Physics:Quantum Hyperfine structure: Difference between revisions

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{{Short description|Quantum Collection topic on Quantum Hyperfine structure}}
{{Short description|Quantum Collection topic on Quantum Hyperfine structure}}


{{Quantum book backlink|Atomic and spectroscopy}}
{{Quantum book backlink|Atomic and spectroscopy}}
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'''Hyperfine structure''' refers to small shifts and splittings of otherwise degenerate electronic energy levels in atoms, molecules, and ions due to interactions between the [[Physics:Atomic nucleus|nucleus]] and the surrounding electron cloud.
'''Hyperfine structure''' is a Book I topic in the Quantum Collection. Hyperfine structure refers to small shifts and splittings of otherwise degenerate electronic energy levels in atoms, molecules, and ions due to interactions between the nucleus and the surrounding electron cloud. These shifts are typically much smaller than those of fine structure and arise from electromagnetic multipole interactions, primarily involving nuclear magnetic dipole and electric quadrupole moments. Hyperfine structure refers to small shifts and splittings of otherwise degenerate electronic energy levels in atoms, molecules, and ions due to interactions between the nucleus and the surrounding electron cloud. These shifts are typically much smaller than those of fine structure and arise from electromagnetic multipole interactions, primarily involving nuclear magnetic dipole and electric quadrupole moments.
 
These shifts are typically much smaller than those of [[Physics:Fine structure|fine structure]] and arise from electromagnetic multipole interactions, primarily involving nuclear magnetic dipole and electric quadrupole moments.
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In atomic systems, hyperfine structure originates from:
In atomic systems, hyperfine structure originates from:


* interaction between the [[Physics:Nuclear magnetic moment|nuclear magnetic dipole moment]] and magnetic fields produced by electrons   
* interaction between the nuclear magnetic dipole moment and magnetic fields produced by electrons   
* interaction between the [[Physics:Quadrupole|nuclear electric quadrupole moment]] and the electric field gradient   
* interaction between the nuclear electric quadrupole moment and the electric field gradient   


In molecules, additional contributions arise from:
In molecules, additional contributions arise from:
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* <math>\mathbf{F} = \mathbf{I} + \mathbf{J}</math> = total angular momentum   
* <math>\mathbf{F} = \mathbf{I} + \mathbf{J}</math> = total angular momentum   


This interaction satisfies the [[Physics:Landé interval rule|Landé interval rule]].
This interaction satisfies the Landé interval rule.


==Electric quadrupole interaction==
==Electric quadrupole interaction==
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* atomic spectra   
* atomic spectra   
* molecular spectroscopy   
* molecular spectroscopy   
* [[Physics:Electron paramagnetic resonance|electron paramagnetic resonance]]  
* electron paramagnetic resonance   
* [[Physics:Nuclear magnetic resonance|nuclear magnetic resonance]]  
* nuclear magnetic resonance   


A key example is the 21 cm hydrogen line in astrophysics.
A key example is the 21 cm hydrogen line in astrophysics.
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==History==
==History==


Hyperfine structure was first described theoretically by [[Biography:Enrico Fermi|Enrico Fermi]] in 1930.<ref>E. Fermi (1930), "Über die magnetischen Momente der Atomkerne". Z. Physik 60, 320–333.</ref>
Hyperfine structure was first described theoretically by Enrico Fermi in 1930.<ref>E. Fermi (1930), "Über die magnetischen Momente der Atomkerne". Z. Physik 60, 320–333.</ref>


The nuclear quadrupole moment was introduced in 1935 by H. Schüler and T. Schmidt.<ref>H. Schüler & T. Schmidt (1935), "Über Abweichungen des Atomkerns von der Kugelsymmetrie". Z. Physik 94, 457–468.</ref>
The nuclear quadrupole moment was introduced in 1935 by H. Schüler and T. Schmidt.<ref>H. Schüler & T. Schmidt (1935), "Über Abweichungen des Atