bucket detectors without spatial sensitivity, one for each output mode. Classification occurs by measuring the rate of two-photon coincidences at the output.

The Hong-Ou-Mandel effect has been successfully applied to quantum kernel evaluation^[116], which can compute distances between pairs of data points in the feature space. In this case, each point is sent to one branch of the interferometer, encoded in the temporal modes of a single-photon state. In our method, the interferometer has only one independent branch, which takes the spatial modes of a single-photon state reflected off the target object. The other branch remains fixed after training, and contains the layer of parameters.^[122]^[123] After the measurement, the response function of our apparatus mathematically resembles that of a classical neuron. For this reason, we refer to our setup as quantum optical neuron. By analytically comparing the resource cost of the classical and quantum neurons, this method requires constant $𝒪 (1)$ computational operations and injected photons, whereas the classical methods are at least linear in the image resolution: a superexponential advantage.

When combining multiple neurons, the large number of parameters involved motivates a consistent effort in reducing the cost of deep learning algorithms, e.g. by leveraging classical implementations that bypass hardware in an all-optical way^[79]^[80]^[81]^[124]^[125]^[126]^[82]. Quantum mechanical effects, like superposition and entanglement, can provide a significant speedup in such tasks^[127]^[73], e.g. by building quantum analogues of the perceptron^[74]^[75]^[128], by employing variational methods^[83]^[84] or quantum-inspired approaches^[129]. Quantum optical neural networks harness the best of both worlds, i.e. deep learning capabilities from quantum optics^[76]^[77]^[130]^[122]^[85]^[78]^[131].

Mathematical description

Two optical input modes a and b that carry annihilation and creation operators $\hat{a}$ , ${\hat{a}}^{†}$ , and $\hat{b}$ , ${\hat{b}}^{†}$ . Identical photons in different modes can be described by the Fock states^[70], so, for example $| 0 ⟩_{a}$ corresponds to mode a empty (the vacuum state), and inserting one photon into a corresponds to $| 1 ⟩_{a} = {\hat{a}}^{†} | 0 ⟩_{a}$ , etc. A photon in each input mode is therefore

| 1, 1 ⟩_{a b} = {\hat{a}}^{†} {\hat{b}}^{†} | 0, 0 ⟩_{a b} .

When the two modes a and b are mixed in a 1:1 beam splitter, they produce output modes c and d. Inserting a photon in a produces a superposition state of the outputs: if the beam splitter is 50:50 then the probabilities of each output are equal, i.e. ${\hat{a}}^{†} | 0 ⟩_{a} \to \frac{1}{\sqrt{2}} ({\hat{c}}^{†} + {\hat{d}}^{†}) | 00 ⟩_{c d}$ , and similarly for inserting a photon in b. Therefore

{\hat{a}}^{†} \to \frac{{\hat{c}}^{†} + {\hat{d}}^{†}}{\sqrt{2}} and {\hat{b}}^{†} \to \frac{{\hat{c}}^{†} - {\hat{d}}^{†}}{\sqrt{2}} .

The relative minus sign appears because the classical lossless beam splitter produces a unitary transformation^[39]. This can be seen most clearly when wr the two-mode beam splitter transformation in matrix form:

(\begin{matrix} \hat{a} \\ \hat{b} \end{matrix}) \to \frac{1}{\sqrt{2}} (\begin{matrix} 1 & 1 \\ 1 & - 1 \end{matrix}) (\begin{matrix} \hat{c} \\ \hat{d} \end{matrix}) .

^[38]

Similar transformations hold for the creation operators. Unitarity of the transformation implies unitarity of the matrix. Physically, this beam splitter transformation means that reflection from one surface induces a relative phase shift of π, corresponding to a factor of −1, with respect to reflection from the other side of the beam splitter (see the Physical description above)^[40].

When two photons enter the beam splitter, one on each side, the state of the two modes becomes

| 1, 1 ⟩_{a b} = {\hat{a}}^{†} {\hat{b}}^{†} | 0, 0 ⟩_{a b} \to \frac{1}{2} ({\hat{c}}^{†} + {\hat{d}}^{†}) ({\hat{c}}^{†} - {\hat{d}}^{†}) | 0, 0 ⟩_{c d}

= \frac{1}{2} ({\hat{c}}^{† 2} - {\hat{d}}^{† 2}) | 0, 0 ⟩_{c d} = \frac{| 2, 0 ⟩_{c d} - | 0, 2 ⟩_{c d}}{\sqrt{2}},

where used ${\hat{c}}^{† 2} | 0, 0 ⟩_{c d} = {\hat{c}}^{†} | 1, 0 ⟩_{c d} = \sqrt{2} | 2, 0 ⟩_{c d}$ etc.^[2] Since the commutator of the two creation operators ${\hat{c}}^{†}$ and ${\hat{d}}^{†}$ is zero because they operate on different spaces, the product term vanishes. The surviving terms in the superposition are only the ${\hat{c}}^{† 2}$ and ${\hat{d}}^{† 2}$ terms. Therefore, when two identical photons enter a 1:1 beam splitter, they will always exit the beam splitter in the same (but random) output mode.

The result is non-classical: a classical light wave entering a classical beam splitter with the same transfer matrix would always exit in arm c due to destructive interference in arm d, whereas the quantum result is random. Changing the beam splitter phases can change the classical result to arm d or a mixture of both, but the quantum result is independent of these phases.

For a more general treatment of the beam splitter with arbitrary reflection/transmission coefficients, and arbitrary numbers of input photons, see the general quantum mechanical treatment of a beamsplitter for the resulting output Fock state.^[87]^[102]^[103]

Single-Photon Detection in Beam Splitter Experiments

In experiments in quantum optics with beam splitters, an individual-photon-catching detector network is obviously decisive to glimpse those striking non-classical effects: antibunching, Hong-Ou-Mandel interference, and entanglement that the beam splitter itself can generate.

Schematic (left) and scanning electron microscope image (right, scale bar 5 μm) of waveguide-integrated ultra-fast superconducting nanowire single-photon detectors (SNSPDs) coupled to a beam splitter on a photonic chip.

Single-photon detectors (SPDs), such as superconducting nanowire single-photon detectors (SNSPDs) or single-photon avalanche diodes (SPADs) operated in Geiger mode, provide the necessary time-resolved, high-efficiency detection at the single-photon level.^[10]^[132]^[133] In foundational experiments, SPDs are placed at the two output ports of a beam splitter. For a single photon incident on 50:50 beam splitter, the absence of simultaneous detections (zero coincidence counts above vacuum noise) demonstrates the particle-like indivisibility of the photon, while interference effects reveal its wave nature (e.g., in Mach-Zehnder configurations built with beam splitters).^[2]^[65]

In the Hong–Ou–Mandel effect, two indistinguishable photons entering separate input ports bunch at the outputs, leading to a near-complete suppression of coincidence detections between SPDs at the two ports, a hallmark of quantum interference.^[2]^[91]^[92] In tests of photon statistics or entanglement generation, post-selected coincidence measurements between SPDs enable quantification of antibunching ( $g^{(2)} (0) < 1$ ) or violation of Bell inequalities.^[41]^[65]

Fully integrating SPDs onto photonic chips are still a big challenge. There are some promising developments about waveguide-coupled superconducting detectors. These latest developments open up the possibility that future quantum systems will have detection totally on a chip.^[42]^[134]^[135] Such integrations facilitate advanced HOM-based classifiers, where SLMs encode trainable parameters for pattern recognition, with software tools enabling simulation and optimization.^[136]^[137]^[138]^[121] Training challenges, including initialization and convergence, mirror those in deep neural networks.^[139]^[123]

Key technologies for quantum photonic chips

Photonic integration provides a clear route toward compact quantum communication systems with growing complexity and improved functionality. Integrated quantum communication can be broadly categorized into three main aspects: photonic material platforms enabling large-scale integration^[140]^[141]^[142], quantum photonic components such as quantum light sources^[143], high-speed modulators^[144] and highly efficient photodetectors^[145], and representative applications including QKD^[146]^[147] and quantum teleportation^[148]. Because the materials, fabrication processes, and structural designs used in photonic integration differ substantially from those of discrete optical systems, essential chip-level photonic components must be redesigned and optimized for specific quantum information tasks.

This section summarizes key technical developments covering quantum light sources, encoding and decoding elements, quantum detectors, and packaging techniques for integrated photonic systems. These advances constitute critical points in the evolution of integrated quantum communication. Early work in this area can be traced to the integration of photon sources based on periodically poled lithium niobate waveguides^[149] and interferometric circuits realized using silica-on-silicon planar lightwave circuits (PLCs)^[150]^[151]^[152]^[153]. The high efficiency and thermally stable operation of these integrated devices highlighted their intrinsic advantages over discrete and bulky optical components.

Subsequently, a wide range of material platforms was explored, leading to substantial progress in the on-chip generation, manipulation, and detection of quantum states of light for quantum communication and other quantum information applications. Prominent monolithic platforms for chip-based quantum communication include silica waveguides (silica-on-silicon and laser-written silica waveguides), silicon-on-insulator (SOI), silicon nitride ( ${S i}_{3} N_{4}$ ), lithium niobate (LN), gallium arsenide (GaAs)^[154]^[155]^[156]^[157], indium phosphide (InP), and silicon oxynitride ( ${S i O}_{x} N_{y}$ )^[158]^[159]^[160]. The state of the art of these platforms reveals distinct advantages and limitations in terms of waveguiding performance, availability of active components, and compatibility with related technologies.

SOI offers high refractive-index contrast for dense integration, strong optical nonlinearity for nonclassical state generation, and excellent compatibility with advanced CMOS (complementary metal–oxide–semiconductor) fabrication processes widely used in the semiconductor industry. However, the absence of native lasing capability complicates the full monolithic integration of all components required for a complete quantum communication system. Semiconductor platforms such as GaAs^[161]^[35]^[154]^[155] and InP enable full system integration but generally involve higher costs and reduced scalability. These inherent trade-offs indicate that no single material platform can simultaneously satisfy all requirements for quantum communication. As a result, hybrid integration has emerged as a promising strategy to combine the strengths of different platforms^[160].

Notable achievements along these lines include heterogeneous quantum photonic devices such as integrated superconducting nanowire single-photon detectors (SNSPDs)^[145] and on-chip lasers for weak coherent pulse generation^[162]. Additional important technologies, including semiconductor quantum dots (QDs) coupled to photonic nanostructures^[163] and diamond-on-insulator platforms^[164]^[165], have also emerged as competitive solutions for integrated quantum communication systems.

A timeline of advances in quantum photonic chips for quantum communication highlights several key items, including the first on-chip quantum interferometer for quantum cryptography^[150], quantum teleportation^[19]^[155]^[166] realized on a photonic chip^[167], chip-based DV-QKD^[146], CV-QKD^[147], and MDI-QKD^[168]^[169]^[170], as well as chip-to-chip quantum teleportation^[148].

Encoding schemes:

Path encoding

Photon states distributed among multiple waveguides are employed to encode qubit/qudit states and to observe quantum interference effects due to bosonic statistics. Such information encoding has been one of the most investigated in quantum integrated photonics. Path-encoded single- and multi-photon states can be arbitrarily prepared, manipulated and measured using re-programmable Mach–Zehnder interferometers (MZIs). The effect of the MZI is equivalent to the operations made by a beamsplitter with a tunable splitting ratio and by a phase shift (Fig. 3a). This unit for path encoding processing envisages two unbiased directional couplers and two integrated tunable phase shifts. Relative phases between paths in integrated devices are the results of the geometric deformation of waveguides. The recent developments in the field have demonstrated the capability to realize reconfigurable phase shifters, thus allowing the implementation of several unitary transformations on the same device ^[171]^[172]^[173]. There are several examples of programmable integrated devices in SoS^[171]^[174] , Si ^[175] ^[176] ^[177] ^[178] ^[179] ^[180], SiN^[181]^[182]^[173] silica laser written waveguides with FLW^[183] ^[184] ^[185] and UV-writing^[186]^[187]. The re-programmable elements inside the MZI are the two phase shifts that are controlled generally through the thermo-optic effect. Heaters placed nearby the location of the waveguide allow for local changes in the refractive index of the material. Such reconfigurable units are sufficient to encode, process and measure any qubit in two optical paths. The complexity reached from integrated devices is nowadays very remarkable allowing for full integration of qubit- and qudit-based quantum gates and algorithms in SoS ^[174] and Si-chips ^[176]^[177]^[188]^[180]. In particular, the most recent silicon quantum processors count up to 16 integrated single-photon sources, more than 100 heaters and likewise integrated optical elements^[175]^[176]^[177].

Femtosecond-laser-writing (FLW)

The femtosecond laser writing, using Mode locking^[189] is a further method for silica waveguide fabrication^[190]^[191]. The mechanism of the process is the non-linear absorption of strong laser pulses tightly focused in the silica sample. Such absorption results in a permanent and localized modification in the refractive index. Waveguides are directly written by translating the silica sample at a constant speed with respect to the laser beam, without needing any preliminary preparation of substrate or layers of different materials as in the previous methods. The cross-section is circular and presents a very low birefringence. Such characteristics together with the 3D geometry capability have allowed the realization of devices insensitive from polarization ^[192]^[193] as well as devices able to manipulate polarization as waveplates or partially polarizing beamsplitter ^[194]^[195]. The 3D geometry has other advantages regarding the range of possible schemes for optical circuit decomposition. FLW devices demonstrated to realize circuits according to the traditional networks of integrated beam-splitter in planar ^[196]^[197]^[198]^[199]^[200] and 3D geometries^[201]^[202]^[203] and continuously coupled waveguide lattices ^[204]^[205]^[206]^[207]^[208]. There are instances of re-programmable circuits in small^[183]^[184]^[185]^[209] and large scale ^[210] realization of integrated devices. The integration of single-photon sources exploiting nonlinear effects is still challenging due to the low birefringence ( $Δ n \approx 0$ ) and the null third-order nonlinear susceptibility ( $χ^{(3)} = 0$ ) of these waveguides. Notwithstanding, femtosecond laser writing (FLW) can be exploited to write waveguides in a nonlinear material to generate pairs of photons through parametric processes. These kinds of sources have been interfaced successfully with FLW chips in^[211]. The FLW waveguides display also a good coupling with external fibers, enabling the interface of the optical circuit with remote users or solid-state sources^[185]^[209].

Compact integration of optical components

A factor that drives the compact integration of optical components, quantum computing on integrated photonic chips has attracted much attention in recent years. There are two types of optical models^[212]: specific quantum computing models^[213]^[214] (e.g., boson sampling), and universal quantum computing models^[215] ^[216]^[217]^[218]^[219]^[220] (e.g., one-way or measurement-based). For specific quantum computation, a variety of photonic systems were demonstrated using quantum photonic chips^[221]^[222]^[223]^[224]^[225]^[226]^[226]^[227], enabling a natural and effective implementation of boson sampling. Gaussian boson sampling^[228]^[229], which can dramatically enhance the sampling rate with the adoption of squeezed light sources, was performed for the calculation of molecular vibronic spectra on a $S i$ chip^[227] (up to 8 photons) and a $S i N$ chip^[230] (up to 18 photons). Recently, quantum computational advantage has been delivered by photonic Gaussian boson sampling processors^[231]^[232], paving the path for further development of integrated specific quantum computers with potential applications including graph optimization^[233], complex molecular spectra^[234], molecular docking^[235], quantum chemistry^[236], etc. For universal quantum computation, a number of major functionalities have been demonstrated with onchip photonic components, such as controlled-NOT gate and its heralding version^[237]^[238], and compiled Shor’s factorization^[239]. Moreover, both architectural and technological efforts have been dedicated to photonic one-way quantum computation. This approach employs cluster states and sequential single-qubit measurement to perform universal quantum algorithms^[216]^[218]^[240] and can be greatly enhanced by implementing resource state generation and fusion operation natively^[241]^[242]^[243]. The relevant circuit implementations include programmable fourphoton graph states on a Si chip^[244], path-polarization hyperentangled and cluster states on a $S i O_{2}$ chip^[245] and programmable eight-qubit graph states on a Si chip^[246]. In conclusion, quantum photonic chips have rapidly matured to become a versatile platform that proves to be invaluable in the development of cutting-edge quantum communication technologies. This review delves into the advancements achieved in this particular field. Considering the remarkable outcomes, it is anticipated that photonic integration will eventually assume a crucial role in building various quantum networks and potentially a global quantum internet^[8]^[9]^[247]^[248], reshaping the landscape of future communication methodologies.

Chip packaging and system integration

While bare quantum photonic chips can be characterized using a probe station, they must be packaged into durable modules to develop working prototype devices^[249]. To this end, numerous processes have been proposed to package quantum photonic chips into compact systems for real-world applications. Generally, photonic packaging involves a range of techniques and technical competencies needed to make the optical, electrical, mechanical, and thermal connections between a photonic chip and the off-chip components in a photonic module^[250]^[251]^[252]. Fiber-to-chip coupling is one of the best-known aspects. The main challenge associated with coupling between an optical fiber and a typical waveguide on the chip is the large difference between their mode‐field diameters (MFDs)^[253]. For example, the MFD at 1550 nm is ~10 μm in telecom single‐mode fiber (SMF), while the cross-section of the corresponding strip silicon waveguide is usually only 220 × 450 nm. This mismatch can be mitigated by using configurations that efficiently extract the mode from waveguide^[254], such as inverted-taper edge couplers interfaced with lensed SMF fibers^[255]^[256] or ultrahigh numerical aperture fibers^[257], and grating couplers interfaced with SMF fibers^[253]^[258]. For the approach harnessing grating couplers, coupling efficiency up to 81.3% (−0.9 dB) can be achieved in a 260-nm-thick SOI platform without the need for a back reflector or overlayer^[259]. Additionally, efficiencies over 90% have been experimentally demonstrated using edge couplers fabricated on 200-mm SOI wafers^[260]. An alternative approach for cost-effective and panel-level packaging is the evanescent coupling scheme, which has been reported to have a coupling loss of approximately 1 dB at a wavelength of 1550 nm^[261]. To access the electrical components on quantum photonic chips, electronic packaging is required to route signals from electronic drivers, amplifiers, and other control circuitry. This is often achieved by interfacing with dedicated printed circuit boards (PCBs)^[262]. The connection between PCBs and the bond-pads on the chip is usually made using wire-bonds.When a very large number of electrical connections or precise sub-nanosecond control on multiple channels is needed, 2.5-dimensional or 3-dimensional integration with customized electronic integrated circuits (EICs) may be utilized ^[249]^[263] This integration can be achieved using either solder-ballbump or copper-pillar-bump interconnects, providing a robust electrical, mechanical, and thermal interface for the photonic chips^[264]^[265]. Global thermal stabilization of quantumphotonic devices is essential for prototypes that require high accuracy and repeatability or for field tests where seasonal temperature swings are common. This can be achieved using passive cooling techniques or a thermoelectric cooler (TEC). The added global stability from the TEC allows for more efficient and better reproducibility in the local temperature tuning of individual photonic elements (e.g., micro-ring resonators, thermo-optic phase shifters, etc.) on the chip^[249]. Additionally, liquid cooling can be installed to further increase the cooling capacity of the system^[262]

Experiments

On-Chip Quantum Interference

a, Photograph of the quantum photonic chip.b, Optical micrograph of all 24 independent devices integrated on the chip.c, Zoomed-in view of one device with hybrid integration of Si3N4 photonic elements (waveguides W1–W4, a 2 × 2 MMI and grating couplers G1–G4), an anthracene nanosheet (light green) doped with DBT molecules, and metal electrodes (yellow). d, SEM images of the waveguides W1 and W2 (with gold electrodes flanking them), the MMI, and one of the output gratings G3. e, DBT molecular structure and energy-level scheme. em., emission; exc., excitation. f, Illustration of the on-chip two-photon quantum interference experiment: two streams of single photons originating from resonantly driven DBT molecules couple to the waveguides, interfere through the MMI, then propagate through the waveguide circuits and out-couple to free space via the gratings for timecorrelated single-photon detection. The transition frequencies of the molecules can be tuned by the electrode via the Stark effect. Scale bars, 1 mm (a), 300 μm (b), 50 μm (c) and 10 μm (d). Recent experimental breakthroughs have successfully implemented these waveguide principles using molecular quantum photonic chips. By integrating independent dibenzoterrylene (DBT) molecules into

S i_{3} N_{4}

waveguides, researchers have achieved on-chip Hong–Ou–Mandel (HOM) interference with a visibility of

0.97 \pm 0.02

. ^[5]

These integrated systems allow for the observation of quantum beating when a frequency detuning (e.g., 400 MHz) is applied between two emitters. These beats have been shown to persist for over 100 µs, demonstrating the high spectral stability and single-photon purity required for scalable quantum information processing. ^[18]

Evaluating photon indistinguishability from the TPQI experiment under CW excitation

A recent report^[266] establishes a method to evaluate full wave-packet photon indistinguishability from TPQI experiments under non-resonant CW excitation. Here, this method extends to resonant CW excitation, enabling direct assessment of photon indistinguishability from our TPQI data. The metric used in this approach is $\tilde{V} (S) = \frac{\int d τ [1 - g_{H O M}^{(2)} (τ)] - \int d τ [1 - g_{H O M, d}^{(2)} (τ)]}{\int d τ [1 - g_{H O M, d}^{(2)} (τ)]}$ .
Substituting the theoretical expressions for $g_{H O M}^{(2)} (τ)$ and $g_{H O M, d}^{(2)} (τ)$ from equations respectively,

$\tilde{V} (S)$ is

$\tilde{V} (S) = \frac{ℳ (2 ℳ + 1)}{ℳ + (ℳ + 1) / (1 + S)}$ .

where $ℳ = \frac{τ_{2}}{2 τ_{1}}$ . Equation (26) expresses $\tilde{V}$ as a function of $S$ .

In the weak excitation limit ( $S \to 0$ ), $\tilde{V}$ reduces to $\frac{τ_{2}}{2 τ_{1}}$ , thereby yieldingn the true photon indistinguishability, consistent with TPQI experiments under pulsed excitation^[266].

Applications

Image classification

Has been significantly improved by the introduction of deep learning methods, which provide several algorithms that can learn and extract image features. Examples include feedforward neural networks, convolutional neural networks and vision transformers^[267]^[268]^[269]^[270]. The artificial neuron, also called perceptron^[271], represents the fundamental unit of such architectures. In this model, encoded data are processed through a set of weighted trainable connections, by taking the scalar product between the input and the vector of weights. The output is further post-processed, including a bias and an activation function, which is usually non-linear^[272]. Image classification implies a two-fold cost. Computational processing requires a number of operations that scales, at least, linearly in the image resolution. Similarly, the optical cost of image capturing undergoes the same scaling in the number of photons.

This model compared against conventional classifiers, i.e. a single neuron and a convolutional neural network, commonly employed in pattern recognition tasks^[122]^[85]^[78]^[131]^[123]. Adopting the TensorFlow notation, the convolutional structure is: Conv2D (10, 3 × 3) → Conv2D (4, 2 × 2) → MaxPooling2D (2 × 2). Roughly, all the architectures have ~10³ trainable parameters. The performances are equal in the MNIST dataset, both in terms of trainability and final accuracy. In the CIFAR-10 dataset, our classifier outperforms the conventional ones, showing superior efficiency under a strongly-constrained parameters count. These findings emphasize the competitive accuracy of our method, and also its comparative advantage in pattern recognition tasks with a limited number of parameters.

Entanglement distribution and quantum teleportation systems

Quantum teleportation has been achieved over different types of platforms such as superconducting qubits, trapped atoms, nitrogen-vacancy centers, and continuous-variable states, among others.^[273] Of all the types of quantum teleportation, the photonic qubit is considered to be a very promising candidate for forming the quantum channel of the quantum network due to its stability within noisy environments and the fact that it can be operated at room temperature.^[274] Photonic qubits^[17] are more resistant to long-distance environmental interference. To date, photonic quantum teleportation has been successfully performed experimentally using different methods, including free-space and fiber.^[273]

The first experimental validation of quantum teleportation relied on qubits encoded in the polarization of photons produced from a beta-barium borate (BBO) crystal in a free-space setup on an optical table.^[275] Later, the distance record for free-space teleportation was pushed beyond 1,400 km between the Micius satellite and a ground station,^[276] thus providing the basis for a global quantum network. However, due to the issues of beam divergence, pointing, and collection of free-space teleportation, optical-fiber-based teleportation is considered more suitable for the establishment of cost-efficient quantum metropolitan networks. The current distance record for optical-fiber-based teleportation is 102 km.^[277]

A major issue related to photonic qubit teleportation involves the efficiency limit of Bell-state measurements (BSMs) using linear optics, with a 50% bound. To go around such a constraint, continuous variable optical modes can be used as a different solution to accomplish full deterministic teleportation. This technique was successfully experimented with on a 6-km fiber link,^[278] but its fidelity needs to be enhanced because of its vulnerability to transmission losses. For non-photonic qubit technology, a distance of 21 m was attained in the case of atom traps.^[279]

With increasing momentum in quantum teleportation, another relevant technology is its integration. In future quantum networks, quantum teleportation chips could be integrated into fixed systems (e.g., network relays located in network nodes) or mobile systems (e.g., drones) to create lightweight and compact quantum nodes allowing remote access to quantum equipment for shared information as well as advanced computational power (Luo et al., Light: Science & Applications, 2023, 12:175). All this has become possible due to generation and manipulation of entangled photon pairs in multiple Degrees of Freedom on-chip, including path-encoded entanglement in Mach-Zehnder Interferometers (MZIs),^[188] polarization entanglement created in birefringent media,^[280] and time-bin entanglement in Franson interferometers.^[281]

The first telecom-based chip-scale teleportation used an off-chip photon source, showing the feasibility of a fidelity of 0.89 in a single chip system.^[178] The current advancement in integrated quantum photonics has also helped realize entanglement-based quantum communications beyond the chip level. The first entanglement distribution between chips incorporated all necessary components into monolithically integrated silicon photonic chips.^[282] On-chip entangled Bell states were generated, and the qubit was transferred to the other silicon chip by encoding the on-chip path-encoded and in-fiber polarization states using two-dimensional grating couplers. Moreover, more advanced integrated quantum circuits implemented with on-chip sources have implemented inter-chip teleportation, showing a fidelity of 0.88.^[283] The chip-scale realization of photonic qubit creation, processing, and transmission provides one potential promising step toward the realization of the distributed quantum information processing Internet. In addition, entangled photon pairs in the visible and telecom bands have been created on a chip of silicon nitride ( $S i_{3} N_{4}$ ) using a micro-ring resonator, with distribution over more than 20 km, using precisely designed and fabricated micro-ring resonators, entangling photons in the visible range, which can be coupled with quantum memories, and in the telecom range, with lower attenuation in the transmission of the photons over the fibers.^[197]

Quantum Information Processing and Computing

Beam splitters are the fundamental building blocks for Linear Optical Quantum Computing (LOQC).

The KLM Protocol: Beam splitters facilitate the probabilistic entangling gates necessary for universal quantum computation using only linear elements. The original CNOT gate in this protocol operates with a success probability of $\frac{1}{16}$ . ^[3]

Waveguide Lattices: Integrated arrays of beam splitters allow for the simulation of quantum walks and complex multi-photon interference patterns. ^[42]^[115]

Quantum Photonic Chips for Quantum Communication and Internet

The smallest optical beam splitters are typically found in advanced research within nanophotonics, plasmonics, and integrated optics^[158], where devices are miniaturized for applications like photonic computing^[110], optical communications, and quantum technologies^[115]. These are far smaller than commercial or conventional beam splitters (which often measure millimeters to centimeters)^[284].

Photonic Beam Splitters

An example is a silicon-based photonic polarizing beam splitter developed by researchers at the University of Utah. It measures just 2.4 × 2.4 microns (μm) in footprint, making it one of the smallest low-loss all-dielectric designs^[45]. This device splits incoming light into two separate polarized channels and was designed to enable light-speed computing by replacing electrons with photons^[4]. It was published in 2015 and claimed as the world's smallest at the time.^[38]

Plasmonic Beam Splitters

Plasmonic designs, which use surface plasmon polaritons (waves at metal-dielectric interfaces) to manipulate light, can be even smaller due to sub-wavelength confinement, though they often have higher losses^[285]. One ultracompact plasmonic polarizing beam splitter on a silicon-on-insulator (SOI) platform has a coupling region of 1.1 μm in length and 50 nanometers (nm) in width. The overall footprint is approximately 1.1 × 0.95 μm (accounting for the waveguides), resulting in an area of about 1 μm². This was reported in 2013 and leverages silver cylinders sandwiched between silicon waveguides for splitting polarized light.^[286] Other plasmonic variants, such as those based on nanoslits or bent directional couplers, have dimensions ranging from hundreds of nm to a few μm, with some coupling lengths as short as 0.9–8.9 μm in more recent designs (e.g., from 2020–2023 papers on slot waveguides or photonic crystals).^[159]

Metasurface-Based Beam Splitters

Metasurfaces (ultra-thin engineered arrays of nano-antennas) offer nanoscale thickness, often 50–200 nm, while lateral dimensions can be a few μm to tens of μm to handle the beam. These are among the thinnest possible, enabling flat optics for beam splitting with arbitrary ratios or angles^[91]. A 2018 example uses gradient metasurfaces for nanoscale thickness, though specific lateral sizes vary by design (typically 5–10 μm across for efficient operation).^[163]

These nanoscale beam splitters are fabricated using techniques like electron-beam lithography and are integrated on chips^[287], making them orders of magnitude smaller than traditional glass cubes or plates^[71]. Recent developments (post-2020) focus on reducing losses, broadening bandwidth, and integrating with materials like lithium niobate or silicon nitride^[288], but no widely reported designs have broken below ~1 μm in key dimensions while maintaining functionality^[39]. If you're interested in a specific type (e.g., for visible light, IR, or quantum applications), more details could narrow it down further^[40].

Quantum communication

which applies the principles of quantum mechanics for quantum information transmission, enables fundamental improvements to security, computing, sensing, and metrology. This realm encapsulates a vast variety of technologies and applications ranging from state-of-the-art laboratory experiments to commercial reality. The best-known example is quantum key distribution (QKD)^[88]^[289]. The basic idea of QKD is to use the quantum states of photons to share secret keys between two distant parties. The quantum no-cloning theorem endows the two communicating users with the ability to detect any eavesdropper trying to gain knowledge of the key^[290]^[291]. Since security is based on the laws of quantum physics rather than computational complexity, QKD is recognized as a desired solution to address the ever-increasing threat raised by emergent quantum computing hardware and algorithms.

Despite the controversy surrounding its practical security, QKD is leading the way to real-world applications^[89]. For example, fiber-based and satellite-to-ground QKD experiments have been demonstrated over 800 km in ultra-low-loss optical fiber^[292] and 2000 km in free space^[293], respectively. The maximal secure key rate for a single channel has been pushed to more than 110 Mbit/s^[294]. A number of field-test QKD networks have been established in Europe^[295]^[296]^[297], Japan^[298], China^[299]^[300], UK^[287], and so forth. Furthermore, the security of practical QKD systems was intensively studied to overcome the current technical limitations^[89]^[301]^[302]. Post-quantum cryptography has been combined with QKD to achieve short-term security of authentication and long-term security of keys^[303].

Quantum Communication and Cryptography

Beam splitters are used to distribute entanglement across networks, enabling secure information transfer.

Quantum Key Distribution (QKD): Critical for implementing protocols that detect eavesdropping through signal splitting and interference. ^[52]^[53]

Quantum Repeaters: Used in Bell-state measurements (BSM) to perform entanglement swapping, extending the range of quantum communication. ^[90]

Teleportation: A beam splitter is used to perform the joint measurement required to transfer a quantum state $| ψ ⟩$ between distant nodes. ^[66]^[67]

Quantum Metrology and Sensing

By creating path-entangled states, such as N00N states of the form $(| N, 0 ⟩ + | 0, N ⟩) / \sqrt{2}$ , beam splitters allow sensors to surpass the Standard Quantum Limit.

Heisenberg-Limit Sensing: Utilizing quantum interference to achieve a phase sensitivity $Δ ϕ$ that scales with $1 / N$ rather than the classical $1 / \sqrt{N}$ . ^[61]^[62]^[63]
Beam splitter interference in HOM setups enhances metrological precision in quantum kernel methods for feature space analysis.^[130]^[116]

Characterization and Foundations

To verify the performance of these applications, measures and tests are employed:

Entanglement Measures: The quality of the generated states is quantified using Concurrence and Entropy of Formation. ^[58]^[59]

Foundational Tests: Beam splitters provide the platform for Bell test violations and studies of decoherence in open quantum systems. ^[64]^[65]

Integrated Photonics

Implementations focusing at on-chip integration using waveguide architectures. An improvement is the use of dibenzoterrylene (DBT) molecules in an anthracene matrix, which has enabled the on-chip integration of independent channels with high-visibility, indistinguishable single photons. ^[304]

Table of contents (217 articles)

Index

Core theory

1. Foundations

2. Conceptual and interpretations

3. Mathematical structure and systems

4. Atomic and spectroscopy

5. Wavefunctions and modes

6. Quantum dynamics and evolution

7. Measurement and information

8. Quantum information and computing

Applications and extensions

9. Quantum optics and experiments

10. Open quantum systems

11. Quantum field theory

12. Statistical mechanics and kinetic theory

13. Condensed matter and solid-state physics

14. Plasma and fusion physics

15. Timeline

16. Advanced and frontier topics

Book II

Matter by scale

Book III

Methods and tools

Book IV

Data Analysis Techniques

Full contents

1. Foundations (14) Back to index

1. Physics:Quantum basics

2. Physics:Quantum photoelectric effect

3. Physics:Quantum black-body radiation

4. Physics:Quantum Planck constant

5. Physics:Quantum Postulates

6. Physics:Quantum Hilbert space

7. Physics:Quantum Observables and operators

8. Physics:Quantum mechanics

9. Physics:Quantum mechanics measurements

10. Physics:Quantum state

11. Physics:Quantum system

12. Physics:Quantum superposition

13. Physics:Quantum probability

14. Physics:Quantum Mathematical Foundations of Quantum Theory

2. Conceptual and interpretations (14) Back to index

15. Physics:Quantum Interpretations of quantum mechanics

16. Physics:Quantum Wave–particle duality

17. Physics:Quantum Complementarity principle

18. Physics:Quantum Uncertainty principle

19. Physics:Quantum Measurement problem

20. Physics:Quantum Bell's theorem

21. Physics:Quantum Hidden variable theory

22. Physics:Quantum nonlocality

23. Physics:Quantum contextuality

24. Physics:Quantum Darwinism

25. Physics:Quantum A Spooky Action at a Distance

26. Physics:Quantum A Walk Through the Universe

27. Physics:Quantum The Secret of Cohesion and How Waves Hold Matter Together

28. Physics:Quantum measurement problem

3. Mathematical structure and systems (15) Back to index

29. Physics:Quantum Density matrix

30. Physics:Quantum Exactly solvable quantum systems

31. Physics:Quantum many-body problem

32. Physics:Quantum Formulas Collection

33. Physics:Quantum A Matter Of Size

34. Physics:Quantum Symmetry in quantum mechanics

35. Physics:Quantum Noether theorem

36. Physics:Quantum Angular momentum operator

37. Physics:Quantum Runge–Lenz vector

38. Physics:Quantum Approximation Methods

39. Physics:Quantum Matter Elements and Particles

40. Physics:Quantum Dirac equation

41. Physics:Quantum Klein–Gordon equation

42. Physics:Quantum pendulum

43. Physics:Quantum configuration space

4. Atomic and spectroscopy (14) Back to index

44. Physics:Quantum Atomic structure and spectroscopy

45. Physics:Quantum Hydrogen atom

46. Physics:Quantum number

47. Physics:Quantum Multi-electron atoms

48. Physics:Quantum Fine structure

49. Physics:Quantum Hyperfine structure

50. Physics:Quantum Isotopic shift

51. Physics:Quantum defect

52. Physics:Quantum Zeeman effect

53. Physics:Quantum Stark effect

54. Physics:Quantum Spectral lines and series

55. Physics:Quantum Selection rules

56. Physics:Quantum Fermi's golden rule

57. Physics:Quantum beats

5. Wavefunctions and modes (9) Back to index

58. Physics:Quantum Wavefunction

59. Physics:Quantum Superposition principle

60. Physics:Quantum Eigenstates and eigenvalues

61. Physics:Quantum Boundary conditions and quantization

62. Physics:Quantum Standing waves and modes

63. Physics:Quantum Normal modes and field quantization

64. Physics:Number of independent spatial modes in a spherical volume

65. Physics:Quantum Density of states

66. Physics:Quantum carpet

7. Measurement and information (9) Back to index

88. Physics:Quantum Measurement theory

89. Physics:Quantum Measurement operators

90. Physics:Quantum Projective measurement

91. Physics:Quantum POVM

92. Physics:Quantum Weak measurement

93. Physics:Quantum Measurement collapse

94. Physics:Quantum entanglement

95. Physics:Quantum Zeno effect

96. Physics:Quantum limit

8. Quantum information and computing (15) Back to index

97. Physics:Quantum information theory

98. Physics:Quantum Qubit

99. Physics:Quantum Entanglement

100. Physics:Quantum Bell state

101. Physics:Quantum Gates and circuits

102. Physics:Quantum BB84

103. Physics:Quantum No-cloning theorem

104. Physics:Quantum Computing Algorithms in the NISQ Era

105. Physics:Quantum Noisy Qubits

106. Physics:Quantum error correction

107. Physics:Quantum Boson sampling

108. Physics:Quantum random access code

109. Physics:Quantum pseudo-telepathy

110. Physics:Quantum network

111. Physics:Quantum money

9. Quantum optics and experiments (10) Back to index

112. Physics:Quantum Nonlinear King plot anomaly in calcium isotope spectroscopy

113. Physics:Quantum Stern-Gerlach experiment

114. Physics:Quantum Experimental quantum physics

115. Physics:Quantum optics

116. Physics:Quantum optics beam splitter experiments

117. Physics:Quantum Mach-Zehnder interferometer

118. Physics:Quantum Hong-Ou-Mandel effect

119. Physics:Quantum eraser experiment

120. Physics:Quantum delayed-choice quantum eraser

121. Physics:Quantum Ultra fast lasers

122. Template:Quantum optics operators

10. Open quantum systems (15) Back to index

123. Physics:Quantum Open systems

124. Physics:Quantum channel

125. Physics:Quantum Kraus operators

126. Physics:Quantum Amplitude damping

127. Physics:Quantum Phase damping

128. Physics:Quantum Depolarizing channel

129. Physics:Quantum Master equation

130. Physics:Quantum Lindblad equation

131. Physics:Quantum Decoherence

132. Physics:Quantum Dynamical decoupling

133. Physics:Quantum dissipation

134. Physics:Quantum Markov semigroup

135. Physics:Quantum Markovian dynamics

136. Physics:Quantum Non-Markovian dynamics

137. Physics:Quantum Trajectories

11. Quantum field theory (23) Back to index

138. Physics:Quantum field theory (QFT) basics

139. Physics:Quantum field theory (QFT) core

140. Physics:Quantum Fields and Particles

141. Physics:Quantum Second quantization

142. Physics:Quantum Fock space

143. Physics:Quantum Harmonic Oscillator field modes

144. Physics:Quantum Creation and annihilation operators

145. Physics:Quantum vacuum fluctuations

146. Physics:Quantum Casimir effect

147. Physics:Quantum Propagators in quantum field theory

148. Physics:Quantum Feynman diagrams

149. Physics:Quantum Path integral formulation

150. Physics:Quantum Renormalization in field theory

151. Physics:Quantum Renormalization group

152. Physics:Quantum Field Theory Gauge symmetry

153. Physics:Quantum Spontaneous symmetry breaking

154. Physics:Quantum Non-Abelian gauge theory

155. Physics:Quantum Electrodynamics (QED)

156. Physics:Quantum chromodynamics (QCD)

157. Physics:Quantum Electroweak theory

158. Physics:Quantum Standard Model

159. Physics:Quantum triviality

160. Physics:Quantum confinement problem

12. Statistical mechanics and kinetic theory (9) Back to index

161. Physics:Quantum Statistical mechanics

162. Physics:Quantum Partition function

163. Physics:Quantum Distribution functions

164. Physics:Quantum Liouville equation

165. Physics:Quantum Kinetic theory

166. Physics:Quantum Boltzmann equation

167. Physics:Quantum BBGKY hierarchy

168. Physics:Quantum Relaxation and thermalization

169. Physics:Quantum Thermodynamics

13. Condensed matter and solid-state physics (17) Back to index

170. Physics:Quantum Band structure

171. Physics:Quantum Fermi surfaces

172. Physics:Quantum Landau levels

173. Physics:Quantum fractional Hall effect

174. Physics:Quantum Semiconductor physics

175. Physics:Quantum Phonons

176. Physics:Quantum Electron-phonon interaction

177. Physics:Quantum Exchange interaction

178. Physics:Quantum Superconductivity

179. Physics:Quantum Topological phases of matter

180. Physics:Quantum anyon

181. Physics:Quantum well

182. Physics:Quantum spin liquid

183. Physics:Quantum spin Hall effect

184. Physics:Quantum phase transition

185. Physics:Quantum critical point

186. Physics:Quantum dot

14. Plasma and fusion physics (8) Back to index

187. Physics:Quantum Fusion reactions and Lawson criterion

188. Physics:Quantum Plasma (fusion context)

189. Physics:Quantum Magnetic confinement fusion

190. Physics:Quantum Inertial confinement fusion

191. Physics:Quantum Plasma instabilities and turbulence

192. Physics:Quantum Tokamak core plasma

193. Physics:Quantum Tokamak edge physics and recycling asymmetries

194. Physics:Quantum Stellarator

15. Timeline (8) Back to index

195. Physics:Quantum mechanics/Timeline

196. Physics:Quantum mechanics/Timeline/Pre-quantum era

197. Physics:Quantum mechanics/Timeline/Old quantum theory

198. Physics:Quantum mechanics/Timeline/Modern quantum mechanics

199. Physics:Quantum mechanics/Timeline/Quantum field theory era

200. Physics:Quantum mechanics/Timeline/Quantum information era

201. Physics:Quantum mechanics/Timeline/Quantum technology era

202. Physics:Quantum mechanics/Timeline/Quiz

16. Advanced and frontier topics (16) Back to index

203. Physics:Quantum topology

204. Physics:Quantum battery

205. Physics:Quantum Supersymmetry

206. Physics:Quantum Black hole thermodynamics

207. Physics:Quantum Holographic principle

208. Physics:Quantum gravity

209. Physics:Quantum De Sitter invariant special relativity

210. Physics:Quantum Doubly special relativity

211. Physics:Quantum arithmetic geometry

212. Physics:Quantum unsolved problems

213. Physics:Quantum Yang-Mills mass gap

214. Physics:Quantum gravity problem

215. Physics:Quantum black hole information paradox

216. Physics:Quantum dark matter problem

217. Physics:Quantum neutrino mass problem

218. Physics:Quantum matter-antimatter asymmetry problem

Notes

↑ The references in this article have been adjusted. Some where damaged/misspeld in the original article.

Sources

Theory for the beam splitter in quantum optics: quantum entanglement of photons and their statistics, HOM effect. 2022
This reference provides a comprehensive theoretical framework for conventional and frequency-dependent beam splitters. It systematizes how the reflection coefficient and phase shift impact quantum entanglement and photon statistics at the output ports.
Recent progress in quantum photonic chips for quantum communication and internet 2023
A review of the state-of-the-art in integrated quantum photonics, focusing on the development of chip-scale components for quantum communication networks and the challenges of multi-photon interference.
Integrated photonics in quantum technologies 2023
This paper explores the transition from bulk optics to integrated circuits, highlighting how waveguide-based miniaturization is essential for scaling quantum technologies
On-chip quantum interference of indistinguishable single photons from integrated independent molecules.
This study demonstrates a molecular quantum photonic chip using dibenzoterrylene (DBT) molecules. By integrating these into organic nanosheets and $S i_{3} N_{4}$ waveguides, stable transitions are achieved. This approach builds on the fundamental principles of waveguide-coupled emitters and quantum networks.
Quantum optical classifier with superexponential speedup 2025
This paper introduces a quantum optical pattern recognition method for binary classification using the Hong-Ou-Mandel effect in a beam splitter-based interferometer. It achieves superexponential speedup by classifying objects without image reconstruction, requiring constant $𝒪 (1)$ resources in photons and operations, providing an advantage over classical neurons.

🎯 Primary Learning Objective

After working through this resource, students should be able to:

Define a beam splitter and explain its role in quantum optics.
Mathematically describe how a beam splitter transforms quantum modes.
Understand and analyze key experiments, especially the Hong–Ou–Mandel (HOM) effect.
Connect beam splitter behavior to fundamental quantum concepts such as superposition and entanglement.
Relate modern integrated photonics implementations (e.g., waveguide beam splitters) to traditional optics.

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↑

Author: Harold Foppele

Source attribution: Physics:Quantum optics beam splitter experiments

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@@ Line 1: / Line 1: @@
 {{Short description|Quantum Collection topic on Quantum optics beam splitter experiments}}
 {{Quantum book backlink|Quantum optics and experiments}}
+{{Quantum article nav|previous=Physics:Quantum Nonlinear King plot anomaly in calcium isotope spectroscopy|previous label=Nonlinear King plot anomaly in calcium isotope spectroscopy|next=Physics:Quantum Ultra fast lasers|next label=Ultra fast lasers}}
 <!---*****************************--->
 <div style="display:flex; gap:24px; align-items:flex-start; max-width:1200px;">
@@ Line 11: / Line 10: @@
 <div style="flex:1; line-height:1.45; color:#006b45; column-count:2; column-gap:32px; column-rule:1px solid #b8d8c8;">
-<div style="display:none;">
+'''Quantum optics beam splitter experiments''' study how single photons, photon pairs, and quantum states of light behave when they meet a partially transmitting optical element. A beam splitter is simple in classical optics, but in quantum optics it reveals interference, indistinguishability, phase relations, and entanglement.
+Important examples include Mach-Zehnder interferometry, Hong-Ou-Mandel interference, linear optical quantum computing, and integrated photonic chips. These experiments show how quantum amplitudes combine at optical components and why single-photon paths cannot always be interpreted as ordinary classical alternatives. The page connects beam splitters to quantum information, quantum communication, and modern photonic technology.
+</div>
+<div style="width:300px;">
+[[File:Quantum_beam_splitter_interference_yellow1.jpg|thumb|280px|Quantum optics beam splitter experiments.]]
+</div>
-<ref name="01K">{{cite journal
+</div>
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-| title = The potential and global outlook of integrated photonics for quantum technologies
-| journal = Nat. Rev. Phys.
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-| year = 2022
-| doi = 10.1038/s42254-021-00398-z
-}}</ref>
-<ref name="02K">{{cite journal
+===Introduction to the beam splitter in quantum optics===
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-}}</ref>
-<ref name="03K">{{cite journal
+Historical developments in beam splitting range from '''Fizeau’s 1851'''<ref name="Fizeau1851">{{cite journal
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-| title = Linear optical quantum computing with photonic qubits
+ | journal = Comptes Rendus Hebdomadaires des Séances de l'Académie des Sciences
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+ | volume = 33
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+ | pages = 349–355
-| pages = 135–174
+ | year = 1851
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+ | url = https://www.academie-sciences.fr/pdf/dossiers/Fizeau/Fizeau_pdf/CR1851_p349.pdf
-| doi = 10.1103/RevModPhys.79.135
+}}
-}}</ref>
+</ref> interference measurements to the development of the '''Michelson interferometer'''. The transition to the quantum regime occurred in 1987 with the first experimental demonstration of the HOM effect.<ref name="04E">{{cite journal
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+ | pmid = 10035403
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+}}</ref> The KLM protocol(2001) demonstrated that universal linear optical quantum computing is possible by using only beam splitters, phase shifters, and single-photon detectors.It uses a process called Measurement-Induced Nonlinearity.<ref name="ML03">{{cite arxiv
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+ | last1 = Myers
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+ | first1 = Anne
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+ | last2 = Laflamme
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-| pages = 148
+ | eprint = quant-ph/0305082
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+}}</ref><ref name="06E">{{cite journal
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 }}</ref>
-<ref name="06K">{{cite journal
+== Recent years ==
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+Have witnessed significant progress in quantum communication and quantum internet with the emerging quantum photonic chips, whose characteristics of scalability, stability, and low cost, open up new possibilities in miniaturized essentials. This provides an overview of the advances in quantum photonic chips for quantum communication, beginning with a summary of the prevalent photonic integrated fabrication platforms and key components for integrated quantum communication systems. Then discusses a range of quantum communication applications, such as quantum key distribution and quantum teleportation. Finally, the review culminates with a perspective on challenges towards high-performance chip-based quantum communication, as well as a glimpse into future opportunities for integrated quantum networks. Recent advancements in '''integrated quantum photonics''' focus on on-chip beam splitters fabricated on silicon, silicon nitride, and femtosecond-laser-written waveguides. These platforms enable high-fidelity interference (visibilities <math>0.97</math>), even when utilizing independent molecular single-photon sources<ref name="01K">{{cite journal
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@@ Line 200: / Line 122: @@
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+}}</ref> important for the scalability of the quantum internet.<ref name="22G">{{cite journal
-<ref name="ML03">{{cite arxiv
+| last1 = Wehner
- | last1 = Myers
+| first1 = S.
- | first1 = Anne
+| last2 = Elkouss
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+| first2 = D.
- | first2 = Raymond
+| last3 = Hanson
- | title = Linear Optics Quantum Computation: An Overview
+| first3 = R.
- | eprint = quant-ph/0305082
+| title = Quantum internet: a vision for the road ahead
- | year = 2003
+| journal = Science
+| volume = 362
+| article-no = eaam9288
+| year = 2018
+| doi = 10.1126/science.aam9288
+}}</ref><ref name="23G">{{cite journal
+| last1 = Kimble
+| first1 = H. J.
+| title = The quantum internet
+| journal = Nature
+| volume = 453
+| pages = 1023–1030
+| year = 2008
+| doi = 10.1038/nature07127
 }}</ref>
-<ref name="Mayer">{{cite journal
+===='''Keywords''':====
-| last1 = Mayer
+Beam splitter, Integrated photonics, [[Physics:Quantum information theory|Quantum information]],waveguide beam splitter, quantum entanglement, photons, reflection coefficient, phase shift, photon statistics, Hong-Ou-Mandel effect.
-| first1 = B.
-| last2 = et al.
-| title = Long-term mutual phase locking of picosecond pulse pairs generated by a semiconductor nanowire laser
-| journal = Nature Communications
-| volume = 8
-| pages = 15521
-| year = 2017
-| url = https://www.nature.com/articles/ncomms15521
-}}</ref>
-<ref name="AluSplit">{{cite web
+===Quantum optical classifier===
-| last = Macleod
+Superexponential speedup classification is a central task in deep learning algorithms. Usually, images are first captured and then processed by a sequence of operations, of which the artificial neuron represents one of the fundamental units. This paradigm requires significant resources that scale (at least) linearly in the image resolution, both in terms of photons and computational operations. Present is a quantum optical pattern recognition method for binary classification tasks. It classifies objects without reconstructing their images, using the rate of two-photon coincidences at the output of a Hong-Ou-Mandel interferometer, where both the input and the classifier parameters are encoded into single-photon states. This method exhibits the behaviour of a classical neuron of unit depth. Once trained, it shows a constant <math>\mathcal{O}(1)</math> complexity in the number of computational operations and photons required by a single classification. This is a superexponential advantage over a classical artificial neuron.
-| first = H. A.
-| title = Thin-Film Optical Filters
-| edition = 5th
-| publisher = CRC Press / Taylor & Francis
-| location = Boca Raton
-| date = 2018
-| isbn = 9781351982238
-| doi = 10.1201/b21960
-| url = https://www.taylorfrancis.com/books/mono/10.1201/b21960/thin-film-optical-filters-angus-macleod
-}}</ref>
-<ref name="Fizeau1851">{{cite journal
+===On-chip integration===
- | last1 = Fizeau
+Of independent channels of indistinguishable single photons is a prerequisite for scalable optical quantum information processing. This requires separate solid-state single-photon emitters to exhibit identical lifetime-limited transitions. This challenging task is usually further exacerbated by spectral diffusion due to complex charge noise near material surfaces made by nanofabrication processes. A molecular quantum photonic chip that demonstrate on-chip Hong–Ou–Mandel quantum interference of indistinguishable single photons from independent molecules is developed. The molecules are embedded in a single-crystalline organic nanosheet and integrated with single-mode waveguides without nanofabrication, thereby ensuring stable, lifetime-limited transitions. With the aid of Stark tuning, 100 waveguide-coupled molecules can be tuned to the same frequency and achieve on-chip Hong–Ou–Mandel interference visibilities exceeding 0.97 for 2 molecules separately coupled to 2 waveguides. For two molecules with a controlled frequency difference, over 100-µs-long quantum beating in the interference, showing both excellent single-photon purity (particle nature) and long coherence (wave nature) of the emission.The results show a possible strategy towards constructing scalable optical universal quantum processors and a promising platform for studying waveguide quantum electrodynamics with identical single emitters wired via photonic circuits.
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- | url = https://www.academie-sciences.fr/pdf/dossiers/Fizeau/Fizeau_pdf/CR1851_p349.pdf
-}}
-</ref>
-<ref name="01E">{{cite web
+===Integrated Photonics in Quantum Technologies===
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+}}</ref>, underpinning universal quantum computing, quantum simulation and quantum networks. Although recent demonstrations of some preliminary quantum photonic applications primarily rely on parametric-process-based single-photon sources<ref name="04K">{{cite journal
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+==Overview==
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+[[File:Quantum_book1_optics_beam_splitter_experiments_yellow.png|thumb|upright=1.0|Video depicting the quantum teleportation protocol. The goal is to send a quantum state Q from one station, A, to another station, B. At first, a pair of entangled particles is distributed to A and B, which pair is shown as two particles connected by a wavy line and produced by source S. Once this preparation step is finished, the quantum teleportation itself begins. Station A measures its entangled particle together with the particle in state Q and obtains one of four possible results. These results are represented by different positions of an arrow in a "clock". The result is communicated to station B via the classical channel, represented as "radio waves". Based on the received message, station B chooses an appropriate device and applies it to its particle. In the video, the specific result measured by A is represented by an arrow pointing to the bottom right corner and so station B applies the bottom-right device. After the particle leaves the device, its state is Q, which is equal to the original state of the particle at station A. This way, the quantum teleportation of state Q is successfully completed.]]
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+Quantum states of light are basic resources for the realization of quantum information processing tasks, starting from pioneering experiments of quantum non-locality and quantum teleportation<ref name="20G">{{cite journal
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+}}</ref> and extending to modern quantum communication and computation efforts. The transition from bulk optics to integrated photonic circuits has been essential for scaling these technologies, enabling the miniaturization of complex interferometric networks on a single chip. The advantages of single-photon encoding include resistance to decoherence effects, the possibility of operation in an ambient temperature environment, and the ability to transfer photons via an optical fiber as well as free space communication links. The last decade has marked a growing complexity of photonic quantum technology efforts that have made possible the enhancement of quantum advantage experiments<ref name="02H" /><ref name="03H" /><ref name="04H" /> and quantum communication via satellites <ref name="05H" /><ref name="06H" />
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+An essential enabling technology in these advances is the coupling of photonic device components supporting the generation, manipulation, and detection of quantum states <ref name="07H" /><ref name="08H">{{cite journal
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+| title = Integrated photonic quantum technologies
+| journal = Nat. Photonics
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+| title = The potential and global outlook of integrated photonics for quantum technologies
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+}}</ref>. On-chip integration of independent channels of indistinguishable single photons is a prerequisite for scalable optical quantum information processing. Integrated photonics enables the realization of waveguides and reconfigurable optical components, which in turn make possible multi-port reprogrammable optical networks, and most recently, integrated processors merging both quantum state preparation and quantum processing.  A molecular quantum photonic chip has been developed, demonstrating on-chip Hong–Ou–Mandel quantum interference of indistinguishable single photons emitted from independent molecules..This requires separate solid-state single-photon emitters to exhibit identical lifetime-limited transitions.While the integration of single-photon detectors is still a challenge, some very promising advances have been made in recent years towards fully integrated photonic platforms. Compared to conventional discrete optical platforms, which demand a very careful alignment of discrete components, experience stability problems, and face cost scalability, quantum photonic chips on a microchip offer advantages in miniaturization, scalability, stability, and potentially low cost mass production. In this sense, quantum photonic chips constitute a highly promising platform for applied quantum communication, specifically in quantum key distribution (QKD), quantum secure direct communication, quantum teleportation<ref name="89H">{{cite journal
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+| last1 = Llewellyn
-}}</ref>
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+| title = Chip-to-chip quantum teleportation and multi-photon entanglement in silicon
+| journal = Nat. Phys.
+| volume = 16
+| issue = 2
+| pages = 148–153
+| year = 2020
+| doi = 10.1038/s41567-019-0727-x
+}}</ref><ref name="50H">{{cite journal
+| last1 = Dietrich
+| first1 = C. P.
+| title = GaAs integrated quantum photonics: Towards compact and multi-functional quantum photonic integrated circuits
+| journal = Laser & Photonics Rev.
+| volume = 10
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+}}</ref> , and, in general, in quantum networks.
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+Of all the necessary components of an integrated photonic circuit, beam splitter (BS) is an integral part of it. The theoretical foundations of BS in quantum optics and its relation to photon statistics, entanglement, and other phenomena like Hong-Ou-Mandel effect have long been established. The recent theoretical interest has particularly underscored how waveguide BSs can differ in terms of reflection and transmission coefficients for different frequencies, going against the conventional way of designing a beam splitter. As waveguide BSs play a vital role in designing scaled-down and scalable quantum optical components, a thorough understanding of both conventional and frequency-dependent beam splitters is necessary for carrying out experiments in integrated quantum communication.<br>[https://lab.quantumflytrap.com/lab/quantum-teleportation?mode=waves An interactive simulation of quantum teleportation in the Virtual Lab by Quantum Flytrap,]
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+== History ==
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+[[File:Table of Opticks, Cyclopaedia, Volume 2.jpg|thumb|1728 Cyclopeadia. Drawings of optical equipment]]
-| first = Z.-Y. J.
+====Key milestones:====
-| title = Multi-Photon Quantum Interference
+* 1851: The Fizeau experiment to measure the speeds of light in water. The Fizeau experiment, conducted by French physicist Hippolyte Fizeau (1819–1896), was a test to determine how the motion of a medium (water) affects the speed of light propagating through it. This was not a direct measurement of the absolute speed of light in stationary water (that had been approximated earlier), but rather an investigation into the relative speeds of light traveling with and against the flow of moving water.<ref name="Fizeau1851" /><br>
-| publisher = Springer
+* '''1965''': Angular momentum theory applied to optical fields, foundational for BS symmetries.<ref name="28E">{{cite web
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+| last = Biedenharn
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+| first = L. C.
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+| author2 = van Dam, H.
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+| title = Quantum Theory of Angular Momentum
-}}</ref>
+| publisher = Academic Press
+| date = 1965
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+| url = https://www.worldcat.org/title/quantum-theory-of-angular-momentum/oclc/318264
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+}}</ref><br>
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+* '''1966''': Density operators for coherent fields at BS, enabling statistical analysis.<ref name="26E">{{cite journal
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+  | title = Density operators for coherent fields
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+}}</ref><br>
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+* '''1981''': General properties of lossless BS in interferometry.<ref name="18E">{{cite journal
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+  | journal = American Journal of Physics
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+  | volume = 49
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+* '''1987''': Experimental observation of HOM effect, demonstrating two-photon bunching and quantum interference.<ref name="04E" /><br>
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+* '''1989''': SU(2) symmetry and photon statistics for lossless BS.<ref name="19E">{{cite journal
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+  | last1 = Campos
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+  | last2 = Saleh
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+  | first3 = M. C.
+  | title = Quantum-mechanical lossless beam splitter: Su(2) symmetry and photon statistics
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+  | journal = Phys. Rev. A
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+  | volume = 40
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+  | doi = 10.1103/PhysRevA.40.1371
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+* '''1995''': Unitary quantum description of BS.<ref name="27E">{{cite journal
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+  | title = A quantum description of the beam splitter
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+  | journal = Quantum Semiclass. Opt.
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+  | volume = 7
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+  | pages = 153–160
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+  | year = 1995
+  | doi = 10.1088/1355-5111/7/2/005
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+}}</ref><br>
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+* '''2001''': KLM protocol for efficient quantum computation with linear optics, establishing scalability using beam splitters, single-photon sources, and detectors.<ref name="06E" /><ref name="ML03" /><br>
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+* '''2002''': Demonstration that nonclassical inputs are required for BS-generated entanglement.<ref name="20E">{{cite journal
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-  | title = Quantum-mechanical lossless beam splitter: Su(2) symmetry and photon statistics
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@@ Line 516: / Line 440: @@
   | year = 2002
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+}}</ref><br>
+* '''2008''': Silica-on-silicon waveguide quantum circuits, advancing integrated photonic implementations of BS.<ref name="15E">{{cite journal
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+ | first1 = A.
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+ | journal = Science
+ | volume = 320
+ | pages = 646–649
+ | year = 2008
+ | doi = 10.1126/science.1155441
+}}</ref><br>
+* '''2018–2020''': Theoretical models of frequency-dependent effects in waveguide BS, including fluctuations in HOM detection.<ref name="24E">{{cite journal
+ | last1 = Makarov
+ | first1 = D. N.
+ | title = Theory of hom interference on coupled waveguides
+ | journal = Optics Letters
+ | volume = 45
+ | pages = 6322–6325
+ | year = 2020
+ | doi = 10.1364/OL.410518
+}}</ref><ref name="25E">{{cite journal
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+ | first1 = D. N.
+ | title = Fluctuations in the detection of the hom effect
+ | journal = Scientific Reports
+ | volume = 10
+ | pages = 20124
+ | year = 2020
+ | doi = 10.1038/s41598-020-77189-6
+}}</ref><br>
+* '''2020–2021''': Quantum entanglement and reflection coefficients in coupled waveguide BS models; frequency-dependent theory for waveguide BS.<ref name="17E">{{cite journal
+ | last1 = Makarov
+ | first1 = D. N.
+ | title = Theory of a frequency-dependent beam splitter in the form of coupled waveguides
+ | journal = Scientific Reports
+ | volume = 11
+ | pages = 5014
+ | year = 2021
+ | doi = 10.1038/s41598-021-84588-w
+}}</ref><ref name="21E">{{cite journal
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+  | first1 = D.
   | title = Quantum entanglement and reflection coefficient for coupled harmonic oscillators
   | journal = Physical Review E
@@ Line 527: / Line 496: @@
   | year = 2020
   | doi = 10.1103/PhysRevE.102.052213
-}}</ref>
+}}</ref><ref name="22E">{{cite journal
-<ref name="22E">{{cite journal
   | last1 = Makarov
   | first1 = D.
@@ Line 539: / Line 506: @@
   | year = 2021
   | doi = 10.1038/s41598-021-89838-5
-}}</ref>
+}}</ref><br>
+* '''2022''': Quantum entanglement for monochromatic and non-monochromatic photons on waveguide BS; comprehensive review systematizing conventional vs. frequency-dependent BS.<ref name="23E">{{cite journal
-<ref name="23E">{{cite journal
   | last1 = Makarov
   | first1 = D.
@@ Line 552: / Line 518: @@
   | year = 2022
   | doi = 10.3390/e24010049
-}}</ref>
+}}</ref><br>
+This timeline highlights the historical development from foundational quantum formulas to the recognition of frequency-dependent effects in waveguide implementations, which are important for scalable quantum technologies.
+[[File:Timeline Integration Quantum Optics Technology.png|center|Summary of the features of the principal fabrication technologies for what concerns the operating wavelengths, circuits geometry, integration of sources and detectors, and the interface with external fibers.]]
+== Theoretical Framework ==
+In quantum optics, the mathematical description of a beam splitter describes how the incoming annihilation operators <math>\hat{a}_1</math> and <math>\hat{a}_2</math> are transformed into the outgoing operators <math>\hat{b}_1</math> and <math>\hat{b}_2</math> by means of a unitary matrix. For a traditional beam splitter, this transformation can be written as
+<math> \begin{pmatrix} \hat{b}_1 \\ \hat{b}_2 \end{pmatrix} = U_{\text{BS}} \begin{pmatrix} \hat{a}_1 \\ \hat{a}_2 \end{pmatrix}, </math>
+where the unitary matrix is given by
-<ref name="24E">{{cite journal
+<math> U_{\text{BS}} = \begin{pmatrix} \sqrt{T}\, e^{i\phi} & \sqrt{R} \\ -\sqrt{R}\, e^{-i\phi} & \sqrt{T} \end{pmatrix}. </math>
- | last1 = Makarov
- | first1 = D. N.
- | title = Theory of hom interference on coupled waveguides
- | journal = Optics Letters
- | volume = 45
- | pages = 6322–6325
- | year = 2020
- | doi = 10.1364/OL.410518
-}}</ref>
-<ref name="25E">{{cite journal
+In these expressions, <math>T</math>, <math>R</math>, and <math>\phi</math> represent the transmission coefficient, reflection coefficient, and relative phase, respectively. The unitary nature of <math>U_{\text{BS}}</math> guarantees that bosonic commutation relations are preserved.
- | last1 = Makarov
- | first1 = D. N.
- | title = Fluctuations in the detection of the hom effect
- | journal = Scientific Reports
- | volume = 10
- | pages = 20124
- | year = 2020
- | doi = 10.1038/s41598-020-77189-6
-}}</ref>
-<ref name="26E">{{cite journal
+In the angular-momentum representation, the action of the beam splitter corresponds to an SU(2) rotation generated by angular momentum operators <math>\hat{L}_i</math>. The associated rotation angles are determined by the reflectivity <math>R</math> and the phase <math>\phi</math>.
- | last1 = Titulaer
- | first1 = U.
+For non-monochromatic light, the spectral degrees of freedom must also be taken into account. In this case, the output quantum state depends on the joint spectral amplitude function <math>\varphi(\omega_1,\omega_2)</math>, which must be integrated over the relevant frequency variables.
- | last2 = Glauber
- | first2 = R.
+Frequency-dependent beam splitters, commonly encountered in waveguide couplers, can be derived using coupled-mode theory. Within this framework, both the reflection coefficient <math>R</math> and the phase <math>\phi</math> depend explicitly on the frequencies <math>\omega_1</math> and <math>\omega_2</math>. A representative expression for the reflection coefficient is
- | title = Density operators for coherent fields
- | journal = Phys. Rev.
- | volume = 145
- | pages = 1041
- | year = 1966
- | doi = 10.1103/PhysRev.145.1041
-}}</ref>
-<ref name="27E">{{cite journal
+<math> R = \sin^2\!\left( \frac{\Omega\, t_{\text{BS}}}{2\sqrt{1+\varepsilon^2}} \right)\,(1+\varepsilon^2), </math>
- | last1 = Luis
- | first1 = A.
- | last2 = Sánchez-Soto
- | first2 = L.
- | title = A quantum description of the beam splitter
- | journal = Quantum Semiclass. Opt.
- | volume = 7
- | pages = 153–160
- | year = 1995
- | doi = 10.1088/1355-5111/7/2/005
-}}</ref>
-<ref name="28E">{{cite web
+where
-| last = Biedenharn
-| first = L. C.
-| author2 = van Dam, H.
-| title = Quantum Theory of Angular Momentum
-| publisher = Academic Press
-| date = 1965
-| isbn = 9781114824430
-| url = https://www.worldcat.org/title/quantum-theory-of-angular-momentum/oclc/318264
-}}</ref>
-<ref name="29E">Thorlabs 50:50 (R:T) non‑polarizing beamsplitter cube. Example product: BS005, 700‑1100&nbsp;nm. Manufacturer page: <a href="https://www.thorlabs.com/thorproduct.cfm?partnumber=BS005">https://www.thorlabs.com/thorproduct.cfm?partnumber=BS005</a>.</ref>
-<ref name="30E">{{cite journal
+<math> \varepsilon = \frac{\omega_2 - \omega_1}{\Omega}, </math>
- | last1 = Huang
- | first1 = W.-P.
+<math>\Omega</math> characterizes the coupling strength between the modes, and <math>t_{\text{BS}}</math> denotes the effective interaction time.
- | title = Coupled-mode theory for optical waveguides: an overview
- | journal = J. Opt. Soc. Am. A
+This spectral dependence significantly influences quantum interference and entanglement properties. To observe genuinely quantum effects, non-classical input states such as Fock states or squeezed states are required. Measures of entanglement, including concurrence, decrease when the spectral overlap between modes is limited.
- | volume = 11
- | pages = 963–983
+Photon-number statistics also depend on both the input state and the spectral structure. Coherent states exhibit Poissonian statistics, whereas non-classical states can display sub-Poissonian or super-Poissonian behavior. In multimode fields, frequency selectivity can lead to partial photon bunching.
- | year = 1994
- | doi = 10.1364/JOSAA.11.000963
+A prominent example of such interference phenomena is the Hong–Ou–Mandel (HOM) effect, in which two identical photons incident on a beam splitter tend to bunch together, resulting in suppressed coincidence counts. When the beam splitter is frequency dependent, spectral variations reduce the visibility of the Hong–Ou–Mandel dip. Generalizations of this effect include formulations based on wave packets as well as analogous interference phenomena involving fermions.
-}}</ref>
-<ref name="34E">{{cite journal
+==The beam splitter==
-  | last1 = Ekert
+Dates to classical interferometry in the 19th century (e.g., Michelson interferometer). Quantum applications emerged mid-20th century with quantum electrodynamics and lasers, The Hong-Ou-Mandel effect first demonstrated in 1987<ref name="04E" /> <ref name="55E">{{cite journal
+  | last1 = Lyons
   | first1 = A.
-  | title = Quantum cryptography based on Bell’s theorem
+  | title = Attosecond-resolution Hong–Ou–Mandel interferometry
   | journal = Phys. Rev. Lett.
-  | volume = 67
+ | volume = 4
-  | pages = 661
+ | pages = 9416
-  | year = 1991
+ | year = 2018
-  | doi = 10.1103/PhysRevLett.67.661
+ | doi = 10.1126/sciadv.aap9416
-}}</ref>
+}}</ref><ref name="58E">{{cite journal
+ | last1 = Lim
-<ref name="35E">{{cite journal
+ | first1 = Y.
-  | last1 = Bennett
+ | last2 = Beige
-  | first1 = C. H.
+ | first2 = A.
-  | last2 = Wiesner
+ | title = Generalized Hong–Ou–Mandel experiments with bosons and fermions
-  | first2 = S. J.
+ | journal = New J. Phys.
-  | title = Communication via one- and two-particle operators on Einstein-Podolsky-Rosen states
+ | volume = 7
-  | journal = Phys. Rev. Lett.
+ | pages = 155
-  | volume = 69
+ | year = 2005
+ | doi = 10.1088/1367-2630/7/1/155
+}}</ref><ref name="63E">{{cite journal
+ | last1 = Barbieri
+ | first1 = M.
+ | last2 = et al.
+ | title = What Hong–Ou–Mandel interference says on two-photon frequency entanglement
+ | journal = Sci. Rep.
+ | volume = 7
+ | pages = 7247
+ | year = 2017
+ | doi = 10.1038/s41598-017-07555-4
+}}</ref>. Entanglement by a beam splitter (2002) <ref name="20E" /> . Quantum entanglement and reflection coefficient for coupled harmonic oscillators (2020)<ref name="21E" />. Quantum entanglement and statistics of photons on a beam splitter in the form of coupled waveguides (2022) <ref name="22E" />.<br>Beam Splitters (BS) have a variety of forms, such as a glass plate with a coat of silver or a thin dielectric film, a glass prism with a coat along its diagonal, two parallel glass plates with a coat in between, or a thin film with a deposited coat. Waveguide BSs are formed by bringing two waveguides side by side so that their electromagnetic fields interact with each other<ref name="06E"/>.
+====Beam splitters vary by design and frequency dependence.<ref name="34E">{{cite journal
+ | last1 = Ekert
+ | first1 = A.
+ | title = Quantum cryptography based on Bell’s theorem
+ | journal = Phys. Rev. Lett.
+  | volume = 67
+  | pages = 661
+  | year = 1991
+  | doi = 10.1103/PhysRevLett.67.661
+}}</ref><ref name="35E">{{cite journal
+  | last1 = Bennett
+  | first1 = C. H.
+  | last2 = Wiesner
+  | first2 = S. J.
+  | title = Communication via one- and two-particle operators on Einstein-Podolsky-Rosen states
+  | journal = Phys. Rev. Lett.
+  | volume = 69
   | pages = 2881
   | year = 1992
   | doi = 10.1103/PhysRevLett.69.2881
-}}</ref>
+}}</ref>====
-<ref name="36E">{{cite journal
+'''Waveguide BS (directional couplers)''': <br>
-  | last1 = Shor
+Evanescent coupling between waveguides, ''R(ω) = sin²(κ(ω)L)''.<ref name="41E">{{cite journal
-  | first1 = P.
+  | last1 = Bennett
-  | title = Scheme for reducing decoherence in quantum computer memory
+  | first1 = C.
+ | last2 = Bernstein
+ | first2 = H.
+ | last3 = Popescu
+ | first3 = S.
+ | last4 = Schumacher
+ | first4 = B.
+  | title = Concentrating partial entanglement by local operations
   | journal = Phys. Rev. A
-  | volume = 52
+  | volume = 53
-  | pages = R2493
+  | pages = 2046–2052
-  | year = 1995
+  | year = 1996
-  | doi = 10.1103/PhysRevA.52.R2493
+  | doi = 10.1103/PhysRevA.53.2046
-}}</ref>
+}}</ref><ref name="42E">{{cite journal
+  | last1 = Casini
-<ref name="37E">{{cite journal
+  | first1 = H.
-  | last1 = Aspect
+  | last2 = Huerta
-  | first1 = A.
+  | first2 = M.
-  | last2 = Grangier
+  | title = Entanglement entropy in free quantum field theory
-  | first2 = P.
+  | journal = J. Phys. A: Math. Theor.
-  | last3 = Roger
+  | volume = 42
-  | first3 = G.
+ | pages = 504007
-  | title = Experimental tests of realistic local theories via Bell’s theorem
+ | year = 2009
-  | journal = Phys. Rev. Lett.
+  | doi = 10.1088/1751-8113/42/50/504007
-  | volume = 47
+}}</ref><ref name="43E">{{cite journal
-  | pages = 460–463
+ | last1 = Chen
-  | year = 1981
+ | first1 = Y.
-  | doi = 10.1103/PhysRevLett.47.460
+ | last2 = Hsieh
-}}</ref>
+ | first2 = M.
+ | title = Quantum entanglement by a beam splitter analogous to laser mode transformation by a cylindrical lens
-<ref name="38E">{{cite journal
+ | journal = Optics Letters
-  | last1 = Samuel
+  | volume = 46
-  | first1 = L.
+  | pages = 5129–5132
-  | last2 = Braunstein
+  | year = 2021
-  | first2 = H.
+  | doi = 10.1364/OL.437609
-  | last3 = Kimble
+}}</ref><ref name="44E">{{cite journal
-  | first3 = J.
+  | last1 = Jiang
-  | title = Teleportation of continuous quantum variables
+  | first1 = Z.
-  | journal = Phys. Rev. Lett.
+  | last2 = Lang
-  | volume = 80
+  | first2 = M.
-  | pages = 869–872
+  | last3 = Caves
-  | year = 1998
+  | first3 = C.
-  | doi = 10.1103/PhysRevLett.80.869
+  | title = Mixing nonclassical pure states in a linear-optical network almost always generates modal entanglement
-}}</ref>
+  | journal = Phys. Rev. A
+  | volume = 88
-<ref name="39E">{{cite journal
+  | pages = 044301
-  | last1 = Ekert
+  | year = 2013
-  | first1 = A.
+  | doi = 10.1103/PhysRevA.88.044301
-  | last2 = Knight
+}}</ref><ref name="45E">{{cite journal
-  | first2 = P.
+  | last1 = Berrada
-  | title = Entangled quantum systems and the Schmidt decomposition
+  | first1 = K.
-  | journal = Amer. J. Phys.
+  | last2 = Baz
-  | volume = 63
+  | first2 = M. E.
-  | pages = 415–423
+ | last3 = Saif
-  | year = 1995
+ | first3 = F.
-  | doi = 10.1119/1.17904
+ | last4 = Hassouni
-}}</ref>
+ | first4 = Y.
+ | last5 = Mnia
-<ref name="40E">{{cite journal
+ | first5 = S.
-  | last1 = Grobe
+  | title = Entanglement generation from deformed spin coherent states using a beam splitter
-  | first1 = R.
+  | journal = J. Phys. A: Math. Theor.
-  | last2 = Rzazewski
+  | volume = 42
-  | first2 = K.
+  | pages = 285306
-  | last3 = Eberly
+  | year = 2009
-  | first3 = J.
+  | doi = 10.1088/1751-8113/42/28/285306
-  | title = Measure of electron-electron correlation in atomic physics
+}}</ref><ref name="46E">{{cite journal
-  | journal = J. Phys. B
+  | last1 = Xiang-bin
-  | volume = 27
+  | first1 = W.
-  | pages = L503–L508
+ | title = Theorem for the beam-splitter entangler
-  | year = 1994
+ | journal = Phys. Rev. A
-  | doi = 10.1088/0953-4075/27/16/001
+ | volume = 66
+ | pages = 024303
+  | year = 2002
+  | doi = 10.1103/PhysRevA.66.024303
+}}</ref><ref name="47E">{{cite journal
+  | last1 = Makarov
+  | first1 = D. N.
+  | title = High intensity generation of entangled photons in a two-mode electromagnetic field
+  | journal = Annalen der Physik
+  | volume = 549
+  | pages = 1600408
+  | year = 2017
+  | doi = 10.1002/andp.201600408
 }}</ref>
-<ref name="41E">{{cite journal
+'''Waveguide BS''':<br> enable integration in photonic chips for quantum technologies.<ref name="48E">{{cite journal
-  | last1 = Bennett
+  | last1 = Holland
-  | first1 = C.
+  | first1 = M.
-  | last2 = Bernstein
+  | last2 = Burnett
-  | first2 = H.
+  | first2 = K.
- | last3 = Popescu
+  | title = Interferometric detection of optical phase shifts at the Heisenberg limit
- | first3 = S.
+  | journal = Phys. Rev. Lett.
- | last4 = Schumacher
+  | volume = 71
- | first4 = B.
+  | pages = 1355
-  | title = Concentrating partial entanglement by local operations
+  | year = 1993
-  | journal = Phys. Rev. A
+  | doi = 10.1103/PhysRevLett.71.1355
-  | volume = 53
+}}</ref><ref name="49E">{{cite journal
-  | pages = 2046–2052
+  | last1 = Polino
-  | year = 1996
+  | first1 = E.
-  | doi = 10.1103/PhysRevA.53.2046
+  | last2 = Valeri
-}}</ref>
-<ref name="42E">{{cite journal
-  | last1 = Casini
-  | first1 = H.
-  | last2 = Huerta
   | first2 = M.
-  | title = Entanglement entropy in free quantum field theory
+ | last3 = Spagnolo
-  | journal = J. Phys. A: Math. Theor.
+ | first3 = N.
-  | volume = 42
+ | last4 = Sciarrino
-  | pages = 504007
+ | first4 = F.
-  | year = 2009
+  | title = Photonic quantum metrology
-  | doi = 10.1088/1751-8113/42/50/504007
+  | journal = AVS Quantum Science
-}}</ref>
+  | volume = 2
+  | pages = 024703
-<ref name="43E">{{cite journal
+  | year = 2020
-  | last1 = Chen
+  | doi = 10.1116/5.0007577
-  | first1 = Y.
+}}</ref><ref name="50E">{{cite journal
-  | last2 = Hsieh
+  | last1 = Phoenix
-  | first2 = M.
+  | first1 = S.
-  | title = Quantum entanglement by a beam splitter analogous to laser mode transformation by a cylindrical lens
+  | last2 = Knight
-  | journal = Optics Letters
+  | first2 = P.
-  | volume = 46
+  | title = Fluctuations and entropy in models of quantum optical resonance
-  | pages = 5129–5132
+  | journal = Annals of Physics
-  | year = 2021
+  | volume = 186
-  | doi = 10.1364/OL.437609
+  | pages = 381–407
+  | year = 1988
+  | doi = 10.1016/0003-4916(88)90006-1
 }}</ref>
-<ref name="44E">{{cite journal
+'''Conventional beam splitters:'''<br>
-  | last1 = Jiang
+Cube, plate, or pellicle BS with nearly constant ''R'', ''T'', ''φ'' over bandwidths. Used in free-space experiments.<ref name="36E">{{cite journal
-  | first1 = Z.
+  | last1 = Shor
- | last2 = Lang
+  | first1 = P.
- | first2 = M.
+  | title = Scheme for reducing decoherence in quantum computer memory
- | last3 = Caves
- | first3 = C.
-  | title = Mixing nonclassical pure states in a linear-optical network almost always generates modal entanglement
   | journal = Phys. Rev. A
-  | volume = 88
+  | volume = 52
-  | pages = 044301
+  | pages = R2493
-  | year = 2013
+  | year = 1995
-  | doi = 10.1103/PhysRevA.88.044301
+  | doi = 10.1103/PhysRevA.52.R2493
-}}</ref>
+}}</ref><ref name="37E">{{cite journal
+ | last1 = Aspect
-<ref name="45E">{{cite journal
+ | first1 = A.
-  | last1 = Berrada
+ | last2 = Grangier
-  | first1 = K.
+ | first2 = P.
-  | last2 = Baz
+ | last3 = Roger
-  | first2 = M. E.
+ | first3 = G.
-  | last3 = Saif
+ | title = Experimental tests of realistic local theories via Bell’s theorem
-  | first3 = F.
+ | journal = Phys. Rev. Lett.
-  | last4 = Hassouni
+ | volume = 47
-  | first4 = Y.
+ | pages = 460–463
-  | last5 = Mnia
+ | year = 1981
-  | first5 = S.
+ | doi = 10.1103/PhysRevLett.47.460
-  | title = Entanglement generation from deformed spin coherent states using a beam splitter
+}}</ref><ref name="38E">{{cite journal
-  | journal = J. Phys. A: Math. Theor.
+  | last1 = Samuel
-  | volume = 42
+  | first1 = L.
-  | pages = 285306
+  | last2 = Braunstein
-  | year = 2009
+  | first2 = H.
-  | doi = 10.1088/1751-8113/42/28/285306
+  | last3 = Kimble
+  | first3 = J.
+ | title = Teleportation of continuous quantum variables
+ | journal = Phys. Rev. Lett.
+ | volume = 80
+ | pages = 869–872
+ | year = 1998
+ | doi = 10.1103/PhysRevLett.80.869
+}}</ref><ref name="39E">{{cite journal
+  | last1 = Ekert
+  | first1 = A.
+  | last2 = Knight
+  | first2 = P.
+  | title = Entangled quantum systems and the Schmidt decomposition
+  | journal = Amer. J. Phys.
+ | volume = 63
+ | pages = 415–423
+ | year = 1995
+ | doi = 10.1119/1.17904
+}}</ref><ref name="40E">{{cite journal
+ | last1 = Grobe
+ | first1 = R.
+ | last2 = Rzazewski
+ | first2 = K.
+ | last3 = Eberly
+ | first3 = J.
+ | title = Measure of electron-electron correlation in atomic physics
+ | journal = J. Phys. B
+  | volume = 27
+  | pages = L503–L508
+  | year = 1994
+  | doi = 10.1088/0953-4075/27/16/001
 }}</ref>
-<ref name="46E">{{cite journal
+'''Frequency-dependent beam splitters:'''<br>
- | last1 = Xiang-bin
+Coupled-mode theory: dâ<sub>1</sub>/dz = -i δ â<sub>1</sub> - i κ â<sub>2</sub>, yielding frequency-dependent U<sub>ij</sub>(ω).<ref name="64E">{{cite web
- | first1 = W.
+| last = Shih
- | title = Theorem for the beam-splitter entangler
+| first = Y.
- | journal = Phys. Rev. A
+| title = Advances in Atomic, Molecular, and Optical Physics
- | volume = 66
+| volume = 41
- | pages = 024303
+| publisher = Academic Press
- | year = 2002
+| location = Cambridge
- | doi = 10.1103/PhysRevA.66.024303
+| date = 1999
-}}</ref>
+| isbn = 9780120038411
+| url = https://www.sciencedirect.com/bookseries/advances-in-atomic-molecular-and-optical-physics/vol/41/suppl/C
+}}</ref><ref name="17E" /><ref name="22E" /><ref name="23E" />
-<ref name="47E">{{cite journal
+== Theory of Waveguide Beam Splitters ==
- | last1 = Makarov
+While classical beam splitters are often treated as constant, the scattering matrix for a waveguide beam splitter is explicitly frequency-dependent. The transformation of input modes into output modes is represented as:<br>
- | first1 = D. N.
+<math>
- | title = High intensity generation of entangled photons in a two-mode electromagnetic field
+\begin{pmatrix}
- | journal = Annalen der Physik
+\hat{a}_{\text{out},1} \\
- | volume = 549
+\hat{a}_{\text{out},2}
- | pages = 1600408
+\end{pmatrix}
- | year = 2017
+=
- | doi = 10.1002/andp.201600408
+\begin{pmatrix}
-}}</ref>
+R(\omega) & T(\omega) \\
+-T^*(\omega) & R(\omega)
-<ref name="48E">{{cite journal
+\end{pmatrix}
- | last1 = Holland
+\begin{pmatrix}
- | first1 = M.
+\hat{a}_{\text{in},1} \\
- | last2 = Burnett
+\hat{a}_{\text{in},2}
- | first2 = K.
+\end{pmatrix}
- | title = Interferometric detection of optical phase shifts at the Heisenberg limit
+</math><br>
- | journal = Phys. Rev. Lett.
+Here, the reflection <math>R(\omega)</math> and transmission <math>T(\omega)</math> coefficients are determined by the coupling constant and the interaction length within the waveguide. This frequency dependence is crucial for accurately describing the interference of non-monochromatic single photons. <ref name="23E" />
- | volume = 71
- | pages = 1355
- | year = 1993
- | doi = 10.1103/PhysRevLett.71.1355
-}}</ref>
-<ref name="49E">{{cite journal
+====Waveguide BS====
- | last1 = Polino
+Has some important advantages over a conventional BS: they are significantly more compact and have other advantages in terms of performance and integration<ref name="15E"/>. BS can be classified in different ways, including their characteristics, such as polarizing BS and non-polarizing BS, and other distinct characteristics<ref name="18E"/>. A BS in quantum optics can be described regardless of its physical implementation, as shown in Figure 1(a); BS illustrations vary based on BS type, as in Figure 1(b)<ref name="03E">{{cite web
- | first1 = E.
+| author = Rodney Loudon
- | last2 = Valeri
+| title = The Quantum Theory of Light
- | first2 = M.
+| publisher = Oxford University Press
- | last3 = Spagnolo
+| year = 2000
- | first3 = N.
+| doi = 10.1093/oso/9780198501770.002.0001
- | last4 = Sciarrino
+| url = https://doi.org/10.1093/oso/9780198501770.002.0001
- | first4 = F.
+| isbn = 9780198501770
- | title = Photonic quantum metrology
+}}</ref>.
- | journal = AVS Quantum Science
+In quantum optics, aluminium-coated beam splitters Figure 1(c) <ref name="AluSplit">{{cite web
- | volume = 2
+| last = Macleod
- | pages = 024703
+| first = H. A.
- | year = 2020
+| title = Thin-Film Optical Filters
- | doi = 10.1116/5.0007577
+| edition = 5th
-}}</ref>
+| publisher = CRC Press / Taylor & Francis
+| location = Boca Raton
+| date = 2018
+| isbn = 9781351982238
+| doi = 10.1201/b21960
+| url = https://www.taylorfrancis.com/books/mono/10.1201/b21960/thin-film-optical-filters-angus-macleod
+}}</ref> are often modeled as ideal two-port devices characterized solely by
+𝑅
+R,
+𝑇
+T, and a relative phase shift
+𝜙
+ϕ between reflected and transmitted fields. The metallic coating introduces a well-defined phase relation between the output modes, allowing such beam splitters to be used in interference experiments, including Hong–Ou–Mandel–type configurations, despite their intrinsic losses.
+<div style="column-count:3; column-gap:2em; margin-left:0; padding-left:0;">
+[[File:Beam Splitter (a).png|thumb|left|A Beam Splitter (BS) scheme with two input ports and two output ports]]
+[[File:Beam Splitter (b).png|thumb|The BS with free space optics, i.e., cubic BS (top) and fiber optics, i.e., waveguide BS (bottom).]]
+[[File:Flat metal-coated beamsplitter.png|thumb|Figure 1(c). Aluminium-coated beam splitter.]]
+  </div>
-<ref name="50E">{{cite journal
+Two main parameters characterizing a BS in quantum optics are the reflection coefficient <math>R</math> (or transmission coefficient <math>T</math>, which satisfies <math>R + T = 1</math>) and the phase angle <math>\phi</math><ref name="19E"/>. In conventional reviews of quantum optics, during calculations concerning the behavior of photons (or electromagnetic waves) in the output ports or in devices incorporating a BS, parameters <math>R</math> and <math>\phi</math> are considered to be definite numbers<ref name="07E">{{cite journal
-  | last1 = Phoenix
+  | last1 = Pan
-  | first1 = S.
+  | first1 = J. W.
- | last2 = Knight
+  | title = Multiphoton entanglement and interferometry
- | first2 = P.
+  | journal = Rev. Mod. Phys.
-  | title = Fluctuations and entropy in models of quantum optical resonance
+  | volume = 84
-  | journal = Annals of Physics
+  | pages = 777
-  | volume = 186
+  | year = 2012
-  | pages = 381–407
+  | doi = 10.1103/RevModPhys.84.777
-  | year = 1988
+}}</ref>.
-  | doi = 10.1016/0003-4916(88)90006-1
-}}</ref>
+For instance, in the Hong–Ou–Mandel (HOM) effect, an equal splitter with <math>R = T = \tfrac{1}{2}</math> is used, which is independent of <math>\phi</math><ref name="04E"/>.  <math>R</math> and <math>\phi</math> are functions of the wavelength or frequency of the incoming light, and <math>R = R(\lambda)</math> and <math>\phi = \phi(\lambda)</math> in both cases, regardless of which BS is used<ref name="17E"/>. If a fixed wavelength or a small frequency band is used in the experiment, this dependency can be ignored, and the output photons can be considered constant. This has long been considered self-evident<ref name="07E"/>.
-<ref name="51E">{{cite journal
+However, in some cases, <math>R</math> and <math>\phi</math> are not constant by definition, and their frequency dependence is strong enough to affect, in a substantial way, the quantum state of light waves distributed in the output ports. Phenomena related to entanglement of light waves in a BS, unlike in the constant-parameter setting, behave differently if waveguide BSs (further referred to as fiber-optic BSs) are considered, since they differ from other BSs in this respect<ref name="17E"/><ref name="22E"/>.
- | last1 = Gisin
- | first1 = N.
- | last2 = Ribordy
- | first2 = G.
- | last3 = Tittel
- | first3 = W.
- | last4 = Zbinden
- | first4 = H.
- | title = Quantum cryptography
- | journal = Rev. Mod. Phys.
- | volume = 74
- | pages = 145–195
- | year = 2002
- | doi = 10.1103/RevModPhys.74.145
-}}</ref>
-<ref name="52E">{{cite journal
+There is a theoretical basis for frequency-dependent waveguide BS. It shows that for a waveguide model interpreted as two coupled waveguides, the amplitude reflection and transmission coefficients <math>R</math> and <math>T</math> become frequency-dependent for the photons entering the BS<ref name="17E"/>. Accounting for this frequency dependence requires corrections to established theories, such as HOM interferometer fringe analysis<ref name="24E"/><ref name="25E"/> and BS-generated entanglement of photons<ref name="22E"/><ref name="23E"/>. This pronounced frequency dependence of <math>R</math> and <math>T</math> is a distinct characteristic of waveguide BSs<ref name="17E"/>.
- | last1 = Fearn
- | first1 = H.
- | last2 = Loudon
- | first2 = R.
- | title = Theory of two-photon interference
- | journal = J. Opt. Soc. Am. B
- | volume = 6
- | pages = 917–927
- | year = 1989
- | doi = 10.1364/JOSAB.6.000917
-}}</ref>
-<ref name="53E">{{cite journal
+There is a need for a comprehensive analysis that classifies BS in quantum optics into two types: conventional (frequency-independent) and frequency-dependent. Based on this classification, researchers can examine differences in photon entanglement at the output ports. The present analysis performs exactly this, considering entanglement, photon statistics at the outputs, and the HOM effect<ref name="22E"/><ref name="24E"/>.
- | last1 = Steinberg
- | first1 = A.
+== Beam splitter in quantum optics ==
- | last2 = Kwiat
+* Beam splitters also enable quantum optical neural networks for tasks like image classification and optimal quantum cloning, offering variational quantum algorithms and perceptron models that exploit entanglement for supervised learning.<ref name="15L">Cai, X.-D. et al. Entanglement-based machine learning on a quantum computer. ''Phys. Rev. Lett.'' '''114''', 110504 (2015). [https://doi.org/10.1103/PhysRevLett.114.110504 doi:10.1103/PhysRevLett.114.110504]</ref><ref name="16L">Benatti, F., Mancini, S. & Mangini, S. Continuous variable quantum perceptron. ''Int. J. Quantum Inf.'' '''17''', 1941009 (2019).</ref><ref name="17L">Tacchino, F., Macchiavello, C., Gerace, D. & Bajoni, D. An artificial neuron implemented on an actual quantum processor. ''Npj Quant. Inf.'' '''5''', 26 (2019). [https://doi.org/10.1038/s41534-019-0140-4 doi:10.1038/s41534-019-0140-4]</ref><ref name="22L">Steinbrecher, G. R., Olson, J. P., Englund, D. & Carolan, J. Quantum optical neural networks. ''Npj Quantum Inf.'' '''5''', 60 (2019). [https://doi.org/10.1038/s41534-019-0174-7 doi:10.1038/s41534-019-0174-7]</ref><ref name="23L">Killoran, N. et al. Continuous-variable quantum neural networks. ''Phys. Rev. Res.'' '''1''', 033063 (2019). [https://doi.org/10.1103/PhysRevResearch.1.033063 doi:10.1103/PhysRevResearch.1.033063]</ref><ref name="27L">Stanev, D., Spagnolo, N. & Sciarrino, F. Deterministic optimal quantum cloning via a quantum-optical neural network. ''Phys. Rev. Res.'' '''5''', 013139 (2023). [https://doi.org/10.1103/PhysRevResearch.5.013139 doi:10.1103/PhysRevResearch.5.013139]</ref> Photonics-based implementations further integrate nonlinear activations and diffractive networks for all-optical machine learning.<ref name="07L">Shastri, B. J. et al. Photonics for artificial intelligence and neuromorphic computing. ''Nat. Photon.'' '''15''', 102–114 (2021). [https://doi.org/10.1038/s41566-020-00754-y doi:10.1038/s41566-020-00754-y]</ref><ref name="08L">Lin, X. et al. All-optical machine learning using diffractive deep neural networks. ''Science'' '''361''', 1004–1008 (2018). [https://doi.org/10.1126/science.aat8084 doi:10.1126/science.aat8084]</ref><ref name="09L">Zuo, Y. et al. All-optical neural network with nonlinear activation functions. ''Optica'' '''6''', 1132–1137 (2019). [https://doi.org/10.1364/OPTICA.6.001132 doi:10.1364/OPTICA.6.001132]</ref><ref name="13L">McMahon, P. L. The physics of optical computing. ''Nat. Rev. Phys.'' '''5''', 717–734 (2023). [https://doi.org/10.1038/s42254-023-00645-5 doi:10.1038/s42254-023-00645-5]</ref> Recent QML models address barren plateaus and demonstrate quantum verification of NP problems.<ref name="19L">Cerezo, M. et al. Variational quantum algorithms. ''Nat. Rev. Phys.'' '''3''', 625–644 (2021). [https://doi.org/10.1038/s42254-021-00348-9 doi:10.1038/s42254-021-00348-9]</ref><ref name="20L">Cerezo, M., Larocca, M., García-Martín, D., Diaz, N. L., Braccia, P., Fontana, E., Rudolph, M. S., Bermejo, P., Ijaz, A., Thanasilp, S., Anschuetz, E. R. & Holmes, Z. Does provable absence of barren plateaus imply classical simulability? Or, why we need to rethink variational quantum computing. ''Nature Communications'' '''16''', 7907 (2025). [https://doi.org/10.1038/s41467-025-63099-6 doi:10.1038/s41467-025-63099-6]</ref><ref name="26L">Zhang, A. et al. Quantum verification of NP problems with single photons and linear optics. ''Light Sci. Appl.'' '''10''', 169 (2021). [https://doi.org/10.1038/s41377-021-00608-4 doi:10.1038/s41377-021-00608-4]</ref>"
- | first2 = P.
- | last3 = Chiao
+Since a beam splitter (BS) separates incoming beams, the quantum state of photons at the BS output ports is given by
- | first3 = R. Y.
- | title = Dispersion cancellation and high-resolution time measurements in a fourth-order optical interferometer
- | journal = Phys. Rev. A
- | volume = 45
- | pages = 6659
- | year = 1992
- | doi = 10.1103/PhysRevA.45.6659
-}}</ref>
-<ref name="54E">{{cite journal
+<math> | \mathrm{out} \rangle = e^{i \hat{H} t_{\mathrm{BS}}} | \mathrm{in} \rangle , </math>
- | last1 = Legero
- | first1 = T.
- | last2 = Wilk
- | first2 = T.
- | last3 = Hennrich
- | first3 = M.
- | last4 = Rempe
- | first4 = G.
- | last5 = Kuhn
- | first5 = A.
- | title = Quantum beat of two single photons
- | journal = Phys. Rev. Lett.
- | volume = 93
- | pages = 070503
- | year = 2004
- | doi = 10.1103/PhysRevLett.93.070503
-}}</ref>
-<ref name="55E">{{cite journal
+where <math>\hat{H}</math> is the Hamiltonian of the quantized electromagnetic field interacting with matter, <math>t_{\mathrm{BS}}</math> is the interaction time, and <math>| \mathrm{in} \rangle</math> is the initial state of the electromagnetic field.  <math>\hat{H}</math> can be quite complex, depending on the type of beam splitter.
- | last1 = Lyons
- | first1 = A.
+In general, the initial state can be represented as <ref name="13E">{{cite web
- | title = Attosecond-resolution Hong–Ou–Mandel interferometry
+| last = Ou
- | journal = Phys. Rev. Lett.
+| first = Z.-Y. J.
- | volume = 4
+| title = Multi-Photon Quantum Interference
- | pages = 9416
+| publisher = Springer
- | year = 2018
+| location = New York
- | doi = 10.1126/sciadv.aap9416
+| date = 2007
-}}</ref>
+| doi = 10.1007/978-0-387-25554-5
+| url = https://link.springer.com/book/10.1007/978-0-387-25554-5
+}}</ref><ref name="26E" />
-<ref name="56E">{{cite journal
+<math> | \mathrm{in} \rangle = \sum_{s_1,s_2} C_{s_1,s_2} \frac{1}{\sqrt{s_1! s_2!}} (\hat{a}_1^\dagger)^{s_1} (\hat{a}_2^\dagger)^{s_2} |0\rangle_1 |0\rangle_2 , </math>  <sub>(Eq. (1))</sub>
- | last1 = Wang
- | first1 = K.
- | title = Quantum theory of two-photon wavepacket interference in a beamsplitter
- | journal = J. Phys. B: At. Mol. Opt. Phys.
- | volume = 39
-  | pages = R293
- | year = 2006
- | doi = 10.1088/0953-4075/39/23/R01
-}}</ref>
-<ref name="57E">{{cite arxiv
+where the creation operators of the first and second modes are <math>\hat{a}_1^\dagger</math> and <math>\hat{a}2^\dagger</math>, respectively. The integers <math>s_1</math> and <math>s_2</math> are the quantum numbers of the first and second modes (i.e. the number of photons in each mode). The coefficients <math>C{s_1,s_2}</math> define the initial state, and <math>|0\rangle_1 |0\rangle_2</math> are the vacuum states of modes 1 and 2. For convenience, it is <math>|0\rangle_1 |0\rangle_2 \equiv |0\rangle</math>.
- | author = Branczyk, A. M.
- | title = Hong–Ou–Mandel interference
- | arxiv = 1711.00080
- | year = 2017
-}}</ref>
-<ref name="58E">{{cite journal
+If the initial states are Fock states, then the coefficients satisfy <math>C_{s_1,s_2} = 1</math>. In this case, it is straightforward to show (up to an insignificant phase) that <ref name="01E">{{cite web
- | last1 = Lim
+| last = Mandel
- | first1 = Y.
+| first = L.
- | last2 = Beige
+| author2 = Wolf, E.
- | first2 = A.
+| title = Optical Coherence and Quantum Optics
- | title = Generalized Hong–Ou–Mandel experiments with bosons and fermions
+| publisher = Cambridge University Press
- | journal = New J. Phys.
+| location = Cambridge
- | volume = 7
+| date = 1995
- | pages = 155
+| isbn = 9780521417112
- | year = 2005
+| url = https://www.cambridge.org/core/books/optical-coherence-and-quantum-optics/6D4D0B8D4A4E4A4E4A4E4A4E4A4E4A4E
- | doi = 10.1088/1367-2630/7/1/155
+}}</ref><ref name="13E" /><ref name="26E" />
-}}</ref>
+<math> | \mathrm{out} \rangle = \sum_{s_1,s_2} C_{s_1,s_2} \frac{1}{\sqrt{s_1! s_2!}} (\hat{b}_1^\dagger)^{s_1} (\hat{b}_2^\dagger)^{s_2} |0\rangle , </math>
-<ref name="59E">{{cite journal
+with
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- | first2 = R.
- | last3 = Noguchi
- | first3 = A.
- | last4 = Urabe
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- | title = Quantum theory of two-photon wavepacket interference in a beamsplitter
- | journal = Nature
- | volume = 527
- | pages = 74–77
- | year = 2015
- | doi = 10.1038/nature15521
-}}</ref>
-<ref name="60E">{{cite web
+<math> \hat{b}_k^\dagger = e^{i \hat{H} t_{\mathrm{BS}}} \hat{a}_k^\dagger e^{-i \hat{H} t_{\mathrm{BS}}}, \qquad k = 1,2 . </math>  <sub>(Eq. (2))</sub>
-| last = Aspect
-| first = A.
+Here <math>\hat{b}_1^\dagger</math> and <math>\hat{b}_2^\dagger</math> are the creation operators at the output ports of the beam splitter for modes 1 and 2, respectively.
-| title = Hanbury Brown and Twiss, Hong Ou and Mandel effects and other landmarks in quantum optics: from photons to atoms
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-| date = 2019
-| doi = 10.1093/oso/9780198837190.003.0012
-| url = https://academic.oup.com/book/32944/chapter-abstract/276804035
-}}</ref>
-<ref name="61E">{{cite journal
+For any lossless two-mode beam splitter, the transformation between input and output operators is governed by a unitary matrix, <math>\mathbf{U}_{BS}</math>, constrained by the conservation of energy and bosonic commutation relations:<ref name="18E" /><ref name="19E" /><ref name="27E" />
- | last1 = Grice
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- | title = Spectral information and distinguishability in type-II down-conversion with a broadband pump
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- | doi = 10.1103/PhysRevA.56.1627
-}}</ref>
-<ref name="62E">{{cite journal
+<math> \begin{pmatrix} \hat{b}_1 \ \hat{b}2 \end{pmatrix} = \mathbf{U}{BS} \begin{pmatrix} \hat{a}_1 \ \hat{a}_2 \end{pmatrix} = \begin{pmatrix} t & r \ r' & t' \end{pmatrix} \begin{pmatrix} \hat{a}_1 \ \hat{a}_2 \end{pmatrix} </math>  <sub>(Eq. (3)}</sub>
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- | title = Restoring dispersion cancellation for entangled photons produced by ultrashort pulses
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-}}</ref>
-<ref name="63E">{{cite journal
+The requirement for unitarity (<math>\mathbf{U}^\dagger \mathbf{U} = \mathbf{I}</math>) implies that the transmission and reflection coefficients satisfy:
- | last1 = Barbieri
- | first1 = M.
+<math>|r|^2 + |t|^2 = 1</math> (Energy conservation)
- | last2 = et al.
- | title = What Hong–Ou–Mandel interference says on two-photon frequency entanglement
+<math>r^* t' + t^* r' = 0</math> (Phase relationship between ports)
- | journal = Sci. Rep.
- | volume = 7
+For a symmetric 50:50 beam splitter, this is commonly expressed as:
- | pages = 7247
- | year = 2017
+<math> \mathbf{U}_{BS} = \frac{1}{\sqrt{2}} \begin{pmatrix} 1 & i \ i & 1 \end{pmatrix} </math>
- | doi = 10.1038/s41598-017-07555-4
+In the literature, one often encounters different representations of the beam splitter matrix. The most commonly used case corresponds to a phase shift <math>\phi = \pi/2</math>, while another frequently used representation sets <math>\phi = 0</math>. In these cases the matrix <math>U_{\mathrm{BS}}</math> takes the forms
-}}</ref>
+<math> U_{\mathrm{BS}} = \begin{pmatrix} \sqrt{T} & i \sqrt{R} \\ i \sqrt{R} & \sqrt{T} \end{pmatrix}, \qquad U_{\mathrm{BS}} = \begin{pmatrix} \sqrt{T} & \sqrt{R} \\ - \sqrt{R} & \sqrt{T} \end{pmatrix}. </math>   <sub>(Eq. (4)</sub>
-<ref name="64E">{{cite web
+Both representations are valid only when the final result is independent of the phase shift <math>\phi</math>. As shown below, many quantities of interest in quantum optics, such as quantum entanglement at the output ports of the beam splitter, do not depend on this phase. Nevertheless, using the general form given in Eq. (3).
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-}}</ref>
-<!--Recent progress in quantum photonic chips for quantum communication and internet-->
+In reality, photons are not monochromatic and their frequency distribution must be taken into account <ref name="01G">{{cite conference
-<ref name="01G">{{cite conference
   | last1 = Bennett
   | first1 = C. H.
@@ Line 1,061: / Line 957: @@
   | url = https://arxiv.org/abs/2003.06557
 }}
-</ref>
+</ref><ref name="05G">{{cite journal
+| last1 = Xu
-<ref name="02G">{{cite journal
+| first1 = F. H.
-| last1 = Bennett
+| last2 = Ma
-| first1 = C. H.
+| first2 = X.
-| last2 = Bessette
+| last3 = Zhang
-| first2 = F.
+| first3 = Q.
-| last3 = Brassard
+| last4 = Lo
-| first3 = G.
+| first4 = H.-K.
-| last4 = Salvail
+| last5 = Pan
-| first4 = L.
+| first5 = J.-W.
-| last5 = Smolin
+| title = Secure quantum key distribution with realistic devices
-| first5 = J.
+| journal = Rev. Mod. Phys.
-| title = Experimental quantum cryptography
+| volume = 92
-| journal = J. Cryptol.
+| issue = 2
-| volume = 5
+| article-no = 025002
-| issue = 1
+| year = 2020
-| pages = 3–28
+| doi = 10.1103/RevModPhys.92.025002
-| year = 1992
+}}</ref> In this case, the initial wave function of the photons is
-| doi = 10.1007/BF00191318
-}}</ref>
+<math> | \mathrm{in} \rangle = \sum_{s_1,s_2} C_{s_1,s_2} \frac{1}{\sqrt{s_1! s_2!}} \int \Phi(\omega_1,\omega_2) (\hat{a}_1^\dagger)^{s_1} (\hat{a}_2^\dagger)^{s_2} |0\rangle \, d\omega_1 d\omega_2 , </math>  <sub>(Eq. (5))</sub>
-<ref name="03G">{{cite journal
+where <math>\Phi(\omega_1,\omega_2)</math> is the joint spectral amplitude (JSA) of the two-mode wave function. Assuming normalization,
-| last1 = Shor
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+<math> \int |\Phi(\omega_1,\omega_2)|^2 \, d\omega_1 d\omega_2 = 1 , </math>
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+the output state is
-| title = Simple proof of security of the BB84 quantum key distribution protocol
-| journal = Phys. Rev. Lett.
-| volume = 85
-| issue = 2
-| pages = 441–444
-| year = 2000
-| doi = 10.1103/PhysRevLett.85.441
-}}</ref>
-<ref name="04G">{{cite journal
+<math> | \mathrm{out} \rangle = \sum_{s_1,s_2} C_{s_1,s_2} \frac{1}{\sqrt{s_1! s_2!}} \int \Phi(\omega_1,\omega_2) (\hat{b}_1^\dagger)^{s_1} (\hat{b}_2^\dagger)^{s_2} |0\rangle \, d\omega_1 d\omega_2 . </math>  <sub>(Eq. (6))</sub>
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-| title = Quantum cryptography
-| journal = Rev. Mod. Phys.
-| volume = 74
-| issue = 1
-| pages = 145–195
-| year = 2002
-| doi = 10.1103/RevModPhys.74.145
-}}</ref>
-<ref name="05G">{{cite journal
+== Quantum mechanical description ==
-| last1 = Xu
+The output state is ''|Ψ<sub>out</sub>⟩ = e<sup>iĤ t</sup><sub>BS</sub> |Ψ<sub>in</sub>⟩'', where Ĥ is the Hamiltonian and ''t''<sub>BS</sub> the interaction time.<ref name="51E">{{cite journal
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+ | last1 = Gisin
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+ | first1 = N.
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+ | last2 = Ribordy
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+ | first2 = G.
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+ | last3 = Tittel
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+ | first3 = W.
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+ | last4 = Zbinden
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+ | first4 = H.
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+ | title = Quantum cryptography
-| title = Secure quantum key distribution with realistic devices
+ | journal = Rev. Mod. Phys.
-| journal = Rev. Mod. Phys.
+ | volume = 74
-| volume = 92
+ | pages = 145–195
-| issue = 2
+ | year = 2002
-| article-no = 025002
+ | doi = 10.1103/RevModPhys.74.145
-| year = 2020
+}}</ref><ref name="52E">{{cite journal
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+ | last1 = Fearn
-}}</ref>
+ | first1 = H.
+ | last2 = Loudon
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+ | title = Theory of two-photon interference
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+ | journal = J. Opt. Soc. Am. B
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+ | volume = 6
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+ | pages = 917–927
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+ | year = 1989
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+ | doi = 10.1364/JOSAB.6.000917
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+}}</ref><ref name="53E">{{cite journal
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-}}</ref>
+ | title = Dispersion cancellation and high-resolution time measurements in a fourth-order optical interferometer
+ | journal = Phys. Rev. A
-<ref name="07G">{{cite journal
+ | volume = 45
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+ | pages = 6659
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+ | year = 1992
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+ | doi = 10.1103/PhysRevA.45.6659
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 }}</ref>
+For monochromatic light, the input is |Ψ<sub>in</sub>⟩ = ∑<sub>s<sub>1</sub>,s<sub>2</sub></sub> C<sub>s<sub>1</sub>,s<sub>2</sub></sub> (â<sup>†</sup><sub>1</sub><sup>s<sub>1</sub></sup> â<sup>†</sup><sub>2</sub><sup>s<sub>2</sub></sup> / √(s<sub>1</sub>! s<sub>2</sub>!)) |0⟩<sub>1</sub> |0⟩<sub>2</sub>.<ref name="54E">{{cite journal
+ | last1 = Legero
+ | first1 = T.
+ | last2 = Wilk
+ | first2 = T.
+ | last3 = Hennrich
+ | first3 = M.
+ | last4 = Rempe
+ | first4 = G.
+ | last5 = Kuhn
+ | first5 = A.
+ | title = Quantum beat of two single photons
+ | journal = Phys. Rev. Lett.
+ | volume = 93
+ | pages = 070503
+ | year = 2004
+ | doi = 10.1103/PhysRevLett.93.070503
+}}</ref><ref name="55E" />
+The unitary matrix U<sub>BS</sub> is:
+: <math>\begin{pmatrix} \hat{b}_1 \ \hat{b}_2 \end{pmatrix} = \begin{pmatrix} \sqrt{T} & e^{i\phi} \sqrt{R} \ -e^{-i\phi} \sqrt{R} & \sqrt{T} \end{pmatrix} \begin{pmatrix} \hat{a}_1 \ \hat{a}_2 \end{pmatrix}</math><ref name="56E">{{cite journal
+ | last1 = Wang
+ | first1 = K.
+ | title = Quantum theory of two-photon wavepacket interference in a beamsplitter
+ | journal = J. Phys. B: At. Mol. Opt. Phys.
+ | volume = 39
+ | pages = R293
+ | year = 2006
+ | doi = 10.1088/0953-4075/39/23/R01
+}}</ref><ref name="57E">{{cite arxiv
+ | author = Branczyk, A. M.
+ | title = Hong–Ou–Mandel interference
+ | arxiv = 1711.00080
+ | year = 2017
+}}</ref><ref name="58E" />
-<ref name="08G">{{cite journal
+For non-monochromatic light, integrate over joint spectral amplitude φ(ω<sub>1</sub>, ω<sub>2</sub>).<ref name="59E">{{cite journal
-| last1 = Li
+ | last1 = Toyoda
-| first1 = W.
+ | first1 = K.
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+ | last2 = Hiji
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+ | first2 = R.
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+ | last3 = Noguchi
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+ | first3 = A.
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+ | title = Quantum theory of two-photon wavepacket interference in a beamsplitter
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+ | journal = Nature
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+ | volume = 527
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+ | pages = 74–77
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+ | year = 2015
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+}}</ref><ref name="34E" /><ref name="60E">{{cite web
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+| title = Hanbury Brown and Twiss, Hong Ou and Mandel effects and other landmarks in quantum optics: from photons to atoms
+| publisher = Oxford University Press
+| date = 2019
+| doi = 10.1093/oso/9780198837190.003.0012
+| url = https://academic.oup.com/book/32944/chapter-abstract/276804035
 }}</ref>
-<ref name="09G">{{cite journal
+=== Angular momentum representation ===
-| last1 = Peev
+BS transformation as SU(2) rotation: L̂<sub>i</sub> operators, with L̂<sup>2</sup> = l̂(l̂ + 1), where l̂ = (n̂<sub>1</sub> + n̂<sub>2</sub>)/2.<ref name="61E">{{cite journal
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+ | journal = Phys. Rev. A
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+ | pages = 1627
-}}</ref>
+ | year = 1997
+ | doi = 10.1103/PhysRevA.56.1627
+}}</ref><ref name="34E" />
+Unitary: Û = e<sup>-i Φ L̂<sub>3</sub></sup> e<sup>-i Θ L̂<sub>2</sub></sup> e<sup>-i Ψ L̂<sub>3</sub></sup>, with Θ = 2θ, θ = arcsin√R.<ref name="62E">{{cite journal
+ | last1 = Erdmann
+ | first1 = R.
+ | last2 = Branning
+ | first2 = D.
+ | last3 = Grice
+ | first3 = W.
+ | last4 = Walmsley
+ | first4 = I. A.
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+ | journal = Phys. Rev. A
+ | volume = 62
+ | pages = 053810
+ | year = 2000
+ | doi = 10.1103/PhysRevA.62.053810
+}}</ref><ref name="63E" /><ref name="64E" />
+== Quantum entanglement ==
+BS generates entanglement if at least one input is non-classical (e.g., squeezed or Fock state).
+In frequency-dependent BS, entanglement varies with spectral overlap; broadband photons may reduce concurrence.<ref name="20E" /><ref name="21E" /><ref name="43E" /><ref name="44E" />
-<ref name="10G">{{cite journal
+===='''Quantum entanglement of photons and their statistics'''====
-| last1 = Stucki
+As described by D.N. Makarov in 2022 <ref name="23E" />{{efn-ua|The references in this article have been adjusted. Some where damaged/misspeld in the original article.}}. in the Theory for the '''quantum optics beam splitter'''. Recent advancements in hybrid integrated circuits <ref name="106G">{{cite journal
+| last1 = Sahin
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+| title = Waveguide photon‑number‑resolving detectors for quantum photonic integrated circuits
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+| journal = Appl. Phys. Lett.
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+| volume = 103
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+| year = 2013
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+| volume = 12
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+| year = 2018
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+}}</ref> have transitioned these theories from bulk optics to scalable chip-based platforms. Quantum states of light are fundamental resources for the implementation of quantum information protocols since the pioneering tests on nonlocality and quantum teleportation.<ref name="01H" /><ref name="02H" /> The optical device that divides an incident beam of light into two or more output beams, typically a transmitted beam and a reflected beam. In quantum optics, the quantum beam splitter is a fundamental component far beyond classical beam division: it generates quantum superposition and quantum entanglement from non-entangled inputs, reveals non-classical photon statistics, and enables key phenomena like the Hong–Ou–Mandel effect (HOM effect).<ref name="01E" /><ref name="02E">{{cite web
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+}}</ref><ref name="03E" /><ref name="04E" /><ref name="05E">{{cite web
+| last = Agarwal
+| first = G. S.
+| title = Quantum Optics
+| publisher = Cambridge University Press
+| location = Cambridge
+| date = 2013
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+| url = https://www.cambridge.org/core/books/quantum-optics/5E4E4A4E4A4E4A4E4A4E4A4E4A4E4A4E
+}}</ref><ref name="06E" /> While conventional beam splitters are often bulk components, recent progress in integrated photonics <ref name="01G" /> has allowed for on-chip implementations. For example, independent dibenzoterrylene <math>\mathrm{C}_{30}\mathrm{H}_{18}</math> (DBT) molecules integrated with silicon nitride (<math>\mathrm{Si}_{3}\mathrm{N}_{4}</math>) photonic elements, a single-crystalline anthracene nanosheet doped with dibenzoterrylene (DBT) molecules<ref name="34K">{{cite journal
+| last1 = Nicolet
+| first1 = A. A.
+| last2 = et al.
+| title = Single dibenzoterrylene molecules in an anthracene crystal: main insertion sites
+| journal = ChemPhysChem
+| volume = 8
+| pages = 1929–1936
+| year = 2007
+| doi = 10.1002/cphc.200700340
+}}</ref>, and gold electrodes for Stark tuning (Methods).<ref name="25K">Zhai, L. et al. Quantum interference of identical photons from remote GaAs quantum dots. *Nat. Nanotechnol.* **17**, 829–833 (2022). https://doi.org/10.1038/s41565-022-01131-2</ref><ref name="27K">Lettow, R. et al. Quantum interference of tunably indistinguishable photons from remote organic molecules. *Phys. Rev. Lett.* **104**, 123605 (2010). https://doi.org/10.1103/PhysRevLett.104.123605</ref><ref name="29K">{{cite journal
+| last1 = Papon
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+| title = Independent operation of two waveguide-integrated quantum emitters
+| journal = Phys. Rev. Appl.
 | volume = 19
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+| pages = L061003
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+| year = 2023
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+| doi = 10.1103/PhysRevApplied.19.L061003
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+}}</ref><ref name="39K">{{cite journal
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+| first1 = R.
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+| title = Measuring the photon coalescence time window in the continuous-wave regime for resonantly driven semiconductor quantum dots
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+| volume = 114
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+| year = 2015
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+| doi = 10.1103/PhysRevLett.114.067401
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+}}</ref> Waveguides have achieved stable, lifetime-limited transitions suitable for scalable quantum networks. <ref name="01K" />  Stark tuning experiments show how 100 waveguide-coupled molecules can be tuned to the same frequency and achieve on-chip Hong–Ou–Mandel interference. The quantum theory of the beam splitter is remarkably simple, parameterized by the reflection coefficient ''R'' (or transmission ''T'', with ''R'' + ''T'' = 1) and a relative phase shift ''φ''. This minimal description underpins linear-optical quantum protocols, from interferometry to scalable computing.<ref name="07E" /><ref name="08E">{{cite journal
-}}</ref>
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-}}</ref>
+ | pages = 33
+ | year = 2011
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+ | doi = 10.1103/RevModPhys.83.33
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+}}</ref> Beam splitters are systematized into "conventional" (frequency-independent ''R'' and ''φ'') and frequency-dependent types (e.g., waveguide beam splitters), with the latter affecting entanglement and interference for non-monochromatic light.<ref name="09E">{{cite journal
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+ | last1 = Nicholas
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+ | first1 = C. H.
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+ | title = Quantum transport simulations in a programmable nanophotonic processor
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+ | journal = Nature Photonics
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+ | volume = 11
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+ | pages = 447–452
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+ | year = 2017
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+ | doi = 10.1038/nphoton.2017.95
+}}</ref><ref name="10E">{{cite journal
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+ | last1 = Tambasco
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+ | title = Quantum interference of topological states of light
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+<ref name="14E">{{cite journal
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+}}</ref><ref name="15E" />
+<ref name="16E">{{cite journal
+ | last1 = Tan
+ | first1 = S.-H.
+ | last2 = Rohde
+ | first2 = P. P.
+ | title = The resurgence of the linear optics quantum interferometer– recent advances and applications
+ | journal = Reviews in Physics
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+ | pages = 100030
+ | year = 2019
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+}}</ref><ref name="17E" />
+<ref name="18E" /><ref name="19E" />. This article aims at providing
+an exhaustive framework of the advances of integrated quantum photonic platforms,
+for what concerns the integration of sources, manipulation, and detectors, as well as the contributions in quantum computing, cryptography and simulations.
-<ref name="17G">{{cite journal
+== Photon statistics ==
-| last1 = Diamanti
+Output distributions depend on input states and BS parameters. Coherent inputs yield coherent outputs; Fock inputs show sub/super-Poissonian statistics.<ref name="01E" /><ref name="03E" /><ref name="05E" />
-| first1 = E.
+In frequency-dependent BS, statistics vary by mode, leading to selective bunching/antibunching.<ref name="22E" /><ref name="21E" />
-| title = Practical challenges in quantum key distribution
-| journal = npj Quantum Inf.
-| volume = 2
-| article-no = 16025
-| year = 2016
-| doi = 10.1038/npjqi.2016.25
-}}</ref>
-<ref name="18G">{{cite journal
+== Hong–Ou–Mandel effect ==
-| last1 = Wang
+[[File:Hong-Ou-Mandel mathematics.png|thumb|Mathematical equivalence between the Hong-Ou-Mandel and a classical artificial neuron.
-| first1 = L. J.
+The left branch of the interferometer corresponds to the input layer, while the probe parameters are related to the trainable neuron weights. The rate of coincidences encodes the square absolute value of their scalar product, further post-processed by adding a bias and a sigmoid activation function]]
-| title = Experimental authentication of quantum key distribution with post-quantum cryptography
+Recent advancements have leveraged the HOM effect for quantum kernel evaluation, enabling distance computations in feature spaces for machine learning tasks.<ref name="33L">Bowie, C., Shrapnel, S. & Kewming, M. J. Quantum kernel evaluation via Hong–Ou–Mandel interference. ''Quantum Sci. Technol.'' '''9''', 015001 (2023). [https://doi.org/10.1088/2058-9565/acfba9 doi:10.1088/2058-9565/acfba9]</ref> This equivalence to the SWAP test further extends HOM to high-dimensional interference in spatial modes.<ref name="30L">Garcia-Escartin, J. C. & Chamorro-Posada, P. SWAP test and Hong-Ou-Mandel effect are equivalent. ''Phys. Rev. A'' '''87''', 052330 (2013). [https://doi.org/10.1103/PhysRevA.87.052330 doi:10.1103/PhysRevA.87.052330]</ref><ref name="32L">Hiekkamäki, M. & Fickler, R. High-dimensional two-photon interference effects in spatial modes. ''Phys. Rev. Lett.'' '''126''', 123601 (2021). [https://doi.org/10.1103/PhysRevLett.126.123601 doi:10.1103/PhysRevLett.126.123601]</ref> Classical analogs achieving 97% visibility dips confirm the role of complementarity in such systems.<ref name="31L">Sadana, S. et al. Near-100% two-photon-like coincidence-visibility dip with classical light and the role of complementarity. ''Phys. Rev. A'' '''100''', 013839 (2019). [https://doi.org/10.1103/PhysRevA.100.013839 doi:10.1103/PhysRevA.100.013839]</ref> Identical photons on 50:50 BS bunch<ref name="29L">Hong, C. K., Ou, Z. Y. & Mandel, L. Measurement of subpicosecond time intervals between two photons by interference. ''Phys. Rev. Lett.'' '''59''', 2044–2046 (1987). [https://doi.org/10.1103/PhysRevLett.59.2044 doi:10.1103/PhysRevLett.59.2044]</ref>, suppressing coincidence counts (HOM dip).<ref name="56E" /><ref name="57E" /><ref name="58E" /><ref name="59E" /><ref name="60E" /><br>For frequency-dependent BS, dip visibility depends on spectral overlap; fluctuations affect detection.<ref name="17E" /><ref name="22E" /><ref name="23E" /><ref name="21E" /><br>Generalizations: bosons/fermions, wavepackets.<ref name="61E" /><ref name="62E" /><ref name="63E" /><ref name="64E" /><br>On a molecular quantum photonic chip, on-chip HOM interference was realized with a visibility of over 0.97. <ref name="02K" />The high visibility confirms the excellent indistinguishability of photons originating from independent sources on the same chip.Recent experiments have successfully implemented these waveguide principles on-chip. Using independent dibenzoterrylene (DBT) molecules integrated into <math>Si_{3}N_{4}</math> waveguides, researchers observed on-chip quantum interference with a visibility of <math>0.97 \pm 0.02</math>. <ref name="01K" /> This provides experimental proof that integrated molecular emitters can achieve the high level of indistinguishability required for scalable quantum circuits.In 2025 a novel quantum optical pattern recognition method leveraging the Hong-Ou-Mandel (HOM) effect for binary classification tasks was introduced by Simone Roncallo et all
-| journal = npj Quantum Inf.
+<ref name="39L">Morgillo, A. R. & Roncallo, S. Quantum optical neuron. GitHub (2025). [https://github.com/simoneroncallo/quantum-optical-neuron https://github.com/simoneroncallo/quantum-optical-neuron]</ref>.This encodes input objects and trainable parameters into single-photon states, measures two-photon coincidence rates at the output of a HOM interferometer, demonstrating a superexponential resource advantage (constant <math>\mathcal{O}(1)</math> complexity in photons and operations versus at least linear scaling in classical artificial neurons).
-| volume = 7
+==== Quantum optical setup====
-| article-no = 67
+The quantum optical setup classifies objects without reconstructing their images. The approach relies on the Hong-Ou-Mandel effect, for which the probability that two photons exit a beam splitter in different modes, depends on their distinguishability<ref name="29L"/><ref name="30L"/><ref name="31L"/><ref name="32L"/>. In the
-| year = 2021
+implementation, an input object is targeted by a single-photon source, and eventually followed by an arbitrary lens system. The single-photon state interferes with another one, which encodes a set of trainable parameters, e.g. through a spatial light modulator. After the Hong-Ou-Mandel interferometer, the photons are collected by two bucket detectors without spatial sensitivity, one for each output mode. Classification occurs by measuring the rate of two-photon coincidences at the output.<br>
-| doi = 10.1038/s41534-021-00409-2
-}}</ref>
+The Hong-Ou-Mandel effect has been successfully applied to quantum kernel evaluation<ref name="33L"/>, which can compute distances between pairs of data points in the feature space. In this case, each point is sent to one branch of the interferometer, encoded in the temporal modes of a single-photon state. In our method, the interferometer has only one independent branch, which takes the spatial modes of a single-photon state reflected off the target object. The other branch remains fixed after training, and contains the layer of parameters.<ref name="25L">Sui, X., Wu, Q., Liu, J., Chen, Q. & Gu, G. A review of optical neural networks. ''IEEE Access'' '''8''', 70773–70783 (2020). [https://doi.org/10.1109/ACCESS.2020.2987333 doi:10.1109/ACCESS.2020.2987333]</ref><ref name="38L">Collobert, R. & Bengio, S. Links between perceptrons, MLPs and SVMs. In ''Proc. Twenty-First International Conference on Machine Learning, ICML ’04'', 23 (2004).</ref> After the measurement, the response function of our apparatus mathematically resembles that of a classical neuron. For this reason, we refer to our setup as quantum optical neuron. By analytically comparing the resource cost of the classical and quantum neurons, this  method requires constant <math>\mathcal{O}(1)</math>
+computational operations and injected photons, whereas the classical methods are at least linear in the image resolution: a '''superexponential advantage'''. <br>
+When combining multiple neurons, the large number of parameters involved motivates a consistent effort in reducing the cost of deep learning algorithms, e.g. by leveraging classical implementations that bypass hardware in an all-optical way<ref name="07L"/><ref name="08L"/><ref name="09L"/><ref name="10L">Colburn, S., Chu, Y., Shilzerman, E. & Majumdar, A. Optical frontend for a convolutional neural network. ''Appl. Opt.'' '''58''', 3179–3186 (2019). [https://doi.org/10.1364/AO.58.003179 doi:10.1364/AO.58.003179]</ref><ref name="11L">Li, S. et al. All-optical image identification with programmable matrix transformation. ''Opt. Express'' '''29''', 26474–26485 (2021). [https://doi.org/10.1364/OE.433969 doi:10.1364/OE.433969]</ref><ref name="12L">Luo, Y. et al. Computational imaging without a computer: seeing through random diffusers at the speed of light. ''eLight'' '''2''', 4 (2022). [https://doi.org/10.1186/s43593-022-00012-4 doi:10.1186/s43593-022-00012-4]</ref><ref name="13L"/>. Quantum mechanical effects, like superposition and entanglement, can provide a significant speedup in such tasks<ref name="14L">Lloyd, S., Mohseni, M. & Rebentrost, P. Quantum algorithms for supervised and unsupervised machine learning. arxiv:1307.0411 (2013).</ref><ref name="15L"/>, e.g. by building quantum analogues of the perceptron<ref name="16L"/><ref name="17L"/><ref name="18L">Mangini, S., Tacchino, F., Gerace, D., Macchiavello, C. & Bajoni, D. Quantum computing model of an artificial neuron with continuously valued input data. ''Mach. Learn. Sci. Technol.'' '''1''', 045008 (2020). [https://doi.org/10.1088/2632-2153/abaf98 doi:10.1088/2632-2153/abaf98]</ref>, by employing variational methods<ref name="19L"/><ref name="20L"/> or quantum-inspired approaches<ref name="21L">Senokosov, A., Sedykh, A., Sagingalieva, A., Kyriacou, B. & Melnikov, A. Quantum machine learning for image classification. ''Mach. Learn. Sci. Technol.'' '''5''', 015040 (2024). [https://doi.org/10.1088/2632-2153/ad2aef doi:10.1088/2632-2153/ad2aef]</ref>. Quantum optical neural networks harness the best of both worlds, i.e. deep learning capabilities from quantum optics<ref name="22L"/><ref name="23L"/><ref name="24L">Bartkiewicz, K. et al. Experimental kernel-based quantum machine learning in finite feature space. ''Sci. Rep.'' '''10''', 12356 (2020). [https://doi.org/10.1038/s41598-020-68911-5 doi:10.1038/s41598-020-68911-5]</ref><ref name="25L"/><ref name="26L"/><ref name="27L"/><ref name="28L">Wood, C., Shrapnel, S. & Milburn, G. J. A Kerr kernel quantum learning machine. arxiv:2404.01787 (2024).</ref>.
+======Mathematical description======
+Two optical input modes ''a'' and ''b'' that carry annihilation and creation operators <math>\hat{a}</math>, <math>\hat{a}^\dagger</math>, and <math>\hat{b}</math>, <math>\hat{b}^\dagger</math>. Identical photons in different modes can be described by the Fock states<ref name="03E" />, so, for example <math>|0\rangle_a</math> corresponds to mode ''a'' empty (the vacuum state), and inserting one photon into ''a'' corresponds to <math>|1\rangle_a=\hat{a}^\dagger|0\rangle_a</math>, etc. A photon in each input mode is therefore
-<ref name="20G">{{cite journal
+: <math>|1, 1\rangle_{ab} = \hat{a}^\dagger \hat{b}^\dagger |0, 0\rangle_{ab}.</math>
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+When the two modes ''a'' and ''b'' are mixed in a 1:1 beam splitter, they produce output modes ''c'' and ''d''. Inserting a photon in ''a'' produces a superposition state of the outputs: if the beam splitter is 50:50 then the probabilities of each output are equal, i.e. <math>\hat{a}^\dagger |0\rangle_a \to \frac{1}{\sqrt{2}}\left( \hat{c}^\dagger + \hat{d}^\dagger\right)|00\rangle_{cd}</math>, and similarly for inserting a photon in ''b''. Therefore
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+: <math>\hat{a}^\dagger \to \frac{\hat{c}^\dagger + \hat{d}^\dagger}{\sqrt{2}} \quad\text{and}\quad \hat{b}^\dagger \to \frac{\hat{c}^\dagger - \hat{d}^\dagger}{\sqrt{2}}.</math>
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-<ref name="23G">{{cite journal
+The relative minus sign appears because the classical lossless beam splitter produces a unitary transformation<ref name="19E" />. This can be seen most clearly when wr the two-mode beam splitter transformation in matrix form:
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+: <math>\begin{pmatrix}
-| last1 = Long
+ \hat{a} \\
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+ \hat{b}
-| last2 = Pan
+\end{pmatrix} \to \frac{1}{\sqrt{2}} \begin{pmatrix}
-| first2 = D.
+& 1 \\
-| title = An evolutionary pathway for the quantum internet relying on secure classical repeaters
+& -1
-| journal = IEEE Netw.
+\end{pmatrix} \begin{pmatrix}
-| volume = 36
+ \hat{c} \\
-| pages = 82–88
+ \hat{d}
-| year = 2022
+\end{pmatrix}.</math><ref name="18E" />
-| doi = 10.1109/MNET.108.2100375
-}}</ref>
+Similar transformations hold for the creation operators. Unitarity of the transformation implies unitarity of the matrix. Physically, this beam splitter transformation means that reflection from one surface induces a relative phase shift of π, corresponding to a factor of −1, with respect to reflection from the other side of the beam splitter (see the [[#Physical description|Physical description]] above)<ref name="27E" />.
-<ref name="34G">{{cite journal
+When two photons enter the beam splitter, one on each side, the state of the two modes becomes
-| last1 = Orieux
-| first1 = A.
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-| first2 = E.
-| title = Recent advances on integrated quantum communications
-| journal = J. Opt.
-| volume = 18
-| article-no = 083002
-| year = 2016
-}}</ref>
-<ref name="35G">{{cite journal
+: <math>|1, 1\rangle_{ab} = \hat{a}^\dagger \hat{b}^\dagger |0, 0\rangle_{ab} \to \frac{1}{2} \left( \hat{c}^\dagger + \hat{d}^\dagger \right) \left( \hat{c}^\dagger - \hat{d}^\dagger \right) |0, 0\rangle_{cd} </math>
-| last1 = Wang
+: <math> = \frac{1}{2} \left( \hat{c}^{\dagger 2} - \hat{d}^{\dagger 2} \right) |0, 0\rangle_{cd}
-| first1 = J. W.
+ = \frac{|2, 0\rangle_{cd} - |0, 2\rangle_{cd}}{\sqrt{2}},
-| title = Integrated photonic quantum technologies
+</math>
-| journal = Nat. Photonics
-| volume = 14
-| pages = 273–284
-| year = 2020
-| doi = 10.1038/s41566-020-0619-8
-}}</ref>
-<ref name="36G">{{cite journal
+where used <math>\hat{c}^{\dagger 2}|0, 0\rangle_{cd}=\hat{c}^\dagger|1, 0\rangle_{cd}=\sqrt{2}|2, 0\rangle_{cd}</math> etc.<ref name="04E" />
-| last1 = Matthews
+Since the commutator of the two creation operators <math>\hat{c}^\dagger</math> and <math>\hat{d}^\dagger</math> is zero because they operate on different spaces, the product term vanishes. The surviving terms in the superposition are only the <math>\hat{c}^{\dagger 2}</math> and <math>\hat{d}^{\dagger 2}</math> terms. Therefore, when two identical photons enter a 1:1 beam splitter, they will always exit the beam splitter in the same (but random) output mode.
-| first1 = J. C. F.
-| title = Manipulation of multiphoton entanglement in waveguide quantum circuits
-| journal = Nat. Photonics
-| volume = 3
-| pages = 346–350
-| year = 2009
-| doi = 10.1038/nphoton.2009.89
-}}</ref>
-<ref name="37G">{{cite journal
+The result is non-classical: a classical light wave entering a classical beam splitter with the same transfer matrix would always exit in arm ''c'' due to destructive interference in arm ''d'', whereas the quantum result is random. Changing the beam splitter phases can change the classical result to arm ''d'' or a mixture of both, but the quantum result is independent of these phases.
-| last1 = Siew
-| first1 = S. Y.
-| title = Review of silicon photonics technology and platform development
-| journal = J. Lightwave Technol.
-| volume = 39
-| pages = 4374–4389
-| year = 2021
-| doi = 10.1109/JLT.2021.3075325
-}}</ref>
-<ref name="38G">{{cite journal
+For a more general treatment of the beam splitter with arbitrary reflection/transmission coefficients, and arbitrary numbers of input photons, see the general quantum mechanical treatment of a beamsplitter for the resulting output Fock state.<ref name="01E" /><ref name="02E" /><ref name="05E" />
-| last1 = Smit
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-}}</ref>
-<ref name="39G">{{cite journal
+==Single-Photon Detection in Beam Splitter Experiments==
-| last1 = Joshi
+In experiments in quantum optics with beam splitters, an individual-photon-catching detector network is obviously decisive to glimpse those striking non-classical effects: antibunching, Hong-Ou-Mandel interference, and entanglement that the beam splitter itself can generate.
-| first1 = C.
+[[File:Beam Splitter with Ultra Fast SPDs.png|center|Schematic (left) and scanning electron microscope image (right, scale bar 5 μm) of waveguide-integrated ultra-fast superconducting nanowire single-photon detectors (SNSPDs) coupled to a beam splitter on a photonic chip.]]
-| title = Frequency multiplexing for quasi‑deterministic heralded single‑photon sources
+Single-photon detectors (SPDs), such as superconducting nanowire single-photon detectors (SNSPDs) or single-photon avalanche diodes (SPADs) operated in Geiger mode, provide the necessary time-resolved, high-efficiency detection at the single-photon level.<ref name="01H" /><ref name="149H">{{cite journal
-| journal = Nat. Commun.
+| last1 = Hadfield
-| volume = 9
+| first1 = R.H.
-| article-no = 847
+| title = Single-photon detectors for optical quantum information applications
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-| doi = 10.1038/s41467-018-03286-5
-}}</ref>
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-}}</ref>
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-| title = High‑speed and high‑efficiency travelling wave single‑photon detectors embedded in nanophotonic circuits
-| journal = Nat. Commun.
 | volume = 3
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+| issue = 12
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+| pages = 696–705
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+| year = 2009
-}}</ref>
+| doi = 10.1038/nphoton.2009.230
+}}</ref><ref name="150H">{{cite journal
+| last1 = Gerrits
+| first1 = T.
+| title = Onchip, photon-number-resolving, telecommunication-band detectors for scalable photonic information processing
+| journal = Phys. Rev. A
+| volume = 84
+| article-no = 060301
+| year = 2011
+| doi = 10.1103/PhysRevA.84.060301
+}}</ref> In foundational experiments, SPDs are placed at the two output ports of a beam splitter. For a single photon incident on 50:50 beam splitter, the absence of simultaneous detections (zero coincidence counts above vacuum noise) demonstrates the particle-like indivisibility of the photon, while interference effects reveal its wave nature (e.g., in Mach-Zehnder configurations built with beam splitters).<ref name="04E" /><ref name="37E" />
-<ref name="42G">{{cite journal
+In the Hong–Ou–Mandel effect, two indistinguishable photons entering separate input ports bunch at the outputs, leading to a near-complete suppression of coincidence detections between SPDs at the two ports, a hallmark of quantum interference.<ref name="04E" /><ref name="52E" /><ref name="53E" /> In tests of photon statistics or entanglement generation, post-selected coincidence measurements between SPDs enable quantification of antibunching (<math>g^{(2)}(0) < 1</math>) or violation of Bell inequalities.<ref name="20E" /><ref name="37E" />
-| last1 = Sibson
-| first1 = P.
+Fully integrating SPDs onto photonic chips are still a big challenge. There are some promising developments about waveguide-coupled superconducting detectors. These latest developments open up the possibility that future quantum systems will have detection totally on a chip.<ref name="15E" /><ref name="102G">{{cite journal
-| title = Chip‑based quantum key distribution
+| last1 = Sprengers
-| journal = Nat. Commun.
+| first1 = J. P.
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+| first2 = A.
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+| title = Waveguide superconducting single‑photon detectors for integrated quantum photonic circuits
+| journal = Appl. Phys. Lett.
+| volume = 99
+| article-no = 181110
+| year = 2011
+| doi = 10.1063/1.3657518
+}}</ref><ref name="17H">{{cite journal
+| last1 = Ferrari
+| first1 = S.
+| title = Waveguide-integrated superconducting nanowire single-photon detectors
+| journal = Nanophotonics
+| volume = 7
+| issue = 11
+| pages = 1725–1758
+| year = 2018
+| doi = 10.1515/nanoph-2018-0059
 }}</ref>
+Such integrations facilitate advanced HOM-based classifiers, where SLMs encode trainable parameters for pattern recognition, with software tools enabling simulation and optimization.<ref name="35L">Neff, J., Athale, R. & Lee, S. Two-dimensional spatial light modulators: a tutorial. ''Proc. IEEE'' '''78''', 826–855 (1990).</ref><ref name="36L">Zhang, Z., You, Z. & Chu, D. Fundamentals of phase-only liquid crystal on silicon (LCOS) devices. ''Light Sci. Appl.'' '''3''', e213 (2014).</ref><ref name="37L">TensorFlow Developers. TensorFlow. Zenodo (2023). [https://doi.org/10.5281/zenodo.10126399 doi:10.5281/zenodo.10126399]</ref><ref name="39L"/> Training challenges, including initialization and convergence, mirror those in deep neural networks.<ref name="34L">Glorot, X. & Bengio, Y. Understanding the difficulty of training deep feedforward neural networks. In ''Proc. Thirteenth International Conference on Artificial Intelligence and Statistics'', vol. 9, 249–256 (PMLR, 2010).</ref><ref name="38L"/>
-<ref name="43G">{{cite journal
+====Key technologies for quantum photonic chips====
-| last1 = Zhang
+[[File:Glowing waveguides on quantum photonic chip (AI generated).jpg|thumb|Artistic illustration of glowing optical waveguides in a silicon nitride quantum photonic integrated circuit, highlighting on-chip light propagation for quantum interference experiments.]]
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+Photonic integration provides a clear route toward compact quantum communication systems with growing complexity and improved functionality. Integrated quantum communication can be broadly categorized into three main aspects: photonic material platforms enabling large-scale integration<ref name="36G">{{cite journal
-| title = An integrated silicon photonic chip platform for continuous‑variable quantum key distribution
+| last1 = Matthews
+| first1 = J. C. F.
+| title = Manipulation of multiphoton entanglement in waveguide quantum circuits
 | journal = Nat. Photonics
-| volume = 13
+| volume = 3
-| pages = 839–842
+| pages = 346–350
+| year = 2009
+| doi = 10.1038/nphoton.2009.89
+}}</ref><ref name="37G">{{cite journal
+| last1 = Siew
+| first1 = S. Y.
+| title = Review of silicon photonics technology and platform development
+| journal = J. Lightwave Technol.
+| volume = 39
+| pages = 4374–4389
+| year = 2021
+| doi = 10.1109/JLT.2021.3075325
+}}</ref><ref name="38G">{{cite journal
+| last1 = Smit
+| first1 = M.
+| last2 = Williams
+| first2 = K.
+| last3 = van der Tol
+| first3 = J.
+| title = Past, present, and future of InP‑based photonic integration
+| journal = APL Photonics
+| volume = 4
+| article-no = 050901
 | year = 2019
-| doi = 10.1038/s41566-019-0549-3
+| doi = 10.1063/1.5097179
-}}</ref>
+}}</ref>, quantum photonic components such as quantum light sources<ref name="39G">{{cite journal
+| last1 = Joshi
-<ref name="44G">{{cite journal
+| first1 = C.
-| last1 = Llewellyn
+| title = Frequency multiplexing for quasi‑deterministic heralded single‑photon sources
-| first1 = D.
+| journal = Nat. Commun.
+| volume = 9
+| article-no = 847
+| year = 2018
+| doi = 10.1038/s41467-018-03286-5
+}}</ref>, high-speed modulators<ref name="40G">{{cite journal
+| last1 = He
+| first1 = M. B.
+| title = High‑performance hybrid silicon and lithium niobate Mach–Zehnder modulators for 100 Gbit s−1 and beyond
+| journal = Nat. Photonics
+| volume = 13
+| pages = 359–364
+| year = 2019
+| doi = 10.1038/s41566-019-0441-6
+}}</ref> and highly efficient photodetectors<ref name="41G">{{cite journal
+| last1 = Pernice
+| first1 = W. H. P.
+| title = High‑speed and high‑efficiency travelling wave single‑photon detectors embedded in nanophotonic circuits
+| journal = Nat. Commun.
+| volume = 3
+| article-no = 1325
+| year = 2012
+| doi = 10.1038/ncomms2328
+}}</ref>, and representative applications including QKD<ref name="42G">{{cite journal
+| last1 = Sibson
+| first1 = P.
+| title = Chip‑based quantum key distribution
+| journal = Nat. Commun.
+| volume = 8
+| article-no = 13984
+| year = 2017
+| doi = 10.1038/ncomms13984
+}}</ref><ref name="43G">{{cite journal
+| last1 = Zhang
+| first1 = G.
+| title = An integrated silicon photonic chip platform for continuous‑variable quantum key distribution
+| journal = Nat. Photonics
+| volume = 13
+| pages = 839–842
+| year = 2019
+| doi = 10.1038/s41566-019-0549-3
+}}</ref> and quantum teleportation<ref name="44G">{{cite journal
+| last1 = Llewellyn
+| first1 = D.
 | title = Chip‑to‑chip quantum teleportation and multi‑photon entanglement in silicon
 | journal = Nat. Phys.
@@ Line 1,486: / Line 1,478: @@
 | year = 2020
 | doi = 10.1038/s41567-019-0733-2
-}}</ref>
+}}</ref>. Because the materials, fabrication processes, and structural designs used in photonic integration differ substantially from those of discrete optical systems, essential chip-level photonic components must be redesigned and optimized for specific quantum information tasks.
-<ref name="45G">{{cite journal
+This section summarizes key technical developments covering quantum light sources, encoding and decoding elements, quantum detectors, and packaging techniques for integrated photonic systems. These advances constitute critical points in the evolution of integrated quantum communication. Early work in this area can be traced to the integration of photon sources based on periodically poled lithium niobate waveguides<ref name="45G">{{cite journal
 | last1 = Tanzilli
 | first1 = S.
@@ Line 1,497: / Line 1,489: @@
 | year = 2002
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+}}</ref> and interferometric circuits realized using silica-on-silicon planar lightwave circuits (PLCs)<ref name="46G">{{cite journal
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@@ Line 1,508: / Line 1,498: @@
 | year = 2001
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 | year = 2006
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+}}</ref>. The high efficiency and thermally stable operation of these integrated devices highlighted their intrinsic advantages over discrete and bulky optical components.
-<ref name="50G">{{cite journal
+Subsequently, a wide range of material platforms was explored, leading to substantial progress in the on-chip generation, manipulation, and detection of quantum states of light for quantum communication and other quantum information applications. Prominent monolithic platforms for chip-based quantum communication include silica waveguides (silica-on-silicon and laser-written silica waveguides), silicon-on-insulator (SOI), silicon nitride (<math>\mathrm{Si}_{3}\mathrm{N}_{4}</math>), lithium niobate (LN), gallium arsenide (GaAs)<ref name="98H">{{cite journal
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+| first1 = J.
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+| title = Gallium arsenide (GaAs) quantum photonic waveguide circuits
-| journal = Nat. Photonics
+| journal = Optics Communications
-| volume = 14
+| volume = 327
-| pages = 285–298
+| pages = 49–55
-| year = 2020
+| year = 2014
-| doi = 10.1038/s41566-019-0568-0
+| doi = 10.1016/j.optcom.2014.02.040
-}}</ref>
+}}</ref><ref name="108H">{{cite journal
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+| volume = 3
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+| issue = 2
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+| pages = 143–146
-| journal = Opt. Lett.
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+| doi = 10.1364/OPTICA.3.000143
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+}}</ref><ref name="23K">Liu, J. et al. Single self-assembled InAs/GaAs quantum dots in photonic nanostructures: the role of nanofabrication. *Phys. Rev. Appl.* **9**, 064019 (2018). https://doi.org/10.1103/PhysRevApplied.9.064019</ref>, indium phosphide (InP), and silicon oxynitride (<math>\mathrm{SiO}_{x}\mathrm{N}_{y}</math>)<ref name="34G">{{cite journal
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+| journal = J. Opt.
+| volume = 18
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+}}</ref><ref name="35G">{{cite journal
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+| title = Integrated photonic quantum technologies
+| journal = Nat. Photonics
+| volume = 14
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+| year = 2020
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+}}</ref><ref name="50G">{{cite journal
+| last1 = Elshaari
+| first1 = A. W.
+| title = Hybrid integrated quantum photonic circuits
+| journal = Nat. Photonics
+| volume = 14
+| pages = 285–298
+| year = 2020
+| doi = 10.1038/s41566-019-0568-0
+}}</ref>. The state of the art of these platforms reveals distinct advantages and limitations in terms of waveguiding performance, availability of active components, and compatibility with related technologies.
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+SOI offers high refractive-index contrast for dense integration, strong optical nonlinearity for nonclassical state generation, and excellent compatibility with advanced CMOS (complementary metal–oxide–semiconductor) fabrication processes widely used in the semiconductor industry. However, the absence of native lasing capability complicates the full monolithic integration of all components required for a complete quantum communication system. Semiconductor platforms such as GaAs<ref name="91G">{{cite journal
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+| last1 = Wang
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+| year = 2014
-| journal = Adv. Opt. Mater.
+| doi = 10.1016/j.optcom.2014.03.041
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+}}</ref><ref name="50H" /><ref name="98H" /><ref name="108H" /> and InP enable full system integration but generally involve higher costs and reduced scalability. These inherent trade-offs indicate that no single material platform can simultaneously satisfy all requirements for quantum communication. As a result, hybrid integration has emerged as a promising strategy to combine the strengths of different platforms<ref name="50G" />.
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+Notable achievements along these lines include heterogeneous quantum photonic devices such as integrated superconducting nanowire single-photon detectors (SNSPDs)<ref name="41G" /> and on-chip lasers for weak coherent pulse generation<ref name="51G">{{cite journal
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+| title = Hong–Ou–Mandel interference between independent III–V on‑silicon waveguide integrated lasers
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+| journal = Opt. Lett.
-}}</ref>
+| volume = 44
+| pages = 271–274
+| year = 2019
+| doi = 10.1364/OL.44.000271
+}}</ref>. Additional important technologies, including semiconductor quantum dots (QDs) coupled to photonic nanostructures<ref name="52G">{{cite journal
+| last1 = Lodahl
+| first1 = P.
+| last2 = Mahmoodian
+| first2 = S.
+| last3 = Stobbe
+| first3 = S.
+| title = Interfacing single photons and single quantum dots with photonic nanostructures
+| journal = Rev. Mod. Phys.
+| volume = 87
+| pages = 347–400
+| year = 2015
+| doi = 10.1103/RevModPhys.87.347
+}}</ref> and diamond-on-insulator platforms<ref name="53G">{{cite journal
+| last1 = Schröder
+| first1 = T.
+| title = Quantum nanophotonics in diamond [Invited]
+| journal = J. Opt. Soc. Am. B
+| volume = 33
+| pages = B65–B83
+| year = 2016
+| doi = 10.1364/JOSAB.33.000B65
+}}</ref><ref name="54G">{{cite journal
+| last1 = Lenzini
+| first1 = F.
+| title = Diamond as a platform for integrated quantum photonics
+| journal = Adv. Quantum Technol.
+| volume = 1
+| article-no = 1800061
+| year = 2018
+| doi = 10.1002/aqt2.1800061
+}}</ref>, have also emerged as competitive solutions for integrated quantum communication systems.
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+A timeline of advances in quantum photonic chips for quantum communication highlights several key items, including the first on-chip quantum interferometer for quantum cryptography<ref name="46G" />, quantum teleportation<ref name="05K" /><ref name="108H" /><ref name="31K">{{cite journal
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+}}</ref>. The re-programmable elements inside the MZI are the two phase shifts that are controlled generally through the thermo-optic effect. Heaters placed nearby the location of the waveguide allow for local changes in the refractive index of the material. Such reconfigurable units are sufficient to encode, process and measure any qubit in two optical paths. The complexity reached from integrated devices is nowadays very remarkable allowing for full integration of qubit- and qudit-based quantum gates and algorithms in SoS <ref name="53H" />  and Si-chips <ref name="15H" /><ref name="27H" /><ref name="93H">{{cite journal
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+{{Annotated image
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+| volume = 347
+| issue = 6227
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+| pages = 1229–1233
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+| year = 2015
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+| doi = 10.1126/science.1260364
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+}}</ref><ref name="80H">{{cite journal
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+| last1 = Caruso
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+| first1 = F.
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+| title = Fast escape of a quantum walker from an integrated photonic maze
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+| journal = Nat. Commun.
- | year = 2013
+| volume = 7
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+| article-no = 11682
-}}</ref>
+| year = 2016
+| doi = 10.1038/ncomms11682
-<ref name="212G">{{cite journal
+}}</ref><ref name="81H">{{cite journal
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+| last1 = Jiao
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+| first1 = Z.-Q.
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+| title = Two-Dimensional Quantum Walk of Correlated Photons
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+| journal = arxiv
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+| year = 2020
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+| doi = abs/2007.06554
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+}}</ref><ref name="82H">{{cite journal
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+| last1 = Tang
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+| first1 = H.
-}}</ref>
+| title = Generating haar-uniform randomness using stochastic quantum walks on a photonic chip
+| journal = Phys. Rev. Lett.
+| volume = 128
+| article-no = 050503
+| year = 2022
+| doi = 10.1103/PhysRevLett.128.050503
+}}</ref>. There are instances of re-programmable circuits in small<ref name="83H" /><ref name="84H" /><ref name="85H" /><ref name="86H">{{cite journal
+| last1 = Pont
+| first1 = M.
+| title = Quantifying n-photon indistinguishability with a cyclic integrated interferometer
+| journal = Phys. Rev. X
+| volume = 12
+| article-no = 031033
+| year = 2022
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+}}</ref> and large scale <ref name="87H">{{cite journal
+| last1 = Hoch
+| first1 = F.
+| title = Reconfigurable continuously-coupled 3d photonic circuit for boson sampling experiments
+| journal = npj Quantum Information
+| volume = 8
+| issue = 1
+| article-no = 55
+| year = 2022
+| doi = 10.1038/s41534-022-00568-6
+}}</ref> realization of integrated devices. The integration of single-photon sources exploiting nonlinear effects is still challenging due to the low birefringence (<math>\Delta n \approx 0</math>) and the null third-order nonlinear susceptibility (<math>\chi^{(3)} = 0</math>) of these waveguides. Notwithstanding, femtosecond laser writing (FLW) can be exploited to write waveguides in a nonlinear material to generate pairs of photons through parametric processes. These kinds of sources have been interfaced successfully with FLW chips in<ref name="88H">{{cite journal
+| last1 = Atzeni
+| first1 = S.
+| title = Integrated sources of entangled photons at the telecomwavelength in femtosecond-laserwritten circuits
+| journal = Optica
+| volume = 5
+| issue = 3
+| pages = 311–314
+| year = 2018
+| doi = 10.1364/OPTICA.5.000311
+}}</ref>. The FLW waveguides display also a good coupling with external fibers, enabling the interface of the optical circuit with remote users or solid-state sources<ref name="85H" /><ref name="86H" />.
+===Compact integration of optical components===
-<ref name="213G">{{cite journal
+A factor that drives the compact integration of
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+optical components, quantum computing on integrated
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+photonic chips has attracted much attention in recent
+years. There are two types of optical models<ref name="201G">{{cite journal
+  | last1 = Pelucchi
+  | first1 = E.
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-  | title = Integrated multimode interferometers with arbitrary designs for photonic boson sampling
+  | title = The potential and global outlook of integrated photonics for quantum technologies
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+  | journal = Nat. Rev. Phys.
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+  | volume = 4
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+  | year = 2022
-  | doi = 10.1038/nphoton.2013.112
+  | doi = 10.1038/s42254-021-00398-z
-}}</ref>
+}}</ref>: specific
+quantum computing models<ref name="202G">{{cite conference
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+  | last1 = Aaronson
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+  | first1 = S.
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+  | last2 = Arkhipov
-  | display-authors = etal
+ | first2 = A.
-  | title = Experimental scattershot boson sampling
+  | title = The computational complexity of linear optics
-  | journal = Sci. Adv.
+  | conference = Proc. 43rd Annual ACM Symposium on Theory of Computing
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+ | pages = 333–342
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+  | publisher = ACM
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+  | location = San Jose
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+  | year = 2011
-}}</ref>
+  | doi = 10.1145/1993636.1993682
+}}</ref><ref name="203G">{{cite journal
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+  | last1 = Rohde
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+  | first1 = P. P.
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+ | last2 = Ralph
-  | display-authors = etal
+  | first2 = T. C.
-  | title = High-efficiency multiphoton boson sampling
+  | title = Error tolerance of the boson-sampling model for linear optics quantum computing
-  | journal = Nat. Photonics
+  | journal = Phys. Rev. A
-  | volume = 11
+  | volume = 85
-  | pages = 361–365
+  | article-no = 022332
-  | year = 2017
+  | year = 2012
-  | doi = 10.1038/nphoton.2017.63
+  | doi = 10.1103/PhysRevA.85.022332
-}}</ref>
+}}</ref> (e.g., boson sampling),
+and universal quantum computing models<ref name="204G">{{cite journal
-<ref name="216G">{{cite journal
+  | last1 = Knill
-  | last1 = Arrazola
+  | first1 = E.
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+ | last2 = Laflamme
-  | display-authors = etal
+ | first2 = R.
-  | title = Quantum circuits with many photons on a programmable nanophotonic chip
+  | last3 = Milburn
+ | first3 = G. J.
+  | title = A scheme for efficient quantum computation with linear optics
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-  | volume = 591
+  | volume = 409
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+  | pages = 46–52
-  | year = 2021
+  | year = 2001
-  | doi = 10.1038/s41586-021-03235-0
+  | doi = 10.1038/35051009
-}}</ref>
+}}</ref> <ref name="205G">{{cite journal
+  | last1 = Raussendorf
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+  | first1 = R.
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+  | last2 = Briegel
-  | first1 = S.
+ | first2 = H. J.
-  | display-authors = etal
+  | title = A one-way quantum computer
-  | title = Generation and sampling of quantum states of light in a silicon chip
+  | journal = Phys. Rev. Lett.
-  | journal = Nat. Phys.
+  | volume = 86
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+  | pages = 5188–5191
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+  | year = 2001
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+  | doi = 10.1103/PhysRevLett.86.5188
-  | doi = 10.1038/s41567-019-0567-8
+}}</ref><ref name="206G">{{cite journal
-}}</ref>
+  | last1 = Nielsen
+  | first1 = M. A.
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+  | title = Optical quantum computation using cluster states
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-  | first1 = C. S.
- | display-authors = etal
-  | title = Gaussian Boson sampling
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-  | volume = 119
+  | volume = 93
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+  | article-no = 040503
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+  | year = 2004
-  | doi = 10.1103/PhysRevLett.119.170501
+  | doi = 10.1103/PhysRevLett.93.040503
-}}</ref>
+}}</ref><ref name="207G">{{cite journal
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+  | first1 = P.
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-  | first1 = R.
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-  | title = Detailed study of Gaussian boson sampling
+  | title = Experimental one-way quantum computing
- | journal = Phys. Rev. A
- | volume = 100
- | article-no = 032326
- | year = 2019
- | doi = 10.1103/PhysRevA.100.032326
-}}</ref>
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- | last1 = Zhong
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- | display-authors = etal
- | title = Quantum computational advantage using photons
- | journal = Science
- | volume = 370
- | pages = 1460–1463
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-}}</ref>
-<ref name="221G">{{cite journal
- | last1 = Madsen
- | first1 = L. S.
- | display-authors = etal
- | title = Quantum computational advantage with a programmable photonic processor
   | journal = Nature
-  | volume = 606
+  | volume = 434
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+  | pages = 169–176
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+  | year = 2005
-  | doi = 10.1038/s41586-022-04516-6
+  | doi = 10.1038/nature03347
-}}</ref>
+}}</ref><ref name="208G">{{cite journal
+  | last1 = Menicucci
-<ref name="222G">{{cite journal
+  | first1 = N. C.
-  | last1 = Arrazola
+  | last2 = Flammia
-  | first1 = J. M.
+  | first2 = S. T.
-  | last2 = Bromley
+ | last3 = Pfister
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+ | first3 = O.
-  | title = Using Gaussian Boson sampling to find dense subgraphs
+  | title = One-way quantum computing in the optical frequency comb
   | journal = Phys. Rev. Lett.
-  | volume = 121
+  | volume = 101
-  | article-no = 030503
+  | article-no = 130501
-  | year = 2018
+  | year = 2008
-  | doi = 10.1103/PhysRevLett.121.030503
+  | doi = 10.1103/PhysRevLett.101.130501
-}}</ref>
+}}</ref><ref name="209G">{{cite journal
+  | last1 = Saggio
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+  | first1 = V.
-  | last1 = Quesada
+ | display-authors = etal
-  | first1 = N.
+  | title = Experimental quantum speed-up in reinforcement learning agents
-  | title = Franck–Condon factors by counting perfect matchings of graphs with loops
+ | journal = Nature
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+ | volume = 591
-  | volume = 150
+ | pages = 229–233
-  | article-no = 164113
+ | year = 2021
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+ | doi = 10.1038/s41586-021-03281-8
-  | doi = 10.1063/1.5093093
+}}</ref> (e.g.,
-}}</ref>
+one-way or measurement-based). For specific quantum
+computation, a variety of photonic systems were
-<ref name="224G">{{cite journal
+demonstrated using quantum photonic chips<ref name="210G">{{cite journal
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+  | last1 = Spring
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+ | first1 = J. B.
+ | display-authors = etal
+ | title = Boson sampling on a photonic chip
+ | journal = Science
+  | volume = 339
+  | pages = 798–801
+  | year = 2013
+  | doi = 10.1126/science.1231692
+}}</ref><ref name="211G">{{cite journal
+  | last1 = Broome
+  | first1 = M. A.
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-  | title = Molecular docking with Gaussian Boson sampling
+  | title = Photonic Boson sampling in a tunable circuit
-  | journal = Sci. Adv.
+  | journal = Science
-  | volume = 6
+  | volume = 339
-  | article-no = eaax1950
+  | pages = 794–798
-  | year = 2020
+  | year = 2013
-  | doi = 10.1126/sciadv.aax1950
+  | doi = 10.1126/science.1231440
-}}</ref>
+}}</ref><ref name="212G">{{cite journal
+  | last1 = Tillmann
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+  | first1 = M.
-  | last1 = Huh
+  | display-authors = etal
-  | first1 = J.
+  | title = Experimental boson sampling
-  | last2 = Yung
+  | journal = Nat. Photonics
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-  | title = Vibronic Boson sampling: generalized Gaussian Boson sampling for molecular vibronic spectra at finite temperature
-  | journal = Sci. Rep.
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-  | article-no = 7462
+  | pages = 540–544
-  | year = 2017
+  | year = 2013
-  | doi = 10.1038/s41598-017-07080-2
+  | doi = 10.1038/nphoton.2013.102
-}}</ref>
+}}</ref><ref name="213G">{{cite journal
+  | last1 = Crespi
-<ref name="226G">{{cite journal
-  | last1 = Politi
   | first1 = A.
   | display-authors = etal
-  | title = Silica-on-silicon waveguide quantum circuits
+  | title = Integrated multimode interferometers with arbitrary designs for photonic boson sampling
-  | journal = Science
+  | journal = Nat. Photonics
-  | volume = 320
+  | volume = 7
-  | pages = 646–649
+  | pages = 545–549
-  | year = 2008
+  | year = 2013
-  | doi = 10.1126/science.1155441
+  | doi = 10.1038/nphoton.2013.112
-}}</ref>
+}}</ref><ref name="214G">{{cite journal
+  | last1 = Bentivegna
-<ref name="227G">{{cite journal
+  | first1 = M.
-  | last1 = Politi
+  | display-authors = etal
-  | first1 = A.
+  | title = Experimental scattershot boson sampling
-  | last2 = Matthews
+  | journal = Sci. Adv.
-  | first2 = J. C. F.
+  | volume = 1
-  | last3 = O’Brien
+  | article-no = e1400255
- | first3 = J. L.
+  | year = 2015
- | title = Shor’s quantum factoring algorithm on a photonic chip
+  | doi = 10.1126/sciadv.1400255
- | journal = Science
+}}</ref><ref name="215G">{{cite journal
-  | volume = 325
+  | last1 = Wang
-  | pages = 1221
+  | first1 = H.
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-  | doi = 10.1126/science.1173731
-}}</ref>
-<ref name="228G">{{cite journal
-  | last1 = Bourassa
-  | first1 = J. E.
   | display-authors = etal
-  | title = Blueprint for a scalable photonic fault-tolerant quantum computer
+  | title = High-efficiency multiphoton boson sampling
-  | journal = Quantum
+  | journal = Nat. Photonics
- | volume = 5
+  | volume = 11
- | article-no = 392
+  | pages = 361–365
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- | doi = 10.22331/q-2021-02-04-392
-}}</ref>
-<ref name="229G">{{cite journal
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- | journal = APL Photonics
-  | volume = 2
-  | article-no = 030901
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-  | doi = 10.1063/1.4976737
+  | doi = 10.1038/nphoton.2017.63
-}}</ref>
+}}</ref><ref name="215G" /><ref name="217G">{{cite journal
+  | last1 = Paesani
-<ref name="230G">{{cite journal
+  | first1 = S.
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- | last2 = Rudolph
- | first2 = T.
- | title = Resource-efficient linear optical quantum computation
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-}}</ref>
-<ref name="231G">{{cite journal
-  | last1 = Pant
-  | first1 = M.
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-  | title = Percolation thresholds for photonic quantum computing
+  | title = Generation and sampling of quantum states of light in a silicon chip
-  | journal = Nat. Commun.
+  | journal = Nat. Phys.
-  | volume = 10
+  | volume = 15
-  | article-no = 1070
+  | pages = 925–929
   | year = 2019
-  | doi = 10.1038/s41467-019-08944-1
+  | doi = 10.1038/s41567-019-0567-8
-}}</ref>
+}}</ref>,
+enabling a natural and effective implementation of boson
-<ref name="232G">{{cite journal
+sampling. Gaussian boson sampling<ref name="218G">{{cite journal
-  | last1 = Adcock
+  | last1 = Hamilton
-  | first1 = J. C.
+  | first1 = C. S.
+ | display-authors = etal
+ | title = Gaussian Boson sampling
+ | journal = Phys. Rev. Lett.
+ | volume = 119
+ | article-no = 170501
+ | year = 2017
+ | doi = 10.1103/PhysRevLett.119.170501
+}}</ref><ref name="219G">{{cite journal
+ | last1 = Kruse
+ | first1 = R.
   | display-authors = etal
-  | title = Programmable four-photon graph states on a silicon chip
+  | title = Detailed study of Gaussian boson sampling
-  | journal = Nat. Commun.
+  | journal = Phys. Rev. A
-  | volume = 10
+  | volume = 100
-  | article-no = 3528
+  | article-no = 032326
   | year = 2019
-  | doi = 10.1038/s41467-019-11335-2
+  | doi = 10.1103/PhysRevA.100.032326
-}}</ref>
+}}</ref>, which can
+dramatically enhance the sampling rate with the adoption
-<ref name="233G">{{cite journal
+of squeezed light sources, was performed for the calculation
-  | last1 = Ciampini
+of molecular vibronic spectra on a <math>Si</math> chip<ref name="217G" /> (up to
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+photons) and a <math>SiN</math> chip<ref name="216G">{{cite journal
+  | last1 = Arrazola
+  | first1 = J. M.
   | display-authors = etal
-  | title = Path-polarization hyperentangled and cluster states of photons on a chip
+  | title = Quantum circuits with many photons on a programmable nanophotonic chip
-  | journal = Light Sci. Appl.
+  | journal = Nature
-  | volume = 5
+  | volume = 591
-  | article-no = e16064
+  | pages = 54–60
-  | year = 2016
+  | year = 2021
-  | doi = 10.1038/lsa.2016.64
+  | doi = 10.1038/s41586-021-03235-0
-}}</ref>
+}}</ref> (up to 18 photons). Recently,
+quantum computational advantage has been delivered by
-<ref name="234G">{{cite journal
+photonic Gaussian boson sampling processors<ref name="220G">{{cite journal
-  | last1 = Vigliar
+  | last1 = Zhong
-  | first1 = C.
+  | first1 = H. S.
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+  | title = Quantum computational advantage using photons
-  | journal = Nat. Phys.
+ | journal = Science
-  | volume = 17
+ | volume = 370
-  | pages = 1137–1143
+ | pages = 1460–1463
-  | year = 2021
+ | year = 2020
-  | doi = 10.1038/s41567-021-01265-5
+ | doi = 10.1126/science.abe8770
-}}</ref>
+}}</ref><ref name="221G">{{cite journal
+ | last1 = Madsen
-<!--Integrated photonics in quantum technologies-->
+ | first1 = L. S.
-<ref name="01H">{{cite journal
+ | display-authors = etal
-| last1 = Flamini
+ | title = Quantum computational advantage with a programmable photonic processor
-| first1 = F.
+  | journal = Nature
-| last2 = Spagnolo
+  | volume = 606
-| first2 = N.
+  | pages = 75–81
-| last3 = Sciarrino
+  | year = 2022
-| first3 = F.
+  | doi = 10.1038/s41586-022-04516-6
-| title = Photonic quantum information processing: a review
+}}</ref>,
-| journal = Rep. Prog. Phys.
+paving the path for further development of integrated
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+specific quantum computers with potential applications
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+including graph optimization<ref name="222G">{{cite journal
-| year = 2018
+ | last1 = Arrazola
-| doi = 10.1088/1361-6633/aad5b2
+ | first1 = J. M.
-}}</ref>
+ | last2 = Bromley
+ | first2 = T. R.
-<ref name="02H">{{cite journal
+ | title = Using Gaussian Boson sampling to find dense subgraphs
-| last1 = Slussarenko
+ | journal = Phys. Rev. Lett.
-| first1 = S.
+ | volume = 121
-| last2 = Pryde
+ | article-no = 030503
-| first2 = G. J.
+ | year = 2018
-| title = Photonic quantum information processing: A concise review
+ | doi = 10.1103/PhysRevLett.121.030503
-| journal = Appl. Phys. Rev.
+}}</ref>, complex molecular
-| volume = 6
+spectra<ref name="223G">{{cite journal
-| issue = 4
+ | last1 = Quesada
-| article-no = 041303
+ | first1 = N.
-| year = 2019
+ | title = Franck–Condon factors by counting perfect matchings of graphs with loops
-| doi = 10.1063/1.5115814
+ | journal = J. Chem. Phys.
-}}</ref>
+ | volume = 150
+ | article-no = 164113
-<ref name="03H">{{cite journal
+ | year = 2019
-| last1 = Zhong
+ | doi = 10.1063/1.5093093
-| first1 = H.-S.
+}}</ref>, molecular docking<ref name="224G">{{cite journal
-| last2 = Wang
+ | last1 = Banchi
-| first2 = H.
+ | first1 = L.
-| last3 = Deng
+ | display-authors = etal
-| first3 = Y.-H.
+ | title = Molecular docking with Gaussian Boson sampling
-| title = Quantum computational advantage using photons
+ | journal = Sci. Adv.
-| journal = Science
+ | volume = 6
-| volume = 370
+ | article-no = eaax1950
-| issue = 6523
+ | year = 2020
-| pages = 1460–1463
+ | doi = 10.1126/sciadv.aax1950
-| year = 2020
+}}</ref>, quantum chemistry<ref name="225G">{{cite journal
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+ | last1 = Huh
-}}</ref>
+ | first1 = J.
+ | last2 = Yung
-<ref name="04H">{{cite journal
+ | first2 = M. H.
-| last1 = Zhong
+ | title = Vibronic Boson sampling: generalized Gaussian Boson sampling for molecular vibronic spectra at finite temperature
-| first1 = H.-S.
+ | journal = Sci. Rep.
-| last2 = Deng
+ | volume = 7
-| first2 = Y.-H.
+ | article-no = 7462
-| last3 = Qin
+ | year = 2017
-| first3 = J.
+ | doi = 10.1038/s41598-017-07080-2
-| title = Phase-programmable Gaussian boson sampling using stimulated squeezed light
+}}</ref>,
-| journal = Phys. Rev. Lett.
+etc. For universal quantum computation, a number of
-| volume = 127
+major functionalities have been demonstrated with onchip
-| article-no = 180502
+photonic components, such as controlled-NOT gate
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+and its heralding version<ref name="92G">{{cite journal
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+| last1 = Carolan
-}}</ref>
+| first1 = J.
+| title = Universal linear optics
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+| journal = Science
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+| volume = 349
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+| year = 2015
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+}}</ref><ref name="226G">{{cite journal
-| first3 = M. F.
+ | last1 = Politi
-| title = Quantum computational advantage with a programmable photonic processor
+ | first1 = A.
-| journal = Nature
+ | display-authors = etal
-| volume = 606
+ | title = Silica-on-silicon waveguide quantum circuits
-| issue = 7912
+ | journal = Science
-| pages = 75–81
+ | volume = 320
-| year = 2022
+ | pages = 646–649
-| doi = 10.1038/s41586-022-04725-x
+ | year = 2008
-}}</ref>
+ | doi = 10.1126/science.1155441
+}}</ref>, and compiled Shor’s
-<ref name="06H">{{cite journal
+factorization<ref name="227G">{{cite journal
-| last1 = Liao
+ | last1 = Politi
-| first1 = S.-K.
+ | first1 = A.
-| title = Satellite-to-ground quantum key distribution
+ | last2 = Matthews
-| journal = Nature
+ | first2 = J. C. F.
-| volume = 549
+ | last3 = O’Brien
-| issue = 7670
+ | first3 = J. L.
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+ | title = Shor’s quantum factoring algorithm on a photonic chip
-| year = 2017
+ | journal = Science
-| doi = 10.1038/nature23655
+ | volume = 325
-}}</ref>
+ | pages = 1221
+ | year = 2009
-<ref name="07H">{{cite journal
+ | doi = 10.1126/science.1173731
-| last1 = Ren
+}}</ref>. Moreover, both architectural and technological
-| first1 = J.-G.
+efforts have been dedicated to photonic one-way
-| title = Ground-to-satellite quantum teleportation
+quantum computation. This approach employs cluster
-| journal = Nature
+states and sequential single-qubit measurement to perform
-| volume = 549
+universal quantum algorithms<ref name="205G" /><ref name="207G" /><ref name="228G">{{cite journal
-| issue = 7670
+ | last1 = Bourassa
-| pages = 70–73
+ | first1 = J. E.
-| year = 2017
+ | display-authors = etal
-| doi = 10.1038/nature23675
+ | title = Blueprint for a scalable photonic fault-tolerant quantum computer
-}}</ref>
+ | journal = Quantum
+ | volume = 5
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+ | article-no = 392
-| last1 = Wang
+ | year = 2021
-| first1 = J.
+ | doi = 10.22331/q-2021-02-04-392
-| last2 = Sciarrino
+}}</ref> and can be
-| first2 = F.
+greatly enhanced by implementing resource state generation
-| last3 = Laing
+and fusion operation natively<ref name="229G">{{cite journal
-| first3 = A.
+ | last1 = Rudolph
-| last4 = Thompson
+ | first1 = T.
-| first4 = M. G.
+ | title = Why I am optimistic about the silicon-photonic route to quantum computing
-| title = Integrated photonic quantum technologies
+ | journal = APL Photonics
-| journal = Nat. Photonics
+ | volume = 2
-| volume = 14
+ | article-no = 030901
-| issue = 5
+ | year = 2017
-| pages = 273–284
+ | doi = 10.1063/1.4976737
-| year = 2020
+}}</ref><ref name="230G">{{cite journal
-| doi = 10.1038/s41566-019-0532-1
+ | last1 = Browne
-}}</ref>
+ | first1 = D. E.
+ | last2 = Rudolph
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+ | first2 = T.
-| last1 = Pelucchi
+ | title = Resource-efficient linear optical quantum computation
-| first1 = E.
+ | journal = Phys. Rev. Lett.
-| title = The potential and global outlook of integrated photonics for quantum technologies
+ | volume = 95
-| journal = Nat. Rev. Phys.
+ | article-no = 010501
-| volume = 4
+ | year = 2005
-| issue = 3
+ | doi = 10.1103/PhysRevLett.95.010501
-| pages = 194–208
+}}</ref><ref name="231G">{{cite journal
-| year = 2022
+ | last1 = Pant
-| doi = 10.1038/s42254-021-00398-z
+ | first1 = M.
-}}</ref>
+ | display-authors = etal
+ | title = Percolation thresholds for photonic quantum computing
-<ref name="11H">{{cite journal
+ | journal = Nat. Commun.
-| last1 = Carolan
+ | volume = 10
-| first1 = J.
+ | article-no = 1070
-| title = Universal linear optics
+ | year = 2019
-| journal = Science
+ | doi = 10.1038/s41467-019-08944-1
-| volume = 349
+}}</ref>. The relevant
-| issue = 6249
+circuit implementations include programmable fourphoton
-| pages = 711–716
+graph states on a Si chip<ref name="232G">{{cite journal
-| year = 2015
+ | last1 = Adcock
-| doi = 10.1126/science.aab3642
+ | first1 = J. C.
-}}</ref>
+ | display-authors = etal
-<ref name="12H">{{cite arxiv
+ | title = Programmable four-photon graph states on a silicon chip
-| last1 = Taballione
+ | journal = Nat. Commun.
-| first1 = C.
+ | volume = 10
-| title = 20-Mode Universal Quantum Photonic Processor
+ | article-no = 3528
+ | year = 2019
+ | doi = 10.1038/s41467-019-11335-2
+}}</ref>, path-polarization
+hyperentangled and cluster states on a <math>\mathrm{SiO_2}</math> chip<ref name="233G">{{cite journal
+ | last1 = Ciampini
+ | first1 = M. A.
+ | display-authors = etal
+ | title = Path-polarization hyperentangled and cluster states of photons on a chip
+ | journal = Light Sci. Appl.
+ | volume = 5
+ | article-no = e16064
+ | year = 2016
+ | doi = 10.1038/lsa.2016.64
+}}</ref> and
+programmable eight-qubit graph states on a Si chip<ref name="234G">{{cite journal
+ | last1 = Vigliar
+ | first1 = C.
+ | display-authors = etal
+ | title = Error-protected qubits in a silicon photonic chip
+ | journal = Nat. Phys.
+ | volume = 17
+ | pages = 1137–1143
+ | year = 2021
+ | doi = 10.1038/s41567-021-01265-5
+}}</ref>.
+In conclusion, quantum photonic chips have rapidly
+matured to become a versatile platform that proves to be
+invaluable in the development of cutting-edge quantum
+communication technologies. This review delves into the
+advancements achieved in this particular field. Considering
+the remarkable outcomes, it is anticipated that photonic
+integration will eventually assume a crucial role in
+building various quantum networks and potentially a
+global quantum internet<ref name="22G" /><ref name="23G" /><ref name="33G">{{cite journal
+| last1 = Long
+| first1 = G. L.
+| last2 = Pan
+| first2 = D.
+| title = An evolutionary pathway for the quantum internet relying on secure classical repeaters
+| journal = IEEE Netw.
+| volume = 36
+| pages = 82–88
 | year = 2022
-| arxiv = 2203.01801
+| doi = 10.1109/MNET.108.2100375
-}}</ref>
+}}</ref><ref name="19K">Kimble, H. J. The quantum internet. *Nature* **453**, 1023–1030 (2008). https://doi.org/10.1038/nature07127</ref>, reshaping the landscape of
+future communication methodologies.
-<ref name="13H">{{cite journal
+==Chip packaging and system integration==
-| last1 = Qiang
+While bare quantum photonic chips can be characterized
-| first1 = X.
+using a probe station, they must be packaged into
-| title = Large-scale silicon quantum photonics implementing arbitrary two-qubit processing
+durable modules to develop working prototype devices<ref name="115G">{{cite journal
-| journal = Nat. Photonics
+| last1 = Carroll
-| volume = 12
+| first1 = L.
-| issue = 9
+| title = Photonic packaging: transforming silicon photonic integrated circuits into photonic devices
-| pages = 534–539
+| journal = Appl. Sci.
-| year = 2018
+| volume = 6
-| doi = 10.1038/s41566-018-0236-y
+| article-no = 426
-}}</ref>
+| year = 2016
-<ref name="14H">{{cite journal
+| doi = 10.3390/app6060426
-| last1 = Arrazola
+}}</ref>.
-| first1 = J. M.
+To this end, numerous processes have been proposed to
-| title = Quantum circuits with many photons on a programmable nanophotonic chip
+package quantum photonic chips into compact systems
-| journal = Nature
+for real-world applications.
-| volume = 591
+Generally, photonic packaging involves a range of
-| issue = 7848
+techniques and technical competencies needed to make
-| pages = 54–60
+the optical, electrical, mechanical, and thermal connections
-| year = 2021
+between a photonic chip and the off-chip components
-| doi = 10.1038/s41586-021-03202-1
+in a photonic module<ref name="116G">{{cite journal
-}}</ref>
+| last1 = Zimmermann
+| first1 = L.
-<ref name="15H">{{cite journal
+| title = Packaging and assembly for integrated photonics – a review of the ePIXpack photonics packaging platform
-| last1 = Chi
+| journal = IEEE J. Sel. Top. Quantum Electron.
-| first1 = Y.
+| volume = 17
-| title = A programmable qudit-based quantum processor
+| pages = 645–651
-| journal = Nat. Commun.
+| year = 2011
-| volume = 13
+| doi = 10.1109/JSTQE.2011.2161469
-| issue = 1
+}}</ref><ref name="117G">{{cite web
-| article-no = 1166
+| last = O'Brien
-| year = 2022
+| first = P.
-| doi = 10.1038/s41467-022-28767-x
+| title = Packaging of silicon photonic devices
-}}</ref>
+| editor1-last = Pavesi
+| editor1-first = L.
-<ref name="17H">{{cite journal
+| editor2-last = Lockwood
-| last1 = Ferrari
+| editor2-first = D. J.
-| first1 = S.
+| pages = 217–236
-| title = Waveguide-integrated superconducting nanowire single-photon detectors
+| publisher = Springer
-| journal = Nanophotonics
+| location = Berlin
+| date = 2016
+| url = https://link.springer.com/chapter/10.1007/978-3-319-41192-7_9
+}}</ref><ref name="118G">{{cite journal
+| last1 = Lee
+| first1 = J. S.
+| title = Meeting the electrical, optical, and thermal design challenges of photonic‑packaging
+| journal = IEEE J. Sel. Top. Quantum Electron.
+| volume = 22
+| article-no = 8200209
+| year = 2016
+| doi = 10.1109/JSTQE.2016.2562638
+}}</ref>. Fiber-to-chip coupling
+is one of the best-known aspects. The main challenge
+associated with coupling between an optical fiber and a
+typical waveguide on the chip is the large difference
+between their mode‐field diameters (MFDs)<ref name="119G">{{cite journal
+| last1 = Taillaert
+| first1 = D.
+| title = Grating couplers for coupling between optical fibers and nanophotonic waveguides
+| journal = Jpn. J. Appl. Phys.
+| volume = 45
+| pages = 6071–6077
+| year = 2006
+| doi = 10.1143/JJAP.45.6071
+}}</ref>. For
+example, the MFD at 1550 nm is ~10 μm in telecom
+single‐mode fiber (SMF), while the cross-section of the
+corresponding strip silicon waveguide is usually only
+× 450 nm. This mismatch can be mitigated by using
+configurations that efficiently extract the mode from
+waveguide<ref name="97G">{{cite journal
+| last1 = Marchetti
+| first1 = R.
+| title = Coupling strategies for silicon photonics integrated chips [Invited]
+| journal = Photonics Res.
 | volume = 7
-| issue = 11
+| pages = 201–239
-| pages = 1725–1758
+| year = 2019
-| year = 2018
+| doi = 10.1364/PRJ.7.000201
-| doi = 10.1515/nanoph-2018-0059
+}}</ref>, such as inverted-taper edge couplers
-}}</ref>
+interfaced with lensed SMF fibers<ref name="120G">{{cite journal
+| last1 = Pu
-<ref name="20H">{{cite journal
+| first1 = M. H.
-| last1 = Harrow
+| title = Ultra‑low‑loss inverted taper coupler for silicon‑on‑insulator ridge waveguide
-| first1 = A. W.
+| journal = Opt. Commun.
-| last2 = Montanaro
+| volume = 283
-| first2 = A.
+| pages = 3678–3682
-| title = Quantum computational supremacy
+| year = 2010
-| journal = Nature
+| doi = 10.1016/j.optcom.2010.07.005
-| volume = 549
+}}</ref><ref name="121G">{{cite journal
-| pages = 203
+| last1 = He
-| year = 2017
+| first1 = L. Y.
-| doi = 10.1038/nature23458
+| title = Low‑loss fiber‑to‑chip interface for lithium niobate photonic integrated circuits
-}}</ref>
+| journal = Opt. Lett.
+| volume = 44
-<ref name="21H">{{cite web
+| pages = 2314–2317
-| last = Nielsen
+| year = 2019
-| first = M. A.
+| doi = 10.1364/OL.44.002314
-| author2 = Chuang, I. L.
+}}</ref> or ultrahigh
-| title = Quantum Computation and Quantum Information: 10th Anniversary Edition
+numerical aperture fibers<ref name="122G">{{cite journal
-| publisher = Cambridge University Press
+| last1 = Preble
-| location = Cambridge
+| first1 = S. F.
-| date = 2010
+| title = On‑chip quantum interference from a single silicon ring‑resonator source
-| doi = 10.1017/CBO9780511976667
+| journal = Phys. Rev. Appl.
-| url = https://www.cambridge.org/core/books/quantum-computation-and-quantum-information/8F8B8D4E4A4E4A4E4A4E4A4E4A4E4A4E
+| volume = 4
-}}</ref>
+| article-no = 021001
+| year = 2015
-<ref name="23H">{{cite journal
+| doi = 10.1103/PhysRevApplied.4.021001
-| last1 = Cozzolino
+}}</ref>, and grating couplers
-| first1 = D.
+interfaced with SMF fibers<ref name="119G" /><ref name="123G">{{cite journal
-| title = High-dimensional quantum communication: Benefits, progress, and future challenges
+| last1 = Sacher
-| journal = Adv. Quantum Technol.
+| first1 = W. D.
-| volume = 2
+| title = Wide bandwidth and high coupling efficiency Si3N4‑on‑SOI dual‑level grating coupler
-| issue = 12
+| journal = Opt. Express
-| article-no = 1900038
+| volume = 22
-| year = 2019
+| pages = 10938–10947
-| doi = 10.1002/qute.201900038
+| year = 2014
-}}</ref>
+| doi = 10.1364/OE.22.010938
+}}</ref>. For the
-<ref name="27H">{{cite journal
+approach harnessing grating couplers, coupling efficiency
-| last1 = Wang
+up to 81.3% (−0.9 dB) can be achieved in a 260-nm-thick
-| first1 = J.
+SOI platform without the need for a back reflector or
-| title = Multidimensional quantum entanglement with large-scale integrated optics
+overlayer<ref name="124G">{{cite journal
-| journal = Science
+| last1 = Marchetti
-| year = 2018
+| first1 = R.
-| doi = 10.1126/science.aar7053
+| title = High‑efficiency grating‑couplers: demonstration of a new design strategy
-}}</ref>
+| journal = Sci. Rep.
+| volume = 7
-<ref name="44H">{{cite journal
+| article-no = 16670
-| last1 = Svalgaard
+| year = 2017
-| first1 = M.
+| doi = 10.1038/s41598-017-16750‑7
-| title = Direct UV writing of buried singlemode channel waveguides in Ge-doped silica films
+}}</ref>. Additionally, efficiencies over 90% have been
-| journal = Electron. Lett.
+experimentally demonstrated using edge couplers fabricated
-| volume = 30
+on 200-mm SOI wafers<ref name="125G">{{cite journal
-| issue = 17
+| last1 = Bakir
-| pages = 1401–1403
+| first1 = B. B.
-| year = 1994
+| title = Low‑loss (<1 dB) and polarization‑insensitive edge fiber couplers fabricated on
-| doi = 10.1049/el:19940935
+| journal = IEEE Photonics Technol. Lett.
-}}</ref>
+| volume = 22
+| pages = 739–741
-<ref name="45H">{{cite journal
+| year = 2010
-| last1 = Gattass
+| doi = 10.1109/LPT.2010.2061039
-| first1 = R. R.
+}}</ref>. An alternative approach
-| title = Femtosecond laser micromachining in transparent materials
+for cost-effective and panel-level packaging is the evanescent
-| journal = Nat. Photonics
+coupling scheme, which has been reported to
-| volume = 2
+have a coupling loss of approximately 1 dB at a wavelength
-| issue = 4
+of 1550 nm<ref name="126G">{{cite journal
-| pages = 219–225
+| last1 = Dangel
-| year = 2008
+| first1 = R.
-| doi = 10.1038/nphoton.2008.47
+| title = Polymer waveguides for electro-optical integration in data centers and high-performance computers
-}}</ref>
+| journal = Opt. Express
+| volume = 23
-<ref name="48H">{{cite journal
+| pages = 4736–4750
-| last1 = Boes
+| year = 2015
-| first1 = A.
+| doi = 10.1364/OE.23.004736
-| title = Status and Potential of Lithium Niobate on Insulator (LNOI) for Photonic Integrated Circuits
+}}</ref>.
-| journal = Laser & Photonics Rev.
+To access the electrical components on quantum photonic
-| volume = 12
+chips, electronic packaging is required to route signals
-| issue = 4
+from electronic drivers, amplifiers, and other control
-| article-no = 1700256
+circuitry. This is often achieved by interfacing with dedicated
-| year = 2018
+printed circuit boards (PCBs)<ref name="127G">{{cite journal
-| doi = 10.1002/lpor.201700256
+| last1 = Taballione
-}}</ref>
+| first1 = C.
+| title = A universal fully reconfigurable 12-mode quantum photonic processor
-<ref name="50H">{{cite journal
+| journal = Mater. Quantum Technol.
-| last1 = Dietrich
+| volume = 1
-| first1 = C. P.
+| pages = 035002
-| title = GaAs integrated quantum photonics: Towards compact and multi-functional quantum photonic integrated circuits
+| year = 2021
-| journal = Laser & Photonics Rev.
+| doi = 10.1088/2633-4356/ac1a9f
-| volume = 10
+}}</ref>. The connection
-| issue = 6
+between PCBs and the bond-pads on the chip is
-| pages = 870–894
+usually made using wire-bonds.When a very large number
-| year = 2016
+of electrical connections or precise sub-nanosecond control
-| doi = 10.1002/lpor.201500321
+on multiple channels is needed, 2.5-dimensional or
+-dimensional integration with customized electronic
+integrated circuits (EICs) may be utilized <ref name="115G" /><ref name="128G">{{cite journal
+| last1 = Abrams
+| first1 = N. C.
+| title = Silicon photonic 2.5D multi-chip module transceiver for high-performance data centers
+| journal = J. Lightwave Technol.
+| volume = 38
+| pages = 3346–3357
+| year = 2020
+| doi = 10.1109/JLT.2020.2979551
 }}</ref>
+This integration can be achieved using either solder-ballbump
+or copper-pillar-bump interconnects, providing a
+robust electrical, mechanical, and thermal interface for the
+photonic chips<ref name="129G">{{cite journal
+ | last1 = Wörhoff
+ | first1 = K.
+ | title = Flip-chip assembly for photonic circuits
+ | journal = Proceedings of SPIE
+ | volume = 5454
+ | series = Micro-Optics: Fabrication, Packaging, and Integration
+ | pages = 9–20
+ | date = 2004
+ | publisher = SPIE
+ | location = Strasbourg, France
+ | doi = 10.1117/12.544610
+}}</ref><ref name="130G">{{cite conference
+ | last1 = Zhang
+ | first1 = X. R.
+ | title = Copper pillar bump structure optimization for flip chip packaging with Cu/Low-K stack
+ | conference = Proceedings of the 11th International Thermal, Mechanical & Multi-Physics Simulation and Experiments in Microelectronics and Microsystems
+ | pages = 1-7
+ | date = 2010
+ | publisher = IEEE
+ | location = Bordeaux, France
+ | doi = 10.1109/ESIME.2010.5464484
+}}</ref>.
+Global thermal stabilization of quantumphotonic devices
+is essential for prototypes that require high accuracy and
+repeatability or for field tests where seasonal temperature
+swings are common. This can be achieved using passive
+cooling techniques or a thermoelectric cooler (TEC). The
+added global stability from the TEC allows for more efficient
+and better reproducibility in the local temperature
+tuning of individual photonic elements (e.g., micro-ring
+resonators, thermo-optic phase shifters, etc.) on the
+chip<ref name="115G" />. Additionally, liquid cooling can be installed to
+further increase the cooling capacity of the system<ref name="127G" />
+==Experiments==
+== On-Chip Quantum Interference ==
+[[File:Molecular quantum photonic chip and an illustration of on-chip interference of indistinguishable single photons from independent quantum emitters (molecules).jpg]]
+ <div style="column-count:2;">'''<big>a</big>''', Photograph of the quantum photonic chip.'''<big>b</big>''', Optical micrograph of all 24 independent devices integrated on the chip.'''<big>c</big>''', Zoomed-in view of one device with hybrid integration of Si3N4 photonic elements (waveguides W1–W4, a 2 × 2 MMI and grating couplers G1–G4), an anthracene nanosheet (light green) doped with DBT molecules, and metal electrodes (yellow). '''<big>d</big>''', SEM images of the waveguides W1 and W2 (with gold electrodes flanking them), the MMI, and one of the output gratings G3. '''<big>e</big>''', DBT molecular structure and energy-level scheme. em., emission; exc., excitation. '''<big>f</big>''', Illustration of the on-chip two-photon quantum interference experiment: two streams of single photons originating from resonantly driven DBT molecules couple to the waveguides, interfere through the MMI, then propagate through the waveguide circuits and out-couple to free space via the gratings for timecorrelated
+single-photon detection. The transition frequencies of the molecules can be tuned by the electrode via the Stark effect. Scale bars, 1 mm ('''<big>a</big>'''), 300 μm ('''<big>b</big>'''), 50 μm ('''<big>c</big>''') and 10 μm ('''<big>d</big>'''). Recent experimental breakthroughs have successfully implemented these waveguide principles using molecular quantum photonic chips. By integrating independent dibenzoterrylene (DBT) molecules into <math>Si_{3}N_{4}</math> waveguides, researchers have achieved on-chip Hong–Ou–Mandel (HOM) interference with a visibility of <math>0.97 \pm 0.02</math>. <ref name="01K" /></div>
+These integrated systems allow for the observation of quantum beating when a frequency detuning (e.g., 400 MHz) is applied between two emitters. These beats have been shown to persist for over 100 µs, demonstrating the high spectral stability and single-photon purity required for scalable quantum information processing. <ref name="04K" />
-<ref name="53H">{{cite journal
+====Evaluating photon indistinguishability from the TPQI experiment under CW excitation====
-| last1 = Shadbolt
+A recent report<ref name="40K">{{cite journal
-| first1 = P.J.
+| last1 = Schofield
-| title = Generating, manipulating and measuring entanglement and mixture with a reconfigurable photonic circuit
+| first1 = R. C.
-| journal = Nat. Photonics
+| last2 = et al.
-| volume = 6
+| title = Photon indistinguishability measurements under pulsed and continuous excitation
-| issue = 1
+| journal = Phys. Rev. Res.
-| pages = 45–49
+| volume = 4
-| year = 2012
+| pages = 013037
-| doi = 10.1038/nphoton.2011.283
+| year = 2022
-}}</ref>
+| doi = 10.1103/PhysRevResearch.4.013037
+}}</ref> establishes a method to evaluate full wave-packet photon
+indistinguishability from TPQI experiments under non-resonant CW excitation. Here, this method extends to resonant CW excitation, enabling direct assessment of photon indistinguishability from our
+TPQI data. The metric used in this approach is
+<math>
+\tilde{V}(S) =
+\frac{
+\int d\tau \, \bigl[1 - g^{(2)}_{\rm HOM}(\tau)\bigr]
+-
+\int d\tau \, \bigl[1 - g^{(2)}_{{\rm HOM},d}(\tau)\bigr]
+}{
+\int d\tau \, \bigl[1 - g^{(2)}_{{\rm HOM},d}(\tau)\bigr]
+}</math>.<br>Substituting the theoretical expressions for
+<math>g^{(2)}_{\rm HOM}(\tau)</math> and
+<math>g^{(2)}_{{\rm HOM},d}(\tau)</math> from equations respectively,
+<math>\tilde{V}(S)</math> is
+<math>
+\tilde{V}(S) = \frac{\mathcal{M} \,(2\mathcal{M}+1)}{\mathcal{M}+ (\mathcal{M}+1)/(1+S)}
+</math>
+.
-<ref name="56H">{{cite journal
+where <math>\mathcal{M} = \frac{\tau_2}{2 \tau_1}</math>. Equation (26) expresses <math>\tilde{V}</math> as a function of <math>S</math>.
-| last1 = Metcalf
-| first1 = B.J.
+In the weak excitation limit (<math>S \to 0</math>), <math>\tilde{V}</math> reduces to <math>\frac{\tau_2}{2 \tau_1}</math>, thereby yieldingn the true photon indistinguishability, consistent with TPQI experiments
-| title = Quantum teleportation on a photonic chip
+under pulsed excitation<ref name="40K" />.
-| journal = Nat. Photonics
-| volume = 8
+== Applications ==
-| issue = 10
+==Image classification==
-| pages = 770–774
+Has been significantly improved by the introduction of deep learning methods, which provide several algorithms that can learn and extract image features. Examples include feedforward neural networks, convolutional neural networks and vision transformers<ref name="01L">Lecun, Y., Bottou, L., Bengio, Y. & Haffner, P. Gradient-based learning applied to document recognition. ''Proc. IEEE'' '''86''', 2278–2324 (1998). [https://doi.org/10.1109/5.726791 doi:10.1109/5.726791]</ref><ref name="02L">Krizhevsky, A., Sutskever, I. & Hinton, G. E. ImageNet classification with deep convolutional neural networks. ''Commun. ACM'' '''60''', 84–90 (2017). [https://doi.org/10.1145/3065386 doi:10.1145/3065386]</ref><ref name="03L">He, K., Zhang, X., Ren, S. & Sun, J. Deep residual learning for image recognition. In ''IEEE Conference on Computer Vision and Pattern Recognition, CVPR ’16'', 770–778 (Las Vegas, 2016).</ref><ref name="04L">Dosovitskiy, A., Beyer, L., Kolesnikov, A., Weissenborn, D., Zhai, X., Unterthiner, T., Dehghani, M., Minderer, M., Heigold, G., Gelly, S., Uszkoreit, J. & Houlsby, N. An Image is Worth 16x16 Words: Transformers for Image Recognition at Scale. In ''International Conference on Learning Representations'' (2021). [https://arxiv.org/abs/2010.11929 arxiv:2010.11929]</ref>. The artificial neuron, also called perceptron<ref name="05L">Rosenblatt, F. The perceptron: a probabilistic model for information storage and organization in the brain. ''Psychol. Rev.'' '''65''', 386–408 (1958). [https://doi.org/10.1037/h0042519 doi:10.1037/h0042519]</ref>, represents the fundamental unit of such architectures. In this model, encoded data are processed through a set of weighted trainable connections, by taking the scalar product between the input and the vector of weights. The output is further post-processed, including a bias and an activation function, which is usually non-linear<ref name="06L">Goodfellow, I., Bengio, Y. & Courville, A. ''Deep Learning'' (MIT Press, 2016).</ref>. Image classification implies a two-fold cost. Computational processing requires a number of operations that scales, at least, linearly in the image resolution. Similarly, the optical cost of image capturing undergoes the same scaling in the number of photons.
-| year = 2014
-| doi = 10.1038/nphoton.2014.217
+This model compared against conventional classifiers, i.e. a single neuron and a convolutional neural network, commonly employed in pattern recognition tasks<ref name="25L" /><ref name="26L" /><ref name="27L" /><ref name="28L" /><ref name="38L" />. Adopting the TensorFlow notation, the convolutional structure is: Conv2D (10, 3 × 3) → Conv2D (4, 2 × 2) → MaxPooling2D (2 × 2). Roughly, all the architectures have ~10³ trainable parameters. The performances are equal in the MNIST dataset, both in terms of trainability and final accuracy. In the CIFAR-10 dataset, our classifier outperforms the conventional ones, showing superior efficiency under a strongly-constrained parameters count. These findings emphasize the competitive accuracy of our method, and also its comparative advantage in pattern recognition tasks with a limited number of parameters.
-}}</ref>
-<ref name="57H">{{cite journal
+====Entanglement distribution and quantum teleportation systems====
-| last1 = Mennea
+'''Quantum teleportation''' has been achieved over different types of platforms such as superconducting qubits, trapped atoms, nitrogen-vacancy centers, and continuous-variable states, among others.<ref name="170H">{{cite journal
-| first1 = P.L.
+| last1 = Semenenko
-| title = Modular linear optical circuits
+| first1 = H.
+| title = Chip-based measurementdevice- independent quantum key distribution
 | journal = Optica
-| volume = 5
+| volume = 7
-| issue = 9
+| issue = 3
-| pages = 1087–1090
+| pages = 238–242
-| year = 2018
+| year = 2020
-| doi = 10.1364/OPTICA.5.001087
+| doi = 10.1364/OPTICA.379679
-}}</ref>
+}}</ref> Of all the types of quantum teleportation, the photonic qubit is considered to be a very promising candidate for forming the quantum channel of the quantum network due to its stability within noisy environments and the fact that it can be operated at room temperature.<ref name="23H">{{cite journal
+| last1 = Cozzolino
-<ref name="65H">{{cite journal
+| first1 = D.
-| last1 = Meany
+| title = High-dimensional quantum communication: Benefits, progress, and future challenges
-| first1 = T.
+| journal = Adv. Quantum Technol.
-| title = Laser written circuits for quantum photonics
+| volume = 2
-| journal = Laser & Photonics Reviews
+| issue = 12
-| volume = 9
+| article-no = 1900038
-| issue = 4
+| year = 2019
-| pages = 363–384
+| doi = 10.1002/qute.201900038
-| year = 2015
+}}</ref> Photonic qubits<ref name="03K" /> are more resistant to long-distance environmental interference. To date, photonic quantum teleportation has been successfully performed experimentally using different methods, including free-space and fiber.<ref name="170H" />
-| doi = 10.1002/lpor.201500061
-}}</ref>
+The first experimental validation of quantum teleportation relied on qubits encoded in the polarization of photons produced from a beta-barium borate (BBO) crystal in a free-space setup on an optical table.<ref name="20H">{{cite journal
-<ref name="66H">{{cite journal
+| last1 = Harrow
-| last1 = Sansoni
+| first1 = A. W.
-| first1 = L.
+| last2 = Montanaro
-| title = Two-particle bosonic-fermionic quantum walk via integrated photonics
+| first2 = A.
-| journal = Phys. Rev. Lett.
+| title = Quantum computational supremacy
-| volume = 108
+| journal = Nature
-| issue = 1
+| volume = 549
-| article-no = 010502
+| pages = 203
-| year = 2012
-| doi = 10.1103/physrevlett.108.010502
-}}</ref>
-<ref name="67H">{{cite journal
-| last1 = Crespi
-| first1 = A.
-| title = Anderson localization of entangled photons in an integrated quantum walk
-| journal = Nature Photonics
-| volume = 7
-| pages = 322–328
-| year = 2013
-| doi = 0.1038/nphoton.2013.26
-}}</ref>
-<ref name="68H">{{cite journal
-| last1 = Pitsios
-| first1 = I.
-| title = Photonic simulation of entanglement growth and engineering after a spin chain quench
-| journal = Nat. Commun.
-| volume = 8
-| issue = 1
-| article-no = 1569
 | year = 2017
-| doi = 10.1038/s41467-017-01589-y
+| doi = 10.1038/nature23458
+}}</ref> Later, the distance record for free-space teleportation was pushed beyond 1,400 km between the Micius satellite and a ground station,<ref name="171H">{{cite journal
+| last1 = Wei
+| first1 = Kejin
+| last2 = Li
+| first2 = Wei
+| display-authors =
+| title = High-Speed Measurement-Device-Independent Quantum Key Distribution with Integrated Silicon Photonics
+| journal = Physical Review X
+| volume = 10
+| article-number = 031030
+| year = 2020
+| doi = 10.1103/PhysRevX.10.031030
+}}</ref> thus providing the basis for a global quantum network. However, due to the issues of beam divergence, pointing, and collection of free-space teleportation, optical-fiber-based teleportation is considered more suitable for the establishment of cost-efficient quantum metropolitan networks. The current distance record for optical-fiber-based teleportation is 102 km.<ref name="172H">{{cite journal
+| last1 = Raussendorf
+| first1 = R.
+| title = A one-way quantum computer
+| journal = Phys. Rev. Lett.
+| volume = 86
+| pages = 5188–5191
+| year = 2001
+| doi = 10.1103/PhysRevLett.86.5188
 }}</ref>
-<ref name="69H">{{cite journal
-| last1 = Crespi
+A major issue related to photonic qubit teleportation involves the efficiency limit of Bell-state measurements (BSMs) using linear optics, with a 50% bound. To go around such a constraint, continuous variable optical modes can be used as a different solution to accomplish full deterministic teleportation. This technique was successfully experimented with on a 6-km fiber link,<ref name="173H">{{cite journal
-| first1 = A.
+| last1 = Raussendorf
-| title = Integrated photonic quantum gates for polarization qubits
+| first1 = R.
-| journal = Nat. Commun.
+| title = Measurement-based quantum computation on cluster states
-| volume = 2
+| journal = Phys. Rev. A
-| issue = 1
+| volume = 68
-| article-no = 566
+| article-no = 022312
-| year = 2011
+| year = 2003
-| doi = 10.1038/ncomms1570
+| doi = 10.1103/PhysRevA.68.022312
-}}</ref>
+}}</ref> but its fidelity needs to be enhanced because of its vulnerability to transmission losses. For non-photonic qubit technology, a distance of 21 m was attained in the case of atom traps.<ref name="174H">{{cite journal
-<ref name="70H">{{cite journal
+| last1 = Briegel
-| last1 = Corrielli
+| first1 = H.J.
-| first1 = G.
+| title = Measurement-based quantum computation
-| title = Rotated waveplates in integrated waveguide optics
+| journal = Nat. Phys.
-| journal = Nat. Commun.
 | volume = 5
 | issue = 1
-| article-no = 4249
+| pages = 19–26
-| year = 2014
+| year = 2009
-| doi = 10.1038/ncomms5249
+| doi = 10.1038/nphys1157
 }}</ref>
-<ref name="71H">{{cite journal
-| last1 = Tillmann
+With increasing momentum in quantum teleportation, another relevant technology is its integration. In future quantum networks, quantum teleportation chips could be integrated into fixed systems (e.g., network relays located in network nodes) or mobile systems (e.g., drones) to create lightweight and compact quantum nodes allowing remote access to quantum equipment for shared information as well as advanced computational power (Luo et al., Light: Science & Applications, 2023, 12:175). All this has become possible due to generation and manipulation of entangled photon pairs in multiple Degrees of Freedom on-chip, including path-encoded entanglement in Mach-Zehnder Interferometers (MZIs),<ref name="93H" /> polarization entanglement created in birefringent media,<ref name="177H">{{cite journal
-| first1 = M.
+| last1 = Rudolph
-| title = Experimental boson sampling
+| first1 = T.
-| journal = Nature Photon.
+| title = Why i am optimistic about the silicon-photonic route to quantum computing
-| volume = 7
+| journal = APL Photonics
-| issue = 7
+| volume = 2
-| pages = 540–544
+| issue = 3
-| year = 2013
+| article-no = 030901
-| doi = 10.1038/nphoton.2013.102
+| year = 2017
+| doi = 10.1063/1.4976737
+}}</ref> and time-bin entanglement in Franson interferometers.<ref name="178H">{{cite journal
+| last1 = Bourassa
+| first1 = J.E.
+| title = Blueprint for a Scalable Photonic Fault-Tolerant Quantum Computer
+| journal = Quantum
+| volume = 5
+| article-no = 392
+| year = 2021
+| doi = 10.22331/q-2021-02-04-392
 }}</ref>
-<ref name="72H">{{cite journal
-| last1 = Crespi
+The first telecom-based chip-scale teleportation used an off-chip photon source, showing the feasibility of a fidelity of 0.89 in a single chip system.<ref name="90H" /> The current advancement in integrated quantum photonics has also helped realize entanglement-based quantum communications beyond the chip level. The first entanglement distribution between chips incorporated all necessary components into monolithically integrated silicon photonic chips.<ref name="100H">{{cite journal
-| first1 = A.
+| last1 = Poot
-| title = Integrated multimode interferometers with arbitrary designs for photonic boson sampling
+| first1 = M.
-| journal = Nature Photon.
+| title = Design and characterization of integrated components for SiN photonic quantum circuits
-| volume = 7
+| journal = Opt. Express
+| volume = 24
 | issue = 7
-| pages = 545–548
+| pages = 6843–6860
-| year = 2013
+| year = 2016
-| doi = 10.1038/nphoton.2013.112
+| doi = 10.1364/OE.24.006843
-}}</ref>
+}}</ref> On-chip entangled Bell states were generated, and the qubit was transferred to the other silicon chip by encoding the on-chip path-encoded and in-fiber polarization states using two-dimensional grating couplers. Moreover, more advanced integrated quantum circuits implemented with on-chip sources have implemented inter-chip teleportation, showing a fidelity of 0.88.<ref name="44H">{{cite journal
-<ref name="73H">{{cite journal
+| last1 = Svalgaard
-| last1 = Bentivegna
-| first1 = M.
-| title = Experimental scattershot boson sampling
-| journal = Sci. Adv.
-| volume = 1
-| issue = 3
-| article-no = 1400255
-| year = 2015
-| doi = 10.1126/sciadv.1400255
-}}</ref>
-<ref name="74H">{{cite journal
-| last1 = Tillmann
 | first1 = M.
-| title = Generalized multiphoton quantum interference
+| title = Direct UV writing of buried singlemode channel waveguides in Ge-doped silica films
-| journal = Phys. Rev. X
+| journal = Electron. Lett.
-| volume = 5
+| volume = 30
-| article-no = 041015
+| issue = 17
-| year = 2015
+| pages = 1401–1403
-| doi = 10.1103/PhysRevX.5.041015
+| year = 1994
-}}</ref>
+| doi = 10.1049/el:19940935
-<ref name="75H">{{cite journal
+}}</ref> The chip-scale realization of photonic qubit creation, processing, and transmission provides one potential promising step toward the realization of the distributed quantum information processing Internet. In addition, entangled photon pairs in the visible and telecom bands have been created on a chip of silicon nitride (<math>Si_3N_4</math>) using a micro-ring resonator, with distribution over more than 20 km, using precisely designed and fabricated micro-ring resonators, entangling photons in the visible range, which can be coupled with quantum memories, and in the telecom range, with lower attenuation in the transmission of the photons over the fibers.<ref name="71H" />
-| last1 = Spagnolo
-| first1 = N.
+====Quantum Information Processing and Computing====
-| title = Threephoton bosonic coalescence in an integrated tritter
+Beam splitters are the fundamental building blocks for Linear Optical Quantum Computing (LOQC).
-| journal = Nature Commun.
-| volume = 4
+* The KLM Protocol: Beam splitters facilitate the probabilistic entangling gates necessary for universal quantum computation using only linear elements. The original CNOT gate in this protocol operates with a success probability of <small><math>\frac{1}{16}</math></small>. <ref name="ML03" />
-| article-no = 1606
-| year = 2013
+* Waveguide Lattices: Integrated arrays of beam splitters allow for the simulation of quantum walks and complex multi-photon interference patterns. <ref name="15E" /><ref name="16E" />
-| doi = 10.1038/ncomms2616
+===Quantum Photonic Chips for Quantum Communication and Internet===
+The smallest optical beam splitters are typically found in advanced research within nanophotonics, plasmonics, and integrated optics<ref name="34G" />, where devices are miniaturized for applications like photonic computing<ref name="09E" />, optical communications, and quantum technologies<ref name="16E" />. These are far smaller than commercial or conventional beam splitters (which often measure millimeters to centimeters)<ref name="29E">Thorlabs 50:50 (R:T) non‑polarizing beamsplitter cube. Example product: BS005, 700‑1100&nbsp;nm. Manufacturer page: <a href="https://www.thorlabs.com/thorproduct.cfm?partnumber=BS005">https://www.thorlabs.com/thorproduct.cfm?partnumber=BS005</a>.</ref>.
+====Photonic Beam Splitters====
+An example is a silicon-based photonic polarizing beam splitter developed by researchers at the University of Utah. It measures just 2.4 × 2.4 microns (μm) in footprint, making it one of the smallest low-loss all-dielectric designs<ref name="17E" />. This device splits incoming light into two separate polarized channels and was designed to enable light-speed computing by replacing electrons with photons<ref name="06E" />. It was published in 2015 and claimed as the world's smallest at the time.<ref name="18E" />
+====Plasmonic Beam Splitters====
+Plasmonic designs, which use surface plasmon polaritons (waves at metal-dielectric interfaces) to manipulate light, can be even smaller due to sub-wavelength confinement, though they often have higher losses<ref name="30E">{{cite journal
+ | last1 = Huang
+ | first1 = W.-P.
+ | title = Coupled-mode theory for optical waveguides: an overview
+ | journal = J. Opt. Soc. Am. A
+ | volume = 11
+ | pages = 963–983
+ | year = 1994
+ | doi = 10.1364/JOSAA.11.000963
+}}</ref>.
+One ultracompact plasmonic polarizing beam splitter on a silicon-on-insulator (SOI) platform has a coupling region of 1.1 μm in length and 50 nanometers (nm) in width. The overall footprint is approximately 1.1 × 0.95 μm (accounting for the waveguides), resulting in an area of about 1 μm². This was reported in 2013 and leverages silver cylinders sandwiched between silicon waveguides for splitting polarized light.<ref name="82G">{{cite journal
+| last1 = Ma
+| first1 = Y. J.
+| title = Symmetrical polarization splitter/rotator design and application in a polarization insensitive WDM receiver
+| journal = Opt. Express
+| volume = 23
+| pages = 16052–16062
+| year = 2015
+| doi = 10.1364/OE.23.016052
 }}</ref>
-<ref name="76H">{{cite journal
+Other plasmonic variants, such as those based on nanoslits or bent directional couplers, have dimensions ranging from hundreds of nm to a few μm, with some coupling lengths as short as 0.9–8.9 μm in more recent designs (e.g., from 2020–2023 papers on slot waveguides or photonic crystals).<ref name="35G" />
-| last1 = Crespi
-| first1 = A.
+====Metasurface-Based Beam Splitters====
-| title = Suppression law of quantum states in a 3d photonic fast fourier transform chip
+Metasurfaces (ultra-thin engineered arrays of nano-antennas) offer nanoscale thickness, often 50–200 nm, while lateral dimensions can be a few μm to tens of μm to handle the beam. These are among the thinnest possible, enabling flat optics for beam splitting with arbitrary ratios or angles<ref name="52E" />. A 2018 example uses gradient metasurfaces for nanoscale thickness, though specific lateral sizes vary by design (typically 5–10 μm across for efficient operation).<ref name="52G" />
-| journal = Nat. Commun.
-| volume = 7
+These nanoscale beam splitters are fabricated using techniques like electron-beam lithography and are integrated on chips<ref name="15G">{{cite journal
+| last1 = Dynes
+| first1 = J. F.
+| title = Cambridge quantum network
+| journal = npj Quantum Inf.
+| volume = 5
+| article-no = 101
+| year = 2019
+| doi = 10.1038/s41534-019-0231-5
+}}</ref>, making them orders of magnitude smaller than traditional glass cubes or plates<ref name="AluSplit" />. Recent developments (post-2020) focus on reducing losses, broadening bandwidth, and integrating with materials like lithium niobate or silicon nitride<ref name="77G">{{cite journal
+| last1 = Saravi
+| first1 = S.
+| last2 = Pertsch
+| first2 = T.
+| last3 = Setzpfandt
+| first3 = F.
+| title = Lithium niobate on insulator: an emerging platform for integrated quantum photonics
+| journal = Adv. Opt. Mater.
+| volume = 9
+| article-no = 2100789
+| year = 2021
+| doi = 10.1002/adom.202100789
+}}</ref>, but no widely reported designs have broken below ~1 μm in key dimensions while maintaining functionality<ref name="19E" />. If you're interested in a specific type (e.g., for visible light, IR, or quantum applications), more details could narrow it down further<ref name="27E" />.
+===Quantum communication===
+which applies the principles of quantum mechanics for quantum information transmission, enables fundamental improvements to security, computing, sensing, and metrology. This realm encapsulates a vast variety of technologies and applications ranging from state-of-the-art laboratory experiments to commercial reality. The best-known example is quantum key distribution (QKD)<ref name="01G"/><ref name="02G">{{cite journal
+| last1 = Bennett
+| first1 = C. H.
+| last2 = Bessette
+| first2 = F.
+| last3 = Brassard
+| first3 = G.
+| last4 = Salvail
+| first4 = L.
+| last5 = Smolin
+| first5 = J.
+| title = Experimental quantum cryptography
+| journal = J. Cryptol.
+| volume = 5
 | issue = 1
-| article-no = 10469
+| pages = 3–28
-| year = 2016
+| year = 1992
-| doi = 10.1038/ncomms10469
+| doi = 10.1007/BF00191318
-}}</ref>
+}}</ref>. The basic idea of QKD is to use the quantum states of photons to share secret keys between two distant parties. The quantum no-cloning theorem endows the two communicating users with the ability to detect any eavesdropper trying to gain knowledge of the key<ref name="03G">{{cite journal
-<ref name="77H">{{cite journal
+| last1 = Shor
-| last1 = Viggianiello
+| first1 = P. W.
+| last2 = Preskill
+| first2 = J.
+| title = Simple proof of security of the BB84 quantum key distribution protocol
+| journal = Phys. Rev. Lett.
+| volume = 85
+| issue = 2
+| pages = 441–444
+| year = 2000
+| doi = 10.1103/PhysRevLett.85.441
+}}</ref><ref name="04G">{{cite journal
+| last1 = Gisin
 | first1 = N.
-| title = Experimental generalized quantum suppression law in sylvester interferometers
+| last2 = Ribordy
-| journal = New J. Phys.
+| first2 = G.
-| volume = 20
+| last3 = Tittel
-| issue = 3
+| first3 = W.
-| article-no = 033017
+| last4 = Zbinden
-| year = 2018
+| first4 = H.
-| doi = 10.1088/1367-2630/aaad92
+| title = Quantum cryptography
-}}</ref>
+| journal = Rev. Mod. Phys.
-<ref name="78H">{{cite journal
+| volume = 74
-| last1 = Poulios
+| issue = 1
-| first1 = K.
+| pages = 145–195
-| title = Quantum walks of correlated photon pairs in two-dimensional waveguide arrays
+| year = 2002
-| journal = Phys. Rev. Lett.
+| doi = 10.1103/RevModPhys.74.145
-| volume = 112
+}}</ref>. Since security is based on the laws of quantum physics rather than computational complexity, QKD is recognized as a desired solution to address the ever-increasing threat raised by emergent quantum computing hardware and algorithms.
-| article-no = 143604
-| year = 2014
+Despite the controversy surrounding its practical security, QKD is leading the way to real-world applications<ref name="05G"/>. For example, fiber-based and satellite-to-ground QKD experiments have been demonstrated over 800 km in ultra-low-loss optical fiber<ref name="06G">{{cite journal
-| doi = 10.1103/PhysRevLett.112.143604
+| last1 = Wang
-}}</ref>
+| first1 = S.
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+| last2 = Yin
-| last1 = Preiss
+| first2 = Z.-Q.
-| first1 = P.M.
+| last3 = He
-| title = Strongly correlated quantum walks in optical lattices
+| first3 = D.-Y.
-| journal = Science
+| title = Twin-field quantum key distribution over 830-km fibre
-| volume = 347
+| journal = Nat. Photonics
-| issue = 6227
+| volume = 16
-| pages = 1229–1233
+| issue = 2
-| year = 2015
+| pages = 154–161
-| doi = 10.1126/science.1260364
-}}</ref>
-<ref name="80H">{{cite journal
-| last1 = Caruso
-| first1 = F.
-| title = Fast escape of a quantum walker from an integrated photonic maze
-| journal = Nat. Commun.
-| volume = 7
-| article-no = 11682
-| year = 2016
-| doi = 10.1038/ncomms11682
-}}</ref>
-<ref name="81H">{{cite journal
-| last1 = Jiao
-| first1 = Z.-Q.
-| title = Two-Dimensional Quantum Walk of Correlated Photons
-| journal = arxiv
-| year = 2020
-| doi = abs/2007.06554
-}}</ref>
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-| last1 = Tang
-| first1 = H.
-| title = Generating haar-uniform randomness using stochastic quantum walks on a photonic chip
-| journal = Phys. Rev. Lett.
-| volume = 128
-| article-no = 050503
 | year = 2022
-| doi = 10.1103/PhysRevLett.128.050503
+| doi = 10.1038/s41566-021-00928-2
-}}</ref>
+}}</ref> and 2000 km in free space<ref name="07G">{{cite journal
-<ref name="83H">{{cite journal
+| last1 = Chen
-| last1 = Flamini
+| first1 = Y.-A.
-| first1 = F.
+| last2 = Zhang
-| title = Thermally reconfigurable quantum photonic circuits at telecom wavelength by femtosecond laser micromachining
+| first2 = Q.
-| journal = Light: Science & Applications
+| last3 = Chen
-| volume = 4
+| first3 = T.-Y.
-| article-no = 354
+| title = An integrated space-to-ground quantum communication network over 4,600 kilometres
-| year = 2015
+| journal = Nature
-| doi = 10.1038/lsa.2015.127
+| volume = 589
-}}</ref>
+| issue = 7841
-<ref name="84H">{{cite journal
+| pages = 214–219
-| last1 = Polino
+| year = 2021
-| first1 = E.
+| doi = 10.1038/s41586-020-03093-8
-| title = Experimental multiphase estimation on a chip
+}}</ref>, respectively. The maximal secure key rate for a single channel has been pushed to more than 110 Mbit/s<ref name="08G">{{cite journal
-| journal = Optica
+| last1 = Li
-| volume = 6
+| first1 = W.
-| issue = 3
+| last2 = Zhang
-| pages = 288–295
+| first2 = L.
-| year = 2019
+| last3 = Tan
-| doi = 10.1364/OPTICA.6.000288
+| first3 = H.
-}}</ref>
+| title = High-rate quantum key distribution exceeding 110 Mb s–1
-<ref name="85H">{{cite journal
+| journal = Nat. Photonics
-| last1 = Antón
+| volume = 17
-| first1 = C.
+| issue = 5
-| title = Interfacing scalable photonic platforms: solid-state based multi-photon interference in a reconfigurable glass chip
+| pages = 416–421
-| journal = Optica
+| year = 2023
-| volume = 6
+| doi = 10.1038/s41566-023-01166-4
-| issue = 12
+}}</ref>. A number of field-test QKD networks have been established in Europe<ref name="09G">{{cite journal
-| pages = 1471–1477
+| last1 = Peev
-| year = 2019
+| first1 = M.
-| doi = 10.1364/OPTICA.6.001471
+| title = The SECOQC quantum key distribution network in Vienna
-}}</ref>
+| journal = N. J. Phys.
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+| volume = 11
-| last1 = Pont
+| issue = 7
+| article-no = 075001
+| year = 2009
+| doi = 10.1088/1367-2630/11/7/075001
+}}</ref><ref name="10G">{{cite journal
+| last1 = Stucki
+| first1 = D.
+| title = Long-term performance of the SwissQuantum quantum key distribution network in a field environment
+| journal = N. J. Phys.
+| volume = 13
+| issue = 12
+| article-no = 123001
+| year = 2011
+| doi = 10.1088/1367-2630/13/12/123001
+}}</ref><ref name="11G">{{cite journal
+| last1 = Avesani
 | first1 = M.
-| title = Quantifying n-photon indistinguishability with a cyclic integrated interferometer
+| title = Deployment-ready quantum key distribution over a classical network infrastructure in Padua
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+| journal = J. Lightwave Technol.
-| volume = 12
+| volume = 40
-| article-no = 031033
+| pages = 1658–1663
 | year = 2022
-| doi = 10.1103/PhysRevX.12.031033
+| doi = 10.1109/JLT.2021.3130447
-}}</ref>
+}}</ref>, Japan<ref name="12G">{{cite journal
-<ref name="87H">{{cite journal
+| last1 = Sasaki
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+| first1 = M.
-| first1 = F.
+| title = Field test of quantum key distribution in the Tokyo QKD network
-| title = Reconfigurable continuously-coupled 3d photonic circuit for boson sampling experiments
+| journal = Opt. Express
-| journal = npj Quantum Information
+| volume = 19
-| volume = 8
+| pages = 10387–10409
-| issue = 1
+| year = 2011
-| article-no = 55
+| doi = 10.1364/OE.19.010387
-| year = 2022
+}}</ref>, China<ref name="13G">{{cite journal
-| doi = 10.1038/s41534-022-00568-6
+| last1 = Chen
-}}</ref>
+| first1 = T. Y.
-<ref name="88H">{{cite journal
+| title = Field test of a practical secure communication network with decoy-state quantum cryptography
-| last1 = Atzeni
+| journal = Opt. Express
+| volume = 17
+| pages = 6540–6549
+| year = 2009
+| doi = 10.1364/OE.17.006540
+}}</ref><ref name="14G">{{cite journal
+| last1 = Wang
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-| title = Integrated sources of entangled photons at the telecomwavelength in femtosecond-laserwritten circuits
+| title = Field and long-term demonstration of a wide area quantum key distribution network
-| journal = Optica
+| journal = Opt. Express
-| volume = 5
+| volume = 22
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+| pages = 21739–21756
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+| year = 2014
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+| doi = 10.1364/OE.22.021739
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+}}</ref>, UK<ref name="15G"/>, and so forth. Furthermore, the security of practical QKD systems was intensively studied to overcome the current technical limitations<ref name="05G"/><ref name="16G">{{cite journal
-}}</ref>
+| last1 = Scarani
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+| first1 = V.
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+| title = The security of practical quantum key distribution
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+| journal = Rev. Mod. Phys.
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+| volume = 81
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+| pages = 1301–1350
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+| year = 2009
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+| doi = 10.1103/RevModPhys.81.1301
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+}}</ref><ref name="17G">{{cite journal
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+}}</ref>. Post-quantum cryptography has been combined with QKD to achieve short-term security of authentication and long-term security of keys<ref name="18G">{{cite journal
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+| journal = npj Quantum Inf.
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+| volume = 7
+| article-no = 67
+| year = 2021
+| doi = 10.1038/s41534-021-00409-2
+}}</ref>.
+===Quantum Communication and Cryptography===
+Beam splitters are used to distribute entanglement across networks, enabling secure information transfer.
+* Quantum Key Distribution (QKD): Critical for implementing protocols that detect eavesdropping through signal splitting and interference. <ref name="34E" /><ref name="35E" />
+* Quantum Repeaters: Used in Bell-state measurements (BSM) to perform entanglement swapping, extending the range of quantum communication. <ref name="51E" />
+* Teleportation: A beam splitter is used to perform the joint measurement required to transfer a quantum state <math>|\psi\rangle</math> between distant nodes. <ref name="38E" /><ref name="39E" />
+====Quantum Metrology and Sensing====
+By creating path-entangled states, such as N00N states of the form <math>(|N,0\rangle + |0,N\rangle)/\sqrt{2}</math>, beam splitters allow sensors to surpass the Standard Quantum Limit.
+* Heisenberg-Limit Sensing: Utilizing quantum interference to achieve a phase sensitivity <math>\Delta\phi</math> that scales with <math>1/N</math> rather than the classical <math>1/\sqrt{N}</math>. <ref name="48E" /><ref name="49E" /><ref name="50E" />
+* Beam splitter interference in HOM setups enhances metrological precision in quantum kernel methods for feature space analysis.<ref name="24L"/><ref name="33L"/>
-<ref name="92H">{{cite journal
+====Characterization and Foundations====
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+To verify the performance of these applications, measures and tests are employed:
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+* Entanglement Measures: The quality of the generated states is quantified using Concurrence and Entropy of Formation. <ref name="45E" /><ref name="46E" />
+* Foundational Tests: Beam splitters provide the platform for Bell test violations and studies of decoherence in open quantum systems. <ref name="36E" /><ref name="37E" />
-<ref name="98H">{{cite journal
+====Integrated Photonics====
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+Implementations focusing at on-chip integration using waveguide architectures. An improvement is the use of dibenzoterrylene (DBT) molecules in an anthracene matrix, which has enabled the on-chip integration of independent channels with high-visibility, indistinguishable single photons. <ref name="46K">{{cite arxiv
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+ | year = 2025
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-</div>
-<!------------------>
-Theory for the beam splitter (BS)  in quantum optics, quantum entanglement of photons and their statistics, the HOM effect, is well developed and based on fairly simple mathematical and physical foundations. This theory has been developed for any type of BS and is based on the constancy of the reflection coefficients R (or the transmission coefficient, where R + T = 1) and the phase shift ϕ. The constancy of these coefficients cannot always be satisfied for a waveguide BS, where R and ϕ depend in a special way on photon frequencies. Based on this, the concept of BS systematizes in quantum optics into "Conventional" and frequency-dependent BS, and also confirms the theory of such BS.The quantum entanglement, photon statistics at the output ports, and the Hong-Ou-Mandel (HOM) effect for such BS can be very different. Taking into account the fact that the waveguide BS is currently acquiring an important role in quantum technologies due to the possibility of its miniaturization, this article will be useful not only for theoreticians, but also for experimenters.
-{{Infobox
-| title        = Beam splitter
-| name         = Beam splitter
-| image        =
-| caption      = Diagram of entangled photon generation: A pump beam induces type-I spontaneous parametric down-conversion (SPDC) in a nonlinear crystal, producing a polarization-entangled photon pair (signal and idler modes). The pair is input to a 50:50 beam splitter,[https://www.thorlabs.com/non-polarizing-cube-beamsplitters-700---1100-nm?tabName=Overview 700-1100nm]creating path-entangled output modes for quantum experiments like Bell tests.
-| headerstyle  = background:#e0f0ff;
-| labelstyle   = background:#f0f8ff; width: 43%;
-| bodystyle    = width: 24em;
-| label1       = Other names
-| data1        = BS, directional coupler (in waveguide form)
-| label2       = Primary uses
-| data2        = [[Wikipedia:Quantum superposition|Quantum superposition]] · [[Wikipedia:Optical cluster state#Polarization encoding|Entanglement generation]] · [[Wikipedia:Photon statistics|Photon statistics]] · [[Wikipedia:Hong–Ou–Mandel effect|Hong–Ou–Mandel interferometry]] · [[Wikipedia:Linear optical quantum computing|Linear-optical quantum computing]] · [[Wikipedia:Quantum metrology|Quantum metrology]] · [[Wikipedia:Quantum channel|Quantum communication]]
-}}
-</div>
-<div style="width:300px;">
-[[File:Quantum_beam_splitter_interference_yellow1.jpg|thumb|280px|Quantum optics beam splitter experiments.]]
-</div>
-</div>
-===Introduction to the beam splitter in quantum optics===
-Historical developments in beam splitting range from '''Fizeau’s 1851'''<ref name="Fizeau1851" /> interference measurements to the development of the '''Michelson interferometer'''. The transition to the quantum regime occurred in 1987 with the first experimental demonstration of the HOM effect.<ref name="04E" /> The [[Wikipedia:KLM protocol|KLM protocol]](2001) demonstrated that universal linear optical quantum computing is possible by using only beam splitters, phase shifters, and single-photon detectors.It uses a process called Measurement-Induced Nonlinearity.<ref name="ML03" /><ref name="06E" />
-== Recent years ==
-Have witnessed significant progress in quantum communication and quantum internet with the emerging quantum photonic chips, whose characteristics of scalability, stability, and low cost, open up new possibilities in miniaturized essentials. This provides an overview of the advances in quantum photonic chips for quantum communication, beginning with a summary of the prevalent photonic integrated fabrication platforms and key components for integrated quantum communication systems. Then discusses a range of quantum communication applications, such as quantum key distribution and quantum teleportation. Finally, the review culminates with a perspective on challenges towards high-performance chip-based quantum communication, as well as a glimpse into future opportunities for integrated quantum networks. Recent advancements in '''integrated quantum photonics''' focus on on-chip beam splitters fabricated on silicon, silicon nitride, and femtosecond-laser-written waveguides. These platforms enable high-fidelity interference (visibilities <math>0.97</math>), even when utilizing independent molecular single-photon sources<ref name="01K" /><ref name="02K" /><ref name="64K" /> important for the scalability of the [[Wikipedia:Quantum network|quantum internet]].<ref name="22G" /><ref name="23G" />
-===='''Keywords''':====
-[[Wikipedia:Beam splitter|Beam splitter]], [[Wikipedia:Photonic integrated circuit|Integrated photonics]], [[Physics:Quantum information theory|Quantum information]],[[Wikipedia:waveguide beam splitter|waveguide beam splitter]], [[Wikipedia::quantum entanglement|quantum entanglement]], [[Wikipedia:photons|photons]], [[Wikipedia:reflection coefficient|reflection coefficient]], [[Wikipedia:phase shift|phase shift]], [[Wikipedia:photon statistics|photon statistics]], [[Wikipedia:Hong-Ou-Mandel effect|Hong-Ou-Mandel effect]].
-===Quantum optical classifier===
-Superexponential speedup classification is a central task in [[Wikipedia:Neural network (machine learning)|deep learning]] algorithms. Usually, images are first captured and then processed by a sequence of operations, of which the [[Wikipedia:Artificial neuron|artificial neuron]] represents one of the fundamental units. This paradigm requires significant resources that scale (at least) linearly in the image resolution, both in terms of photons and computational operations. Present is a [[Wikipedia:Quantum neural network|quantum optical pattern recognition]] method for [[Wikipedia:Binary classification|binary classification]] tasks. It classifies objects without reconstructing their images, using the rate of [[Wikipedia:Hong–Ou–Mandel effect|two-photon coincidences]] at the output of a Hong-Ou-Mandel [[Wikipedia:Interferometry|interferometer]], where both the input and the classifier parameters are encoded into single-photon states. This method exhibits the behaviour of a classical neuron of unit depth. Once trained, it shows a constant <math>\mathcal{O}(1)</math> complexity in the number of computational operations and photons required by a single classification. This is a superexponential advantage over a classical artificial neuron.
-===On-chip integration===
-Of independent channels of indistinguishable single photons is a prerequisite for scalable [[Wikipedia:Linear optical quantum computing|optical quantum information processing]]. This requires separate solid-state single-photon emitters to exhibit identical lifetime-limited transitions. This challenging task is usually further exacerbated by spectral diffusion due to complex charge noise near material surfaces made by nanofabrication processes. A molecular [[Wikipedia:Integrated quantum photonics|quantum photonic chip]] that demonstrate on-chip Hong–Ou–Mandel quantum interference of indistinguishable single photons from independent molecules is developed. The molecules are embedded in a single-crystalline organic nanosheet and integrated with single-mode waveguides without nanofabrication, thereby ensuring stable, lifetime-limited transitions. With the aid of Stark tuning, 100 waveguide-coupled molecules can be tuned to the same frequency and achieve on-chip Hong–Ou–Mandel interference visibilities exceeding 0.97 for 2 molecules separately coupled to 2 waveguides. For two molecules with a controlled frequency difference, over 100-µs-long quantum beating in the interference, showing both excellent single-photon purity (particle nature) and long coherence (wave nature) of the emission.The results show a possible strategy towards constructing scalable optical universal quantum processors and a promising platform for studying waveguide quantum electrodynamics with identical single emitters wired via photonic circuits.
-===Integrated Photonics in Quantum Technologies===
-Integrated photonics in quantum technologies <ref name="01H" /><ref name="02H" />. The advantages of single-photon state encoding are several and include the lack of decoherence phenomena, the possibility to realize information processing at room temperature and to send photons through fibers and free space channels. In the last ten years, improvements in photonic quantum technologies enabled an increase in the complexity of the implemented system, supporting relevant advances in various branches of quantum information, including the demonstration of quantum advantage <ref name="03H" /><ref name="04H" /><ref name="05H" /> and satellite quantum communications <ref name="06H" /><ref name="07H" />.<br>
-Indistinguishable single photons are a fundamental resource for optical quantum technologies<ref name="01K"/><ref name="02K"/><ref name="03K"/>, underpinning universal quantum computing, quantum simulation and quantum networks. Although recent demonstrations of some preliminary quantum photonic applications primarily rely on parametric-process-based single-photon sources<ref name="04K"/><ref name="05K"/>, deterministic sources offer greater future promise<ref name="02K"/><ref name="06K"/><ref name="07K"/><ref name="08K"/><ref name="09K"/>. Solid-state single-quantum emitters, such as quantum dots<ref name="02K"/><ref name="09K"/>, colour centres<ref name="10K"/><ref name="11K"/><ref name="12K"/><ref name="13K"/> and organic molecules<ref name="14K"/><ref name="15K"/>, could serve as a versatile platform
-==Overview==
-[[File:Quantum teleportation video.ogg|thumb|upright=1.0|Video depicting the quantum teleportation protocol. The goal is to send a quantum state Q from one station, A, to another station, B. At first, a pair of entangled particles is distributed to A and B, which pair is shown as two particles connected by a wavy line and produced by source S. Once this preparation step is finished, the quantum teleportation itself begins. Station A measures its entangled particle together with the particle in state Q and obtains one of four possible results. These results are represented by different positions of an arrow in a "clock". The result is communicated to station B via the classical channel, represented as "radio waves". Based on the received message, station B chooses an appropriate device and applies it to its particle. In the video, the specific result measured by A is represented by an arrow pointing to the bottom right corner and so station B applies the bottom-right device. After the particle leaves the device, its state is Q, which is equal to the original state of the particle at station A. This way, the quantum teleportation of state Q is successfully completed.]]
-Quantum states of light are basic resources for the realization of quantum information processing tasks, starting from pioneering experiments of quantum non-locality and [[Wikipedia:Quantum teleportation|quantum teleportation]]<ref name="20G" /><ref name="21G" /> and extending to modern quantum communication and computation efforts. The transition from bulk optics to integrated photonic circuits has been essential for scaling these technologies, enabling the miniaturization of complex [[Wikipedia:Interferometry|interferometric networks]] on a single chip. The advantages of single-photon encoding include resistance to decoherence effects, the possibility of operation in an ambient temperature environment, and the ability to transfer photons via an optical fiber as well as free space communication links. The last decade has marked a growing complexity of photonic quantum technology efforts that have made possible the enhancement of quantum advantage experiments<ref name="02H" /><ref name="03H" /><ref name="04H" /> and quantum communication via satellites <ref name="05H" /><ref name="06H" />
-An essential enabling technology in these advances is the coupling of photonic device components supporting the generation, manipulation, and detection of quantum states <ref name="07H" /><ref name="08H" /><ref name="09H" />. On-chip integration of independent channels of indistinguishable single photons is a prerequisite for scalable optical quantum information processing. Integrated photonics enables the realization of waveguides and reconfigurable optical components, which in turn make possible multi-port reprogrammable optical networks, and most recently, integrated processors merging both quantum state preparation and quantum processing.  A molecular quantum photonic chip has been developed, demonstrating on-chip Hong–Ou–Mandel quantum interference of indistinguishable single photons emitted from independent molecules..This requires separate solid-state single-photon emitters to exhibit identical lifetime-limited transitions.While the integration of single-photon detectors is still a challenge, some very promising advances have been made in recent years towards fully integrated photonic platforms. Compared to conventional discrete optical platforms, which demand a very careful alignment of discrete components, experience stability problems, and face cost scalability, quantum photonic chips on a microchip offer advantages in miniaturization, scalability, stability, and potentially low cost mass production. In this sense, quantum photonic chips constitute a highly promising platform for applied quantum communication, specifically in quantum key distribution (QKD), quantum secure direct communication, quantum teleportation<ref name="89H" /><ref name="50H" /> , and, in general, in quantum networks.
-Of all the necessary components of an integrated photonic circuit, beam splitter (BS) is an integral part of it. The theoretical foundations of BS in quantum optics and its relation to photon statistics, entanglement, and other phenomena like Hong-Ou-Mandel effect have long been established. The recent theoretical interest has particularly underscored how waveguide BSs can differ in terms of reflection and transmission coefficients for different frequencies, going against the conventional way of designing a beam splitter. As waveguide BSs play a vital role in designing scaled-down and scalable quantum optical components, a thorough understanding of both conventional and frequency-dependent beam splitters is necessary for carrying out experiments in integrated quantum communication.<br>[https://lab.quantumflytrap.com/lab/quantum-teleportation?mode=waves An interactive simulation of quantum teleportation in the Virtual Lab by Quantum Flytrap,]
-== History ==
-[[File:Table of Opticks, Cyclopaedia, Volume 2.jpg|thumb|1728 Cyclopeadia. Drawings of optical equipment]]
-====Key milestones:====
-* 1851: The Fizeau experiment to measure the speeds of light in water. The Fizeau experiment, conducted by French physicist Hippolyte Fizeau (1819–1896), was a test to determine how the motion of a medium (water) affects the speed of light propagating through it. This was not a direct measurement of the absolute speed of light in stationary water (that had been approximated earlier), but rather an investigation into the relative speeds of light traveling with and against the flow of moving water.<ref name="Fizeau1851" /><br>
-* '''1965''': Angular momentum theory applied to optical fields, foundational for BS symmetries.<ref name="28E" /><br>
-* '''1966''': Density operators for coherent fields at BS, enabling statistical analysis.<ref name="26E" /><br>
-* '''1981''': General properties of lossless BS in interferometry.<ref name="18E" /><br>
-* '''1987''': Experimental observation of HOM effect, demonstrating two-photon bunching and quantum interference.<ref name="04E" /><br>
-* '''1989''': SU(2) symmetry and photon statistics for lossless BS.<ref name="19E" /><br>
-* '''1995''': Unitary quantum description of BS.<ref name="27E" /><br>
-* '''2001''': KLM protocol for efficient quantum computation with linear optics, establishing scalability using beam splitters, single-photon sources, and detectors.<ref name="06E" /><ref name="ML03" /><br>
-* '''2002''': Demonstration that nonclassical inputs are required for BS-generated entanglement.<ref name="20E" /><br>
-* '''2008''': Silica-on-silicon waveguide quantum circuits, advancing integrated photonic implementations of BS.<ref name="15E" /><br>
-* '''2018–2020''': Theoretical models of frequency-dependent effects in waveguide BS, including fluctuations in HOM detection.<ref name="24E" /><ref name="25E" /><br>
-* '''2020–2021''': Quantum entanglement and reflection coefficients in coupled waveguide BS models; frequency-dependent theory for waveguide BS.<ref name="17E" /><ref name="21E" /><ref name="22E" /><br>
-* '''2022''': Quantum entanglement for monochromatic and non-monochromatic photons on waveguide BS; comprehensive review systematizing conventional vs. frequency-dependent BS.<ref name="23E" /><br>
-This timeline highlights the historical development from foundational quantum formulas to the recognition of frequency-dependent effects in waveguide implementations, which are important for scalable quantum technologies.
-[[File:Timeline Integration Quantum Optics Technology.png|center|Summary of the features of the principal fabrication technologies for what concerns the operating wavelengths, circuits geometry, integration of sources and detectors, and the interface with external fibers.]]
-== Theoretical Framework ==
-In quantum optics, the mathematical description of a beam splitter describes how the incoming annihilation operators <math>\hat{a}_1</math> and <math>\hat{a}_2</math> are transformed into the outgoing operators <math>\hat{b}_1</math> and <math>\hat{b}_2</math> by means of a unitary matrix. For a traditional beam splitter, this transformation can be written as
-<math> \begin{pmatrix} \hat{b}_1 \\ \hat{b}_2 \end{pmatrix} = U_{\text{BS}} \begin{pmatrix} \hat{a}_1 \\ \hat{a}_2 \end{pmatrix}, </math>
-where the unitary matrix is given by
-<math> U_{\text{BS}} = \begin{pmatrix} \sqrt{T}\, e^{i\phi} & \sqrt{R} \\ -\sqrt{R}\, e^{-i\phi} & \sqrt{T} \end{pmatrix}. </math>
-In these expressions, <math>T</math>, <math>R</math>, and <math>\phi</math> represent the transmission coefficient, reflection coefficient, and relative phase, respectively. The unitary nature of <math>U_{\text{BS}}</math> guarantees that bosonic commutation relations are preserved.
-In the angular-momentum representation, the action of the beam splitter corresponds to an SU(2) rotation generated by angular momentum operators <math>\hat{L}_i</math>. The associated rotation angles are determined by the reflectivity <math>R</math> and the phase <math>\phi</math>.
-For non-monochromatic light, the spectral degrees of freedom must also be taken into account. In this case, the output quantum state depends on the joint spectral amplitude function <math>\varphi(\omega_1,\omega_2)</math>, which must be integrated over the relevant frequency variables.
-Frequency-dependent beam splitters, commonly encountered in waveguide couplers, can be derived using coupled-mode theory. Within this framework, both the reflection coefficient <math>R</math> and the phase <math>\phi</math> depend explicitly on the frequencies <math>\omega_1</math> and <math>\omega_2</math>. A representative expression for the reflection coefficient is
-<math> R = \sin^2\!\left( \frac{\Omega\, t_{\text{BS}}}{2\sqrt{1+\varepsilon^2}} \right)\,(1+\varepsilon^2), </math>
-where
-<math> \varepsilon = \frac{\omega_2 - \omega_1}{\Omega}, </math>
-<math>\Omega</math> characterizes the coupling strength between the modes, and <math>t_{\text{BS}}</math> denotes the effective interaction time.
-This spectral dependence significantly influences quantum interference and entanglement properties. To observe genuinely quantum effects, non-classical input states such as Fock states or squeezed states are required. Measures of entanglement, including concurrence, decrease when the spectral overlap between modes is limited.
-Photon-number statistics also depend on both the input state and the spectral structure. Coherent states exhibit Poissonian statistics, whereas non-classical states can display sub-Poissonian or super-Poissonian behavior. In multimode fields, frequency selectivity can lead to partial photon bunching.
-A prominent example of such interference phenomena is the Hong–Ou–Mandel (HOM) effect, in which two identical photons incident on a beam splitter tend to bunch together, resulting in suppressed coincidence counts. When the beam splitter is frequency dependent, spectral variations reduce the visibility of the Hong–Ou–Mandel dip. Generalizations of this effect include formulations based on wave packets as well as analogous interference phenomena involving fermions.
-==The beam splitter==
-Dates to classical interferometry in the 19th century (e.g., [[Wikipedia:Michelson interferometer|Michelson interferometer]]). Quantum applications emerged mid-20th century with quantum electrodynamics and lasers, The Hong-Ou-Mandel effect first demonstrated in 1987<ref name="04E" /> <ref name="55E" /><ref name="58E" /><ref name="63E" />. Entanglement by a beam splitter (2002) <ref name="20E" /> . Quantum entanglement and reflection coefficient for coupled harmonic oscillators (2020)<ref name="21E" />. Quantum entanglement and statistics of photons on a beam splitter in the form of coupled waveguides (2022) <ref name="22E" />.<br>Beam Splitters (BS) have a variety of forms, such as a glass plate with a coat of silver or a thin dielectric film, a glass prism with a coat along its diagonal, two parallel glass plates with a coat in between, or a thin film with a deposited coat. Waveguide BSs are formed by bringing two waveguides side by side so that their electromagnetic fields interact with each other<ref name="06E"/>.
-====Beam splitters vary by design and frequency dependence.<ref name="34E" /><ref name="35E" />====
-'''Waveguide BS (directional couplers)''': <br>
-[[Wikipedia:Evanescent field|Evanescent coupling]] between waveguides, ''R(ω) = sin²(κ(ω)L)''.<ref name="41E" /><ref name="42E" /><ref name="43E" /><ref name="44E" /><ref name="45E" /><ref name="46E" /><ref name="47E" />
-'''Waveguide BS''':<br> enable integration in [[Wikipedia:Photonic integrated circuit|photonic chips]] for quantum technologies.<ref name="48E" /><ref name="49E" /><ref name="50E" />
-'''Conventional beam splitters:'''<br>
-Cube, plate, or pellicle BS with nearly constant ''R'', ''T'', ''φ'' over bandwidths. Used in free-space experiments.<ref name="36E" /><ref name="37E" /><ref name="38E" /><ref name="39E" /><ref name="40E" />
-'''Frequency-dependent beam splitters:'''<br>
-Coupled-mode theory: dâ<sub>1</sub>/dz = -i δ â<sub>1</sub> - i κ â<sub>2</sub>, yielding frequency-dependent U<sub>ij</sub>(ω).<ref name="64E" /><ref name="17E" /><ref name="22E" /><ref name="23E" />
-== Theory of Waveguide Beam Splitters ==
-While classical beam splitters are often treated as constant, the scattering matrix for a waveguide beam splitter is explicitly frequency-dependent. The transformation of input modes into output modes is represented as:<br>
-<math>
-\begin{pmatrix}
-\hat{a}_{\text{out},1} \\
-\hat{a}_{\text{out},2}
-\end{pmatrix}
-=
-\begin{pmatrix}
-R(\omega) & T(\omega) \\
--T^*(\omega) & R(\omega)
-\end{pmatrix}
-\begin{pmatrix}
-\hat{a}_{\text{in},1} \\
-\hat{a}_{\text{in},2}
-\end{pmatrix}
-</math><br>
-Here, the reflection <math>R(\omega)</math> and transmission <math>T(\omega)</math> coefficients are determined by the coupling constant and the interaction length within the waveguide. This frequency dependence is crucial for accurately describing the interference of non-monochromatic single photons. <ref name="23E" />
-====Waveguide BS====
-Has some important advantages over a conventional BS: they are significantly more compact and have other advantages in terms of performance and integration<ref name="15E"/>. BS can be classified in different ways, including their characteristics, such as polarizing BS and non-polarizing BS, and other distinct characteristics<ref name="18E"/>. A BS in quantum optics can be described regardless of its physical implementation, as shown in Figure 1(a); BS illustrations vary based on BS type, as in Figure 1(b)<ref name="03E"/>.
-In quantum optics, aluminium-coated beam splitters Figure 1(c) <ref name="AluSplit" /> are often modeled as ideal two-port devices characterized solely by
-𝑅
-R,
-𝑇
-T, and a relative phase shift
-𝜙
-ϕ between reflected and transmitted fields. The metallic coating introduces a well-defined phase relation between the output modes, allowing such beam splitters to be used in interference experiments, including Hong–Ou–Mandel–type configurations, despite their intrinsic losses.
-<div style="column-count:3; column-gap:2em; margin-left:0; padding-left:0;">
-[[File:Beam Splitter (a).png|thumb|left|A Beam Splitter (BS) scheme with two input ports and two output ports]]
-[[File:Beam Splitter (b).png|thumb|The BS with free space optics, i.e., cubic BS (top) and fiber optics, i.e., waveguide BS (bottom).]]
-[[File:Flat metal-coated beamsplitter.png|thumb|Figure 1(c). Aluminium-coated beam splitter.]]
-  </div>
-Two main parameters characterizing a BS in quantum optics are the reflection coefficient <math>R</math> (or transmission coefficient <math>T</math>, which satisfies <math>R + T = 1</math>) and the phase angle <math>\phi</math><ref name="19E"/>. In conventional reviews of quantum optics, during calculations concerning the behavior of photons (or electromagnetic waves) in the output ports or in devices incorporating a BS, parameters <math>R</math> and <math>\phi</math> are considered to be definite numbers<ref name="07E"/>.
-For instance, in the Hong–Ou–Mandel (HOM) effect, an equal splitter with <math>R = T = \tfrac{1}{2}</math> is used, which is independent of <math>\phi</math><ref name="04E"/>.  <math>R</math> and <math>\phi</math> are functions of the wavelength or frequency of the incoming light, and <math>R = R(\lambda)</math> and <math>\phi = \phi(\lambda)</math> in both cases, regardless of which BS is used<ref name="17E"/>. If a fixed wavelength or a small frequency band is used in the experiment, this dependency can be ignored, and the output photons can be considered constant. This has long been considered self-evident<ref name="07E"/>.
-However, in some cases, <math>R</math> and <math>\phi</math> are not constant by definition, and their frequency dependence is strong enough to affect, in a substantial way, the quantum state of light waves distributed in the output ports. Phenomena related to entanglement of light waves in a BS, unlike in the constant-parameter setting, behave differently if waveguide BSs (further referred to as fiber-optic BSs) are considered, since they differ from other BSs in this respect<ref name="17E"/><ref name="22E"/>.
-There is a theoretical basis for frequency-dependent waveguide BS. It shows that for a waveguide model interpreted as two coupled waveguides, the amplitude reflection and transmission coefficients <math>R</math> and <math>T</math> become frequency-dependent for the photons entering the BS<ref name="17E"/>. Accounting for this frequency dependence requires corrections to established theories, such as HOM interferometer fringe analysis<ref name="24E"/><ref name="25E"/> and BS-generated entanglement of photons<ref name="22E"/><ref name="23E"/>. This pronounced frequency dependence of <math>R</math> and <math>T</math> is a distinct characteristic of waveguide BSs<ref name="17E"/>.
-There is a need for a comprehensive analysis that classifies BS in quantum optics into two types: conventional (frequency-independent) and frequency-dependent. Based on this classification, researchers can examine differences in photon entanglement at the output ports. The present analysis performs exactly this, considering entanglement, photon statistics at the outputs, and the HOM effect<ref name="22E"/><ref name="24E"/>.
-== Beam splitter in quantum optics ==
-* Beam splitters also enable quantum optical neural networks for tasks like image classification and optimal quantum cloning, offering variational quantum algorithms and perceptron models that exploit entanglement for supervised learning.<ref name="15L"/><ref name="16L"/><ref name="17L"/><ref name="22L"/><ref name="23L"/><ref name="27L"/> Photonics-based implementations further integrate nonlinear activations and diffractive networks for all-optical machine learning.<ref name="07L"/><ref name="08L"/><ref name="09L"/><ref name="13L"/> Recent QML models address barren plateaus and demonstrate quantum verification of NP problems.<ref name="19L"/><ref name="20L"/><ref name="26L"/>"
-Since a beam splitter (BS) separates incoming beams, the quantum state of photons at the BS output ports is given by
-<math> | \mathrm{out} \rangle = e^{i \hat{H} t_{\mathrm{BS}}} | \mathrm{in} \rangle , </math>
-where <math>\hat{H}</math> is the Hamiltonian of the quantized electromagnetic field interacting with matter, <math>t_{\mathrm{BS}}</math> is the interaction time, and <math>| \mathrm{in} \rangle</math> is the initial state of the electromagnetic field.  <math>\hat{H}</math> can be quite complex, depending on the type of beam splitter.
-In general, the initial state can be represented as <ref name="13E" /><ref name="26E" />
-<math> | \mathrm{in} \rangle = \sum_{s_1,s_2} C_{s_1,s_2} \frac{1}{\sqrt{s_1! s_2!}} (\hat{a}_1^\dagger)^{s_1} (\hat{a}_2^\dagger)^{s_2} |0\rangle_1 |0\rangle_2 , </math>  <sub>(Eq. (1))</sub>
-where the creation operators of the first and second modes are <math>\hat{a}_1^\dagger</math> and <math>\hat{a}2^\dagger</math>, respectively. The integers <math>s_1</math> and <math>s_2</math> are the quantum numbers of the first and second modes (i.e. the number of photons in each mode). The coefficients <math>C{s_1,s_2}</math> define the initial state, and <math>|0\rangle_1 |0\rangle_2</math> are the vacuum states of modes 1 and 2. For convenience, it is <math>|0\rangle_1 |0\rangle_2 \equiv |0\rangle</math>.
-If the initial states are Fock states, then the coefficients satisfy <math>C_{s_1,s_2} = 1</math>. In this case, it is straightforward to show (up to an insignificant phase) that <ref name="01E" /><ref name="13E" /><ref name="26E" />
-<math> | \mathrm{out} \rangle = \sum_{s_1,s_2} C_{s_1,s_2} \frac{1}{\sqrt{s_1! s_2!}} (\hat{b}_1^\dagger)^{s_1} (\hat{b}_2^\dagger)^{s_2} |0\rangle , </math>
-with
-<math> \hat{b}_k^\dagger = e^{i \hat{H} t_{\mathrm{BS}}} \hat{a}_k^\dagger e^{-i \hat{H} t_{\mathrm{BS}}}, \qquad k = 1,2 . </math>  <sub>(Eq. (2))</sub>
-Here <math>\hat{b}_1^\dagger</math> and <math>\hat{b}_2^\dagger</math> are the creation operators at the output ports of the beam splitter for modes 1 and 2, respectively.
-For any lossless two-mode beam splitter, the transformation between input and output operators is governed by a unitary matrix, <math>\mathbf{U}_{BS}</math>, constrained by the conservation of energy and bosonic commutation relations:<ref name="18E" /><ref name="19E" /><ref name="27E" />
-<math> \begin{pmatrix} \hat{b}_1 \ \hat{b}2 \end{pmatrix} = \mathbf{U}{BS} \begin{pmatrix} \hat{a}_1 \ \hat{a}_2 \end{pmatrix} = \begin{pmatrix} t & r \ r' & t' \end{pmatrix} \begin{pmatrix} \hat{a}_1 \ \hat{a}_2 \end{pmatrix} </math>  <sub>(Eq. (3)}</sub>
-The requirement for unitarity (<math>\mathbf{U}^\dagger \mathbf{U} = \mathbf{I}</math>) implies that the transmission and reflection coefficients satisfy:
-<math>|r|^2 + |t|^2 = 1</math> (Energy conservation)
-<math>r^* t' + t^* r' = 0</math> (Phase relationship between ports)
-For a symmetric 50:50 beam splitter, this is commonly expressed as:
-<math> \mathbf{U}_{BS} = \frac{1}{\sqrt{2}} \begin{pmatrix} 1 & i \ i & 1 \end{pmatrix} </math>
-In the literature, one often encounters different representations of the beam splitter matrix. The most commonly used case corresponds to a phase shift <math>\phi = \pi/2</math>, while another frequently used representation sets <math>\phi = 0</math>. In these cases the matrix <math>U_{\mathrm{BS}}</math> takes the forms
-<math> U_{\mathrm{BS}} = \begin{pmatrix} \sqrt{T} & i \sqrt{R} \\ i \sqrt{R} & \sqrt{T} \end{pmatrix}, \qquad U_{\mathrm{BS}} = \begin{pmatrix} \sqrt{T} & \sqrt{R} \\ - \sqrt{R} & \sqrt{T} \end{pmatrix}. </math>   <sub>(Eq. (4)</sub>
-Both representations are valid only when the final result is independent of the phase shift <math>\phi</math>. As shown below, many quantities of interest in quantum optics, such as quantum entanglement at the output ports of the beam splitter, do not depend on this phase. Nevertheless, using the general form given in Eq. (3).
-In reality, photons are not monochromatic and their frequency distribution must be taken into account <ref name="01G" /><ref name="05G" /> In this case, the initial wave function of the photons is
-<math> | \mathrm{in} \rangle = \sum_{s_1,s_2} C_{s_1,s_2} \frac{1}{\sqrt{s_1! s_2!}} \int \Phi(\omega_1,\omega_2) (\hat{a}_1^\dagger)^{s_1} (\hat{a}_2^\dagger)^{s_2} |0\rangle \, d\omega_1 d\omega_2 , </math>  <sub>(Eq. (5))</sub>
-where <math>\Phi(\omega_1,\omega_2)</math> is the joint spectral amplitude (JSA) of the two-mode wave function. Assuming normalization,
-<math> \int |\Phi(\omega_1,\omega_2)|^2 \, d\omega_1 d\omega_2 = 1 , </math>
-the output state is
-<math> | \mathrm{out} \rangle = \sum_{s_1,s_2} C_{s_1,s_2} \frac{1}{\sqrt{s_1! s_2!}} \int \Phi(\omega_1,\omega_2) (\hat{b}_1^\dagger)^{s_1} (\hat{b}_2^\dagger)^{s_2} |0\rangle \, d\omega_1 d\omega_2 . </math>  <sub>(Eq. (6))</sub>
-== Quantum mechanical description ==
-The output state is ''|Ψ<sub>out</sub>⟩ = e<sup>iĤ t</sup><sub>BS</sub> |Ψ<sub>in</sub>⟩'', where Ĥ is the Hamiltonian and ''t''<sub>BS</sub> the interaction time.<ref name="51E" /><ref name="52E" /><ref name="53E" />
-For monochromatic light, the input is |Ψ<sub>in</sub>⟩ = ∑<sub>s<sub>1</sub>,s<sub>2</sub></sub> C<sub>s<sub>1</sub>,s<sub>2</sub></sub> (â<sup>†</sup><sub>1</sub><sup>s<sub>1</sub></sup> â<sup>†</sup><sub>2</sub><sup>s<sub>2</sub></sup> / √(s<sub>1</sub>! s<sub>2</sub>!)) |0⟩<sub>1</sub> |0⟩<sub>2</sub>.<ref name="54E" /><ref name="55E" />
-The unitary matrix U<sub>BS</sub> is:
-: <math>\begin{pmatrix} \hat{b}_1 \ \hat{b}_2 \end{pmatrix} = \begin{pmatrix} \sqrt{T} & e^{i\phi} \sqrt{R} \ -e^{-i\phi} \sqrt{R} & \sqrt{T} \end{pmatrix} \begin{pmatrix} \hat{a}_1 \ \hat{a}_2 \end{pmatrix}</math><ref name="56E" /><ref name="57E" /><ref name="58E" />
-For non-monochromatic light, integrate over joint spectral amplitude φ(ω<sub>1</sub>, ω<sub>2</sub>).<ref name="59E" /><ref name="34E" /><ref name="60E" />
-=== Angular momentum representation ===
-BS transformation as SU(2) rotation: L̂<sub>i</sub> operators, with L̂<sup>2</sup> = l̂(l̂ + 1), where l̂ = (n̂<sub>1</sub> + n̂<sub>2</sub>)/2.<ref name="61E" /><ref name="34E" />
-Unitary: Û = e<sup>-i Φ L̂<sub>3</sub></sup> e<sup>-i Θ L̂<sub>2</sub></sup> e<sup>-i Ψ L̂<sub>3</sub></sup>, with Θ = 2θ, θ = arcsin√R.<ref name="62E" /><ref name="63E" /><ref name="64E" />
-== Quantum entanglement ==
-BS generates entanglement if at least one input is non-classical (e.g., squeezed or Fock state).
-In frequency-dependent BS, entanglement varies with spectral overlap; broadband photons may reduce concurrence.<ref name="20E" /><ref name="21E" /><ref name="43E" /><ref name="44E" />
-===='''Quantum entanglement of photons and their statistics'''====
-As described by D.N. Makarov in 2022 <ref name="23E" />{{efn-ua|The references in this article have been adjusted. Some where damaged/misspeld in the original article.}}. in the Theory for the '''quantum optics beam splitter'''. Recent advancements in hybrid integrated circuits <ref name="106G" /><ref name="48H" /> have transitioned these theories from bulk optics to scalable chip-based platforms. Quantum states of light are fundamental resources for the implementation of quantum information protocols since the pioneering tests on nonlocality and quantum teleportation.<ref name="01H" /><ref name="02H" /> The optical device that divides an incident beam of light into two or more output beams, typically a transmitted beam and a reflected beam. In [[Wikipedia:Quantum optics|quantum optics]], the quantum beam splitter is a fundamental component far beyond classical beam division: it generates quantum [[Wikipedia:superposition|superposition]] and [[Wikipedia:quantum entanglement|quantum entanglement]] from non-entangled inputs, reveals non-classical [[Wikipedia:photon statistics|photon statistics]], and enables key phenomena like the [[Wikipedia:Hong–Ou–Mandel effect|Hong–Ou–Mandel effect]] (HOM effect).<ref name="01E" /><ref name="02E" /><ref name="03E" /><ref name="04E" /><ref name="05E" /><ref name="06E" /> While conventional beam splitters are often bulk components, recent progress in [[Wikipedia:Photonic integrated circuit|integrated photonics]] <ref name="01G" /> has allowed for on-chip implementations. For example, independent dibenzoterrylene <math>\mathrm{C}_{30}\mathrm{H}_{18}</math> (DBT) molecules integrated with silicon nitride (<math>\mathrm{Si}_{3}\mathrm{N}_{4}</math>) photonic elements, a single-crystalline [[Wikipedia:Anthracene|anthracene]] nanosheet doped with dibenzoterrylene (DBT) molecules<ref name="34K" />, and gold electrodes for Stark tuning (Methods).<ref name="25K" /><ref name="27K" /><ref name="29K" /><ref name="39K" /> Waveguides have achieved stable, lifetime-limited transitions suitable for scalable quantum networks. <ref name="01K" />  [[Wikipedia:Atomic line filter|Stark tuning]] experiments show how 100 waveguide-coupled molecules can be tuned to the same frequency and achieve on-chip Hong–Ou–Mandel interference. The quantum theory of the beam splitter is remarkably simple, parameterized by the reflection coefficient ''R'' (or transmission ''T'', with ''R'' + ''T'' = 1) and a relative phase shift ''φ''. This minimal description underpins linear-optical quantum protocols, from [[Wikipedia:Interferometry|interferometry]] to [[Wikipedia:Quantum computing scaling laws|scalable computing]].<ref name="07E" /><ref name="08E" /> Beam splitters are systematized into "conventional" (frequency-independent ''R'' and ''φ'') and frequency-dependent types (e.g., waveguide beam splitters), with the latter affecting entanglement and interference for [[Wikipedia:Fraunhofer diffraction equation#Non-monochromatic illumination|non-monochromatic light]].<ref name="09E" /><ref name="10E" /><ref name="11E" />
-<ref name="12E" /><ref name="13E" />
-<ref name="14E" /><ref name="15E" />
-<ref name="16E" /><ref name="17E" />
-<ref name="18E" /><ref name="19E" />. This article aims at providing
-an exhaustive framework of the advances of integrated quantum photonic platforms,
-for what concerns the integration of sources, manipulation, and detectors, as well as the contributions in quantum computing, cryptography and simulations.
-== Photon statistics ==
-Output distributions depend on input states and BS parameters. Coherent inputs yield coherent outputs; Fock inputs show sub/super-Poissonian statistics.<ref name="01E" /><ref name="03E" /><ref name="05E" />
-In frequency-dependent BS, statistics vary by mode, leading to selective bunching/antibunching.<ref name="22E" /><ref name="21E" />
-== Hong–Ou–Mandel effect ==
-[[File:Hong-Ou-Mandel mathematics.png|thumb|Mathematical equivalence between the Hong-Ou-Mandel and a classical artificial neuron.
-The left branch of the interferometer corresponds to the input layer, while the probe parameters are related to the trainable neuron weights. The rate of coincidences encodes the square absolute value of their scalar product, further post-processed by adding a bias and a sigmoid activation function]]
-Recent advancements have leveraged the HOM effect for quantum kernel evaluation, enabling distance computations in feature spaces for machine learning tasks.<ref name="33L"/> This equivalence to the SWAP test further extends HOM to high-dimensional interference in spatial modes.<ref name="30L"/><ref name="32L"/> Classical analogs achieving 97% visibility dips confirm the role of complementarity in such systems.<ref name="31L"/> Identical photons on 50:50 BS bunch<ref name="29L" />, suppressing coincidence counts (HOM dip).<ref name="56E" /><ref name="57E" /><ref name="58E" /><ref name="59E" /><ref name="60E" /><br>For frequency-dependent BS, dip visibility depends on spectral overlap; fluctuations affect detection.<ref name="17E" /><ref name="22E" /><ref name="23E" /><ref name="21E" /><br>Generalizations: bosons/fermions, wavepackets.<ref name="61E" /><ref name="62E" /><ref name="63E" /><ref name="64E" /><br>On a molecular quantum photonic chip, on-chip HOM interference was realized with a visibility of over 0.97. <ref name="02K" />The high visibility confirms the excellent indistinguishability of photons originating from independent sources on the same chip.Recent experiments have successfully implemented these waveguide principles on-chip. Using independent dibenzoterrylene (DBT) molecules integrated into <math>Si_{3}N_{4}</math> waveguides, researchers observed on-chip quantum interference with a visibility of <math>0.97 \pm 0.02</math>. <ref name="01K" /> This provides experimental proof that integrated molecular emitters can achieve the high level of indistinguishability required for scalable quantum circuits.In 2025 a novel quantum optical pattern recognition method leveraging the Hong-Ou-Mandel (HOM) effect for binary classification tasks was introduced by Simone Roncallo et all
-<ref name="39L" />.This encodes input objects and trainable parameters into single-photon states, measures two-photon coincidence rates at the output of a HOM interferometer, demonstrating a superexponential resource advantage (constant <math>\mathcal{O}(1)</math> complexity in photons and operations versus at least linear scaling in classical artificial neurons).
-==== Quantum optical setup====
-The quantum optical setup classifies objects without reconstructing their images. The approach relies on the Hong-Ou-Mandel effect, for which the probability that two photons exit a beam splitter in different modes, depends on their distinguishability<ref name="29L"/><ref name="30L"/><ref name="31L"/><ref name="32L"/>. In the
-implementation, an input object is targeted by a single-photon source, and eventually followed by an arbitrary lens system. The single-photon state interferes with another one, which encodes a set of trainable parameters, e.g. through a spatial light modulator. After the Hong-Ou-Mandel interferometer, the photons are collected by two bucket detectors without spatial sensitivity, one for each output mode. Classification occurs by measuring the rate of two-photon coincidences at the output.<br>
-The Hong-Ou-Mandel effect has been successfully applied to quantum kernel evaluation<ref name="33L"/>, which can compute distances between pairs of data points in the feature space. In this case, each point is sent to one branch of the interferometer, encoded in the temporal modes of a single-photon state. In our method, the interferometer has only one independent branch, which takes the spatial modes of a single-photon state reflected off the target object. The other branch remains fixed after training, and contains the layer of parameters.<ref name="25L"/><ref name="38L"/> After the measurement, the response function of our apparatus mathematically resembles that of a classical neuron. For this reason, we refer to our setup as quantum optical neuron. By analytically comparing the resource cost of the classical and quantum neurons, this  method requires constant <math>\mathcal{O}(1)</math>
-computational operations and injected photons, whereas the classical methods are at least linear in the image resolution: a '''superexponential advantage'''. <br>
-When combining multiple neurons, the large number of parameters involved motivates a consistent effort in reducing the cost of deep learning algorithms, e.g. by leveraging classical implementations that bypass hardware in an all-optical way<ref name="07L"/><ref name="08L"/><ref name="09L"/><ref name="10L"/><ref name="11L"/><ref name="12L"/><ref name="13L"/>. Quantum mechanical effects, like superposition and entanglement, can provide a significant speedup in such tasks<ref name="14L"/><ref name="15L"/>, e.g. by building quantum analogues of the perceptron<ref name="16L"/><ref name="17L"/><ref name="18L"/>, by employing variational methods<ref name="19L"/><ref name="20L"/> or quantum-inspired approaches<ref name="21L"/>. Quantum optical neural networks harness the best of both worlds, i.e. deep learning capabilities from quantum optics<ref name="22L"/><ref name="23L"/><ref name="24L"/><ref name="25L"/><ref name="26L"/><ref name="27L"/><ref name="28L"/>.
-======Mathematical description======
-Two optical input modes ''a'' and ''b'' that carry [[Wikipedia:annihilation and creation operators|annihilation and creation operators]] <math>\hat{a}</math>, <math>\hat{a}^\dagger</math>, and <math>\hat{b}</math>, <math>\hat{b}^\dagger</math>. Identical photons in different modes can be described by the [[Wikipedia:Fock state|Fock state]]s<ref name="03E" />, so, for example <math>|0\rangle_a</math> corresponds to mode ''a'' empty (the vacuum state), and inserting one photon into ''a'' corresponds to <math>|1\rangle_a=\hat{a}^\dagger|0\rangle_a</math>, etc. A photon in each input mode is therefore
-: <math>|1, 1\rangle_{ab} = \hat{a}^\dagger \hat{b}^\dagger |0, 0\rangle_{ab}.</math>
-When the two modes ''a'' and ''b'' are mixed in a 1:1 beam splitter, they produce output modes ''c'' and ''d''. Inserting a photon in ''a'' produces a superposition state of the outputs: if the beam splitter is 50:50 then the probabilities of each output are equal, i.e. <math>\hat{a}^\dagger |0\rangle_a \to \frac{1}{\sqrt{2}}\left( \hat{c}^\dagger + \hat{d}^\dagger\right)|00\rangle_{cd}</math>, and similarly for inserting a photon in ''b''. Therefore
-: <math>\hat{a}^\dagger \to \frac{\hat{c}^\dagger + \hat{d}^\dagger}{\sqrt{2}} \quad\text{and}\quad \hat{b}^\dagger \to \frac{\hat{c}^\dagger - \hat{d}^\dagger}{\sqrt{2}}.</math>
-The relative minus sign appears because the [[Wikipedia:beam splitter#Classical lossless beam splitter|classical lossless beam splitter produces a unitary transformation]]<ref name="19E" />. This can be seen most clearly when wr the two-mode beam splitter transformation in [[Wikipedia:matrix (mathematics)|matrix]] form:
-: <math>\begin{pmatrix}
- \hat{a} \\
- \hat{b}
-\end{pmatrix} \to \frac{1}{\sqrt{2}} \begin{pmatrix}
-& 1 \\
-& -1
-\end{pmatrix} \begin{pmatrix}
- \hat{c} \\
- \hat{d}
-\end{pmatrix}.</math><ref name="18E" />
-Similar transformations hold for the creation operators. Unitarity of the transformation implies unitarity of the matrix. Physically, this beam splitter transformation means that reflection from one surface induces a relative phase shift of π, corresponding to a factor of −1, with respect to reflection from the other side of the beam splitter (see the [[#Physical description|Physical description]] above)<ref name="27E" />.
-When two photons enter the beam splitter, one on each side, the state of the two modes becomes
-: <math>|1, 1\rangle_{ab} = \hat{a}^\dagger \hat{b}^\dagger |0, 0\rangle_{ab} \to \frac{1}{2} \left( \hat{c}^\dagger + \hat{d}^\dagger \right) \left( \hat{c}^\dagger - \hat{d}^\dagger \right) |0, 0\rangle_{cd} </math>
-: <math> = \frac{1}{2} \left( \hat{c}^{\dagger 2} - \hat{d}^{\dagger 2} \right) |0, 0\rangle_{cd}
- = \frac{|2, 0\rangle_{cd} - |0, 2\rangle_{cd}}{\sqrt{2}},
-</math>
-where used <math>\hat{c}^{\dagger 2}|0, 0\rangle_{cd}=\hat{c}^\dagger|1, 0\rangle_{cd}=\sqrt{2}|2, 0\rangle_{cd}</math> etc.<ref name="04E" />
-Since the commutator of the two creation operators <math>\hat{c}^\dagger</math> and <math>\hat{d}^\dagger</math> is zero because they operate on different spaces, the product term vanishes. The surviving terms in the superposition are only the <math>\hat{c}^{\dagger 2}</math> and <math>\hat{d}^{\dagger 2}</math> terms. Therefore, when two identical photons enter a 1:1 beam splitter, they will always exit the beam splitter in the same (but random) output mode.
-The result is non-classical: a classical light wave entering a classical beam splitter with the same transfer matrix would always exit in arm ''c'' due to destructive interference in arm ''d'', whereas the quantum result is random. Changing the beam splitter phases can change the classical result to arm ''d'' or a mixture of both, but the quantum result is independent of these phases.
-For a more general treatment of the beam splitter with arbitrary reflection/transmission coefficients, and arbitrary numbers of input photons, see [[Wikipedia:Beam splitter#Quantum mechanical description|the general quantum mechanical treatment of a beamsplitter]] for the resulting output Fock state.<ref name="01E" /><ref name="02E" /><ref name="05E" />
-==Single-Photon Detection in Beam Splitter Experiments==
-In experiments in quantum optics with beam splitters, an individual-photon-catching detector network is obviously decisive to glimpse those striking non-classical effects: antibunching, Hong-Ou-Mandel interference, and entanglement that the beam splitter itself can generate.
-[[File:Beam Splitter with Ultra Fast SPDs.png|center|Schematic (left) and scanning electron microscope image (right, scale bar 5 μm) of waveguide-integrated ultra-fast superconducting nanowire single-photon detectors (SNSPDs) coupled to a beam splitter on a photonic chip.]]
-Single-photon detectors (SPDs), such as superconducting nanowire single-photon detectors (SNSPDs) or single-photon avalanche diodes (SPADs) operated in Geiger mode, provide the necessary time-resolved, high-efficiency detection at the single-photon level.<ref name="01H" /><ref name="149H" /><ref name="150H" /> In foundational experiments, SPDs are placed at the two output ports of a beam splitter. For a single photon incident on 50:50 beam splitter, the absence of simultaneous detections (zero coincidence counts above vacuum noise) demonstrates the particle-like indivisibility of the photon, while interference effects reveal its wave nature (e.g., in Mach-Zehnder configurations built with beam splitters).<ref name="04E" /><ref name="37E" />
-In the Hong–Ou–Mandel effect, two indistinguishable photons entering separate input ports bunch at the outputs, leading to a near-complete suppression of coincidence detections between SPDs at the two ports, a hallmark of quantum interference.<ref name="04E" /><ref name="52E" /><ref name="53E" /> In tests of photon statistics or entanglement generation, post-selected coincidence measurements between SPDs enable quantification of antibunching (<math>g^{(2)}(0) < 1</math>) or violation of Bell inequalities.<ref name="20E" /><ref name="37E" />
-Fully integrating SPDs onto photonic chips are still a big challenge. There are some promising developments about waveguide-coupled superconducting detectors. These latest developments open up the possibility that future quantum systems will have detection totally on a chip.<ref name="15E" /><ref name="102G" /><ref name="17H" />
-Such integrations facilitate advanced HOM-based classifiers, where SLMs encode trainable parameters for pattern recognition, with software tools enabling simulation and optimization.<ref name="35L"/><ref name="36L"/><ref name="37L"/><ref name="39L"/> Training challenges, including initialization and convergence, mirror those in deep neural networks.<ref name="34L"/><ref name="38L"/>
-====Key technologies for quantum photonic chips====
-[[File:Glowing waveguides on quantum photonic chip (AI generated).jpg|thumb|Artistic illustration of glowing optical waveguides in a silicon nitride quantum photonic integrated circuit, highlighting on-chip light propagation for quantum interference experiments.]]
-Photonic integration provides a clear route toward compact quantum communication systems with growing complexity and improved functionality. Integrated quantum communication can be broadly categorized into three main aspects: photonic material platforms enabling large-scale integration<ref name="36G" /><ref name="37G" /><ref name="38G" />, quantum photonic components such as quantum light sources<ref name="39G" />, high-speed modulators<ref name="40G" /> and highly efficient photodetectors<ref name="41G" />, and representative applications including QKD<ref name="42G" /><ref name="43G" /> and quantum teleportation<ref name="44G" />. Because the materials, fabrication processes, and structural designs used in photonic integration differ substantially from those of discrete optical systems, essential chip-level photonic components must be redesigned and optimized for specific quantum information tasks.
-This section summarizes key technical developments covering quantum light sources, encoding and decoding elements, quantum detectors, and packaging techniques for integrated photonic systems. These advances constitute critical points in the evolution of integrated quantum communication. Early work in this area can be traced to the integration of photon sources based on periodically poled lithium niobate waveguides<ref name="45G" /> and interferometric circuits realized using silica-on-silicon planar lightwave circuits (PLCs)<ref name="46G" /><ref name="47G" /><ref name="48G" /><ref name="49G" />. The high efficiency and thermally stable operation of these integrated devices highlighted their intrinsic advantages over discrete and bulky optical components.
-Subsequently, a wide range of material platforms was explored, leading to substantial progress in the on-chip generation, manipulation, and detection of quantum states of light for quantum communication and other quantum information applications. Prominent monolithic platforms for chip-based quantum communication include silica waveguides (silica-on-silicon and laser-written silica waveguides), silicon-on-insulator (SOI), silicon nitride (<math>\mathrm{Si}_{3}\mathrm{N}_{4}</math>), lithium niobate (LN), gallium arsenide (GaAs)<ref name="98H" /><ref name="108H" /><ref name="119H" /><ref name="23K" />, indium phosphide (InP), and silicon oxynitride (<math>\mathrm{SiO}_{x}\mathrm{N}_{y}</math>)<ref name="34G" /><ref name="35G" /><ref name="50G" />. The state of the art of these platforms reveals distinct advantages and limitations in terms of waveguiding performance, availability of active components, and compatibility with related technologies.
-SOI offers high refractive-index contrast for dense integration, strong optical nonlinearity for nonclassical state generation, and excellent compatibility with advanced CMOS (complementary metal–oxide–semiconductor) fabrication processes widely used in the semiconductor industry. However, the absence of native lasing capability complicates the full monolithic integration of all components required for a complete quantum communication system. Semiconductor platforms such as GaAs<ref name="91G" /><ref name="50H" /><ref name="98H" /><ref name="108H" /> and InP enable full system integration but generally involve higher costs and reduced scalability. These inherent trade-offs indicate that no single material platform can simultaneously satisfy all requirements for quantum communication. As a result, hybrid integration has emerged as a promising strategy to combine the strengths of different platforms<ref name="50G" />.
-Notable achievements along these lines include heterogeneous quantum photonic devices such as integrated superconducting nanowire single-photon detectors (SNSPDs)<ref name="41G" /> and on-chip lasers for weak coherent pulse generation<ref name="51G" />. Additional important technologies, including semiconductor quantum dots (QDs) coupled to photonic nanostructures<ref name="52G" /> and diamond-on-insulator platforms<ref name="53G" /><ref name="54G" />, have also emerged as competitive solutions for integrated quantum communication systems.
-A timeline of advances in quantum photonic chips for quantum communication highlights several key items, including the first on-chip quantum interferometer for quantum cryptography<ref name="46G" />, quantum teleportation<ref name="05K" /><ref name="108H" /><ref name="31K" /> realized on a photonic chip<ref name="90G" />, chip-based DV-QKD<ref name="42G" />, CV-QKD<ref name="43G" />, and MDI-QKD<ref name="81G" /><ref name="94G" /><ref name="96G" />, as well as chip-to-chip quantum teleportation<ref name="44G" />.
-===Encoding schemes:===
-====Path encoding====
-Photon states distributed among multiple waveguides are employed to encode qubit/qudit states and to observe quantum interference effects due to bosonic statistics. Such information encoding has been one of the most investigated in quantum integrated photonics. Path-encoded single- and multi-photon states can be arbitrarily prepared, manipulated and measured using re-programmable Mach–Zehnder interferometers (MZIs). The effect of the MZI is equivalent to the operations made by a beamsplitter with a tunable splitting ratio and by a phase shift (Fig. 3a). This unit for path encoding processing envisages two unbiased directional couplers and two integrated tunable phase shifts. Relative phases between paths in integrated devices are the results of the geometric deformation of waveguides. The recent developments in the field have demonstrated the capability to realize reconfigurable phase shifters, thus allowing the implementation of several unitary transformations on the same device <ref name="11H" /><ref name="21H" /><ref name="101H" />. There are several examples of programmable integrated devices in SoS<ref name="11H" /><ref name="53H" /> , Si <ref name=" 13H" /> <ref name="15H" /> <ref name="27H" /> <ref name="90H" /> <ref name="92H" /> <ref name="94H" />, SiN<ref name="12H" /><ref name ="14H" /><ref name="101H" /> silica laser written waveguides with FLW<ref name="83H" /> <ref name="84H" /> <ref name="85H" /> and UV-writing<ref name="56H" /><ref name="57H" />. The re-programmable elements inside the MZI are the two phase shifts that are controlled generally through the thermo-optic effect. Heaters placed nearby the location of the waveguide allow for local changes in the refractive index of the material. Such reconfigurable units are sufficient to encode, process and measure any qubit in two optical paths. The complexity reached from integrated devices is nowadays very remarkable allowing for full integration of qubit- and qudit-based quantum gates and algorithms in SoS <ref name="53H" />  and Si-chips <ref name="15H" /><ref name="27H" /><ref name="93H"/><ref name="94H" />. In particular, the most recent silicon quantum processors count up to 16 integrated single-photon sources, more than 100 heaters and likewise integrated optical elements<ref name="13H" /><ref name="15H" /><ref name="27H" />.
-{{Annotated image
-| image =  Path encoding and integrated multi-port interferometers.png
-| image-width = {{{image-width|1000}}}
-| width = {{{width|1000}}}
-|
-| float = none
-| caption =
-| annotations =
-  {{Annotation|900|300|<ref name="134H"/><ref name="135H" /> | font-size=14 | color=blue}}
-}}
-====Femtosecond-laser-writing (FLW)====
-[[File:Femtosecond laser waveguide writing setup in BK7 glass 2018.jpg|thumb|Femtosecond laser direct-writing setup for waveguides in BK7 glass: processing and characterization configurations with beam profile inset (720 nJ pulse energy).]]
-[[File:Femtosecond laser writing 3D stage setup and circular waveguide cross-sections.png|thumb|FLW schematic (A) with 3D stage and 40× objective; (B,C) circular waveguide cross-sections (20 µm and 50 µm scales).]]
-The [[Wikipedia:femtosecond|femtosecond]] laser writing, using [[Wikipedia:Mode locking|Mode locking]]<ref name="Mayer" /> is a further method for silica waveguide fabrication<ref name="45H" /><ref name="65H" />. The mechanism of the process is the non-linear absorption of strong laser pulses tightly focused in the silica sample. Such absorption results in a permanent and localized modification in the refractive index. Waveguides are directly written by translating the silica sample at a constant speed with respect to the laser beam, without needing any preliminary preparation of substrate or layers of different materials as in the previous methods. The cross-section is circular and presents a very low birefringence. Such characteristics together with the 3D geometry capability have allowed the realization of devices insensitive from polarization <ref name="66H" /><ref name="68H" /> as well as devices able to manipulate polarization as waveplates or partially polarizing beamsplitter <ref name="69H" /><ref name="70H" />. The 3D geometry has other advantages regarding the range of possible schemes for optical circuit decomposition. FLW devices demonstrated to realize circuits according to the traditional networks of integrated beam-splitter in planar <ref name="67H" /><ref name="71H" /><ref name="72H" /><ref name="73H" /><ref name="74H" /> and 3D geometries<ref name="75H" /><ref name="76H" /><ref name="77H" /> and continuously coupled waveguide lattices <ref name="78H" /><ref name="79H" /><ref name="80H" /><ref name="81H" /><ref name="82H" />. There are instances of re-programmable circuits in small<ref name="83H" /><ref name="84H" /><ref name="85H" /><ref name="86H" /> and large scale <ref name="87H" /> realization of integrated devices. The integration of single-photon sources exploiting nonlinear effects is still challenging due to the low birefringence (<math>\Delta n \approx 0</math>) and the null third-order nonlinear susceptibility (<math>\chi^{(3)} = 0</math>) of these waveguides. Notwithstanding, femtosecond laser writing (FLW) can be exploited to write waveguides in a nonlinear material to generate pairs of photons through parametric processes. These kinds of sources have been interfaced successfully with FLW chips in<ref name="88H" />. The FLW waveguides display also a good coupling with external fibers, enabling the interface of the optical circuit with remote users or solid-state sources<ref name="85H" /><ref name="86H" />.
-===Compact integration of optical components===
-A factor that drives the compact integration of
-optical components, quantum computing on integrated
-photonic chips has attracted much attention in recent
-years. There are two types of optical models<ref name="201G" />: specific
-quantum computing models<ref name="202G" /><ref name="203G" /> (e.g., boson sampling),
-and universal quantum computing models<ref name="204G" /> <ref name="205G" /><ref name="206G" /><ref name="207G" /><ref name="208G" /><ref name="209G" /> (e.g.,
-one-way or measurement-based). For specific quantum
-computation, a variety of photonic systems were
-demonstrated using quantum photonic chips<ref name="210G" /><ref name="211G" /><ref name="212G" /><ref name="213G" /><ref name="214G" /><ref name="215G" /><ref name="215G" /><ref name="217G" />,
-enabling a natural and effective implementation of boson
-sampling. Gaussian boson sampling<ref name="218G" /><ref name="219G" />, which can
-dramatically enhance the sampling rate with the adoption
-of squeezed light sources, was performed for the calculation
-of molecular vibronic spectra on a <math>Si</math> chip<ref name="217G" /> (up to
-photons) and a <math>SiN</math> chip<ref name="216G" /> (up to 18 photons). Recently,
-quantum computational advantage has been delivered by
-photonic Gaussian boson sampling processors<ref name="220G" /><ref name="221G" />,
-paving the path for further development of integrated
-specific quantum computers with potential applications
-including graph optimization<ref name="222G" />, complex molecular
-spectra<ref name="223G" />, molecular docking<ref name="224G" />, quantum chemistry<ref name="225G" />,
-etc. For universal quantum computation, a number of
-major functionalities have been demonstrated with onchip
-photonic components, such as controlled-NOT gate
-and its heralding version<ref name="92G" /><ref name="226G" />, and compiled Shor’s
-factorization<ref name="227G" />. Moreover, both architectural and technological
-efforts have been dedicated to photonic one-way
-quantum computation. This approach employs cluster
-states and sequential single-qubit measurement to perform
-universal quantum algorithms<ref name="205G" /><ref name="207G" /><ref name="228G" /> and can be
-greatly enhanced by implementing resource state generation
-and fusion operation natively<ref name="229G" /><ref name="230G" /><ref name="231G" />. The relevant
-circuit implementations include programmable fourphoton
-graph states on a Si chip<ref name="232G" />, path-polarization
-hyperentangled and cluster states on a <math>\mathrm{SiO_2}</math> chip<ref name="233G" /> and
-programmable eight-qubit graph states on a Si chip<ref name="234G" />.
-In conclusion, quantum photonic chips have rapidly
-matured to become a versatile platform that proves to be
-invaluable in the development of cutting-edge quantum
-communication technologies. This review delves into the
-advancements achieved in this particular field. Considering
-the remarkable outcomes, it is anticipated that photonic
-integration will eventually assume a crucial role in
-building various quantum networks and potentially a
-global quantum internet<ref name="22G" /><ref name="23G" /><ref name="33G" /><ref name="19K" />, reshaping the landscape of
-future communication methodologies.
-==Chip packaging and system integration==
-While bare quantum photonic chips can be characterized
-using a probe station, they must be packaged into
-durable modules to develop working prototype devices<ref name="115G" />.
-To this end, numerous processes have been proposed to
-package quantum photonic chips into compact systems
-for real-world applications.
-Generally, photonic packaging involves a range of
-techniques and technical competencies needed to make
-the optical, electrical, mechanical, and thermal connections
-between a photonic chip and the off-chip components
-in a photonic module<ref name="116G" /><ref name="117G" /><ref name="118G" />. Fiber-to-chip coupling
-is one of the best-known aspects. The main challenge
-associated with coupling between an optical fiber and a
-typical waveguide on the chip is the large difference
-between their mode‐field diameters (MFDs)<ref name="119G" />. For
-example, the MFD at 1550 nm is ~10 μm in telecom
-single‐mode fiber (SMF), while the cross-section of the
-corresponding strip silicon waveguide is usually only
-× 450 nm. This mismatch can be mitigated by using
-configurations that efficiently extract the mode from
-waveguide<ref name="97G" />, such as inverted-taper edge couplers
-interfaced with lensed SMF fibers<ref name="120G" /><ref name="121G" /> or ultrahigh
-numerical aperture fibers<ref name="122G" />, and grating couplers
-interfaced with SMF fibers<ref name="119G" /><ref name="123G" />. For the
-approach harnessing grating couplers, coupling efficiency
-up to 81.3% (−0.9 dB) can be achieved in a 260-nm-thick
-SOI platform without the need for a back reflector or
-overlayer<ref name="124G" />. Additionally, efficiencies over 90% have been
-experimentally demonstrated using edge couplers fabricated
-on 200-mm SOI wafers<ref name="125G" />. An alternative approach
-for cost-effective and panel-level packaging is the evanescent
-coupling scheme, which has been reported to
-have a coupling loss of approximately 1 dB at a wavelength
-of 1550 nm<ref name="126G" />.
-To access the electrical components on quantum photonic
-chips, electronic packaging is required to route signals
-from electronic drivers, amplifiers, and other control
-circuitry. This is often achieved by interfacing with dedicated
-printed circuit boards (PCBs)<ref name="127G" />. The connection
-between PCBs and the bond-pads on the chip is
-usually made using wire-bonds.When a very large number
-of electrical connections or precise sub-nanosecond control
-on multiple channels is needed, 2.5-dimensional or
--dimensional integration with customized electronic
-integrated circuits (EICs) may be utilized <ref name="115G" /><ref name="128G" />
-This integration can be achieved using either solder-ballbump
-or copper-pillar-bump interconnects, providing a
-robust electrical, mechanical, and thermal interface for the
-photonic chips<ref name="129G" /><ref name="130G" />.
-Global thermal stabilization of quantumphotonic devices
-is essential for prototypes that require high accuracy and
-repeatability or for field tests where seasonal temperature
-swings are common. This can be achieved using passive
-cooling techniques or a thermoelectric cooler (TEC). The
-added global stability from the TEC allows for more efficient
-and better reproducibility in the local temperature
-tuning of individual photonic elements (e.g., micro-ring
-resonators, thermo-optic phase shifters, etc.) on the
-chip<ref name="115G" />. Additionally, liquid cooling can be installed to
-further increase the cooling capacity of the system<ref name="127G" />
-==Experiments==
-== On-Chip Quantum Interference ==
-[[File:Molecular quantum photonic chip and an illustration of on-chip interference of indistinguishable single photons from independent quantum emitters (molecules).jpg]]
- <div style="column-count:2;">'''<big>a</big>''', Photograph of the quantum photonic chip.'''<big>b</big>''', Optical micrograph of all 24 independent devices integrated on the chip.'''<big>c</big>''', Zoomed-in view of one device with hybrid integration of Si3N4 photonic elements (waveguides W1–W4, a 2 × 2 MMI and grating couplers G1–G4), an anthracene nanosheet (light green) doped with DBT molecules, and metal electrodes (yellow). '''<big>d</big>''', SEM images of the waveguides W1 and W2 (with gold electrodes flanking them), the MMI, and one of the output gratings G3. '''<big>e</big>''', DBT molecular structure and energy-level scheme. em., emission; exc., excitation. '''<big>f</big>''', Illustration of the on-chip two-photon quantum interference experiment: two streams of single photons originating from resonantly driven DBT molecules couple to the waveguides, interfere through the MMI, then propagate through the waveguide circuits and out-couple to free space via the gratings for timecorrelated
-single-photon detection. The transition frequencies of the molecules can be tuned by the electrode via the Stark effect. Scale bars, 1 mm ('''<big>a</big>'''), 300 μm ('''<big>b</big>'''), 50 μm ('''<big>c</big>''') and 10 μm ('''<big>d</big>'''). Recent experimental breakthroughs have successfully implemented these waveguide principles using molecular quantum photonic chips. By integrating independent dibenzoterrylene (DBT) molecules into <math>Si_{3}N_{4}</math> waveguides, researchers have achieved on-chip Hong–Ou–Mandel (HOM) interference with a visibility of <math>0.97 \pm 0.02</math>. <ref name="01K" /></div>
-These integrated systems allow for the observation of quantum beating when a frequency detuning (e.g., 400 MHz) is applied between two emitters. These beats have been shown to persist for over 100 µs, demonstrating the high spectral stability and single-photon purity required for scalable quantum information processing. <ref name="04K" />
-====Evaluating photon indistinguishability from the TPQI experiment under CW excitation====
-A recent report<ref name="40K" /> establishes a method to evaluate full wave-packet photon
-indistinguishability from TPQI experiments under non-resonant CW excitation. Here, this method extends to resonant CW excitation, enabling direct assessment of photon indistinguishability from our
-TPQI data. The metric used in this approach is
-<math>
-\tilde{V}(S) =
-\frac{
-\int d\tau \, \bigl[1 - g^{(2)}_{\rm HOM}(\tau)\bigr]
--
-\int d\tau \, \bigl[1 - g^{(2)}_{{\rm HOM},d}(\tau)\bigr]
-}{
-\int d\tau \, \bigl[1 - g^{(2)}_{{\rm HOM},d}(\tau)\bigr]
-}</math>.<br>Substituting the theoretical expressions for
-<math>g^{(2)}_{\rm HOM}(\tau)</math> and
-<math>g^{(2)}_{{\rm HOM},d}(\tau)</math> from equations respectively,
-<math>\tilde{V}(S)</math> is
-<math>
-\tilde{V}(S) = \frac{\mathcal{M} \,(2\mathcal{M}+1)}{\mathcal{M}+ (\mathcal{M}+1)/(1+S)}
-</math>
-.
-where <math>\mathcal{M} = \frac{\tau_2}{2 \tau_1}</math>. Equation (26) expresses <math>\tilde{V}</math> as a function of <math>S</math>.
-In the weak excitation limit (<math>S \to 0</math>), <math>\tilde{V}</math> reduces to <math>\frac{\tau_2}{2 \tau_1}</math>, thereby yieldingn the true photon indistinguishability, consistent with TPQI experiments
-under pulsed excitation<ref name="40K" />.
-== Applications ==
-==Image classification==
-Has been significantly improved by the introduction of deep learning methods, which provide several algorithms that can learn and extract image features. Examples include feedforward neural networks, convolutional neural networks and vision transformers<ref name="01L"/><ref name="02L"/><ref name="03L"/><ref name="04L"/>. The artificial neuron, also called perceptron<ref name="05L"/>, represents the fundamental unit of such architectures. In this model, encoded data are processed through a set of weighted trainable connections, by taking the scalar product between the input and the vector of weights. The output is further post-processed, including a bias and an activation function, which is usually non-linear<ref name="06L"/>. Image classification implies a two-fold cost. Computational processing requires a number of operations that scales, at least, linearly in the image resolution. Similarly, the optical cost of image capturing undergoes the same scaling in the number of photons.
-This model compared against conventional classifiers, i.e. a single neuron and a convolutional neural network, commonly employed in pattern recognition tasks<ref name="25L" /><ref name="26L" /><ref name="27L" /><ref name="28L" /><ref name="38L" />. Adopting the [[Wikipedia:Tensor (machine learning)|TensorFlow notation]], the convolutional structure is: Conv2D (10, 3 × 3) → Conv2D (4, 2 × 2) → MaxPooling2D (2 × 2). Roughly, all the architectures have ~10³ trainable parameters. The performances are equal in the MNIST dataset, both in terms of trainability and final accuracy. In the CIFAR-10 dataset, our classifier outperforms the conventional ones, showing superior efficiency under a strongly-constrained parameters count. These findings emphasize the competitive accuracy of our method, and also its comparative advantage in pattern recognition tasks with a limited number of parameters.
-====Entanglement distribution and quantum teleportation systems====
-'''Quantum teleportation''' has been achieved over different types of platforms such as superconducting qubits, trapped atoms, nitrogen-vacancy centers, and continuous-variable states, among others.<ref name="170H" /> Of all the types of quantum teleportation, the photonic qubit is considered to be a very promising candidate for forming the quantum channel of the quantum network due to its stability within noisy environments and the fact that it can be operated at room temperature.<ref name="23H" /> Photonic qubits<ref name="03K" /> are more resistant to long-distance environmental interference. To date, photonic quantum teleportation has been successfully performed experimentally using different methods, including free-space and fiber.<ref name="170H" />
-The first experimental validation of quantum teleportation relied on qubits encoded in the polarization of photons produced from a beta-barium borate (BBO) crystal in a free-space setup on an optical table.<ref name="20H" /> Later, the distance record for free-space teleportation was pushed beyond 1,400 km between the Micius satellite and a ground station,<ref name="171H" /> thus providing the basis for a global quantum network. However, due to the issues of beam divergence, pointing, and collection of free-space teleportation, optical-fiber-based teleportation is considered more suitable for the establishment of cost-efficient quantum metropolitan networks. The current distance record for optical-fiber-based teleportation is 102 km.<ref name="172H" />
-A major issue related to photonic qubit teleportation involves the efficiency limit of Bell-state measurements (BSMs) using linear optics, with a 50% bound. To go around such a constraint, continuous variable optical modes can be used as a different solution to accomplish full deterministic teleportation. This technique was successfully experimented with on a 6-km fiber link,<ref name="173H" /> but its fidelity needs to be enhanced because of its vulnerability to transmission losses. For non-photonic qubit technology, a distance of 21 m was attained in the case of atom traps.<ref name="174H" />
-With increasing momentum in quantum teleportation, another relevant technology is its integration. In future quantum networks, quantum teleportation chips could be integrated into fixed systems (e.g., network relays located in network nodes) or mobile systems (e.g., drones) to create lightweight and compact quantum nodes allowing remote access to quantum equipment for shared information as well as advanced computational power (Luo et al., Light: Science & Applications, 2023, 12:175). All this has become possible due to generation and manipulation of entangled photon pairs in multiple Degrees of Freedom on-chip, including path-encoded entanglement in Mach-Zehnder Interferometers (MZIs),<ref name="93H" /> polarization entanglement created in birefringent media,<ref name="177H" /> and time-bin entanglement in Franson interferometers.<ref name="178H" />
-The first telecom-based chip-scale teleportation used an off-chip photon source, showing the feasibility of a fidelity of 0.89 in a single chip system.<ref name="90H" /> The current advancement in integrated quantum photonics has also helped realize entanglement-based quantum communications beyond the chip level. The first entanglement distribution between chips incorporated all necessary components into monolithically integrated silicon photonic chips.<ref name="100H" /> On-chip entangled Bell states were generated, and the qubit was transferred to the other silicon chip by encoding the on-chip path-encoded and in-fiber polarization states using two-dimensional grating couplers. Moreover, more advanced integrated quantum circuits implemented with on-chip sources have implemented inter-chip teleportation, showing a fidelity of 0.88.<ref name="44H" /> The chip-scale realization of photonic qubit creation, processing, and transmission provides one potential promising step toward the realization of the distributed quantum information processing Internet. In addition, entangled photon pairs in the visible and telecom bands have been created on a chip of silicon nitride (<math>Si_3N_4</math>) using a micro-ring resonator, with distribution over more than 20 km, using precisely designed and fabricated micro-ring resonators, entangling photons in the visible range, which can be coupled with quantum memories, and in the telecom range, with lower attenuation in the transmission of the photons over the fibers.<ref name="71H" />
-====Quantum Information Processing and Computing====
-Beam splitters are the fundamental building blocks for Linear Optical Quantum Computing (LOQC).
-* The KLM Protocol: Beam splitters facilitate the probabilistic entangling gates necessary for universal quantum computation using only linear elements. The original CNOT gate in this protocol operates with a success probability of <small><math>\frac{1}{16}</math></small>. <ref name="ML03" />
-* Waveguide Lattices: Integrated arrays of beam splitters allow for the simulation of quantum walks and complex multi-photon interference patterns. <ref name="15E" /><ref name="16E" />
-===Quantum Photonic Chips for Quantum Communication and Internet===
-The smallest optical beam splitters are typically found in advanced research within nanophotonics, plasmonics, and integrated optics<ref name="34G" />, where devices are miniaturized for applications like photonic computing<ref name="09E" />, optical communications, and quantum technologies<ref name="16E" />. These are far smaller than commercial or conventional beam splitters (which often measure millimeters to centimeters)<ref name="29E" />.
-====Photonic Beam Splitters====
-An example is a silicon-based photonic polarizing beam splitter developed by researchers at the University of Utah. It measures just 2.4 × 2.4 microns (μm) in footprint, making it one of the smallest low-loss all-dielectric designs<ref name="17E" />. This device splits incoming light into two separate polarized channels and was designed to enable light-speed computing by replacing electrons with photons<ref name="06E" />. It was published in 2015 and claimed as the world's smallest at the time.<ref name="18E" />
-====Plasmonic Beam Splitters====
-Plasmonic designs, which use surface plasmon polaritons (waves at metal-dielectric interfaces) to manipulate light, can be even smaller due to sub-wavelength confinement, though they often have higher losses<ref name="30E" />.
-One ultracompact plasmonic polarizing beam splitter on a silicon-on-insulator (SOI) platform has a coupling region of 1.1 μm in length and 50 nanometers (nm) in width. The overall footprint is approximately 1.1 × 0.95 μm (accounting for the waveguides), resulting in an area of about 1 μm². This was reported in 2013 and leverages silver cylinders sandwiched between silicon waveguides for splitting polarized light.<ref name="82G" />
-Other plasmonic variants, such as those based on nanoslits or bent directional couplers, have dimensions ranging from hundreds of nm to a few μm, with some coupling lengths as short as 0.9–8.9 μm in more recent designs (e.g., from 2020–2023 papers on slot waveguides or photonic crystals).<ref name="35G" />
-====Metasurface-Based Beam Splitters====
-Metasurfaces (ultra-thin engineered arrays of nano-antennas) offer nanoscale thickness, often 50–200 nm, while lateral dimensions can be a few μm to tens of μm to handle the beam. These are among the thinnest possible, enabling flat optics for beam splitting with arbitrary ratios or angles<ref name="52E" />. A 2018 example uses gradient metasurfaces for nanoscale thickness, though specific lateral sizes vary by design (typically 5–10 μm across for efficient operation).<ref name="52G" />
-These nanoscale beam splitters are fabricated using techniques like electron-beam lithography and are integrated on chips<ref name="15G" />, making them orders of magnitude smaller than traditional glass cubes or plates<ref name="AluSplit" />. Recent developments (post-2020) focus on reducing losses, broadening bandwidth, and integrating with materials like lithium niobate or silicon nitride<ref name="77G" />, but no widely reported designs have broken below ~1 μm in key dimensions while maintaining functionality<ref name="19E" />. If you're interested in a specific type (e.g., for visible light, IR, or quantum applications), more details could narrow it down further<ref name="27E" />.
-===Quantum communication===
-which applies the principles of quantum mechanics for quantum information transmission, enables fundamental improvements to security, computing, sensing, and metrology. This realm encapsulates a vast variety of technologies and applications ranging from state-of-the-art laboratory experiments to commercial reality. The best-known example is quantum key distribution (QKD)<ref name="01G"/><ref name="02G"/>. The basic idea of QKD is to use the quantum states of photons to share secret keys between two distant parties. The quantum no-cloning theorem endows the two communicating users with the ability to detect any eavesdropper trying to gain knowledge of the key<ref name="03G"/><ref name="04G"/>. Since security is based on the laws of quantum physics rather than computational complexity, QKD is recognized as a desired solution to address the ever-increasing threat raised by emergent quantum computing hardware and algorithms.
-Despite the controversy surrounding its practical security, QKD is leading the way to real-world applications<ref name="05G"/>. For example, fiber-based and satellite-to-ground QKD experiments have been demonstrated over 800 km in ultra-low-loss optical fiber<ref name="06G"/> and 2000 km in free space<ref name="07G"/>, respectively. The maximal secure key rate for a single channel has been pushed to more than 110 Mbit/s<ref name="08G"/>. A number of field-test QKD networks have been established in Europe<ref name="09G"/><ref name="10G"/><ref name="11G"/>, Japan<ref name="12G"/>, China<ref name="13G"/><ref name="14G"/>, UK<ref name="15G"/>, and so forth. Furthermore, the security of practical QKD systems was intensively studied to overcome the current technical limitations<ref name="05G"/><ref name="16G"/><ref name="17G"/>. Post-quantum cryptography has been combined with QKD to achieve short-term security of authentication and long-term security of keys<ref name="18G"/>.
-===Quantum Communication and Cryptography===
-Beam splitters are used to distribute entanglement across networks, enabling secure information transfer.
-* Quantum Key Distribution (QKD): Critical for implementing protocols that detect eavesdropping through signal splitting and interference. <ref name="34E" /><ref name="35E" />
-* Quantum Repeaters: Used in Bell-state measurements (BSM) to perform entanglement swapping, extending the range of quantum communication. <ref name="51E" />
-* Teleportation: A beam splitter is used to perform the joint measurement required to transfer a quantum state <math>|\psi\rangle</math> between distant nodes. <ref name="38E" /><ref name="39E" />
-====Quantum Metrology and Sensing====
-By creating path-entangled states, such as N00N states of the form <math>(|N,0\rangle + |0,N\rangle)/\sqrt{2}</math>, beam splitters allow sensors to surpass the Standard Quantum Limit.
-* Heisenberg-Limit Sensing: Utilizing quantum interference to achieve a phase sensitivity <math>\Delta\phi</math> that scales with <math>1/N</math> rather than the classical <math>1/\sqrt{N}</math>. <ref name="48E" /><ref name="49E" /><ref name="50E" />
-* Beam splitter interference in HOM setups enhances metrological precision in quantum kernel methods for feature space analysis.<ref name="24L"/><ref name="33L"/>
-====Characterization and Foundations====
-To verify the performance of these applications, measures and tests are employed:
-* Entanglement Measures: The quality of the generated states is quantified using Concurrence and Entropy of Formation. <ref name="45E" /><ref name="46E" />
-* Foundational Tests: Beam splitters provide the platform for Bell test violations and studies of decoherence in open quantum systems. <ref name="36E" /><ref name="37E" />
-====Integrated Photonics====
-Implementations focusing at on-chip integration using waveguide architectures. An improvement is the use of dibenzoterrylene (DBT) molecules in an anthracene matrix, which has enabled the on-chip integration of independent channels with high-visibility, indistinguishable single photons. <ref name="46K" />
 == See also ==
-* [[Wikipedia:Hong–Ou–Mandel effect|Hong–Ou–Mandel effect]]
+{{#invoke:PhysicsQC|tocHeadingAndList|Physics:Quantum basics/See also}}
-* [[Wikipedia:Waveguide (optics)|Waveguide (optics)]]
-* [[Wikipedia:Integrated quantum photonics|Integrated quantum photonics]]
-* [[Wikipedia:Linear optical quantum computing|Linear optical quantum computing]]
-{{:Physics:Quantum basics/See also}}
 ==Notes==
 {{notelist-ua}}
 ====Sources====
@@ Line 3,823: / Line 3,234: @@
 * Connect beam splitter behavior to fundamental quantum concepts such as superposition and entanglement.
 * Relate modern integrated photonics implementations (e.g., waveguide beam splitters) to traditional optics.
-==References==
+= References =
 {{Reflist|3}}
-{{Quantum optics operators}}
-[[Category:Quantum optics]][[Category:Optical components]] [[Category:Interferometry]]
 {{Author|Harold Foppele}}
-{{Sourceattribution|Quantum optics beam splitter experiments|1}}
+{{Sourceattribution|Physics:Quantum optics beam splitter experiments|1}}

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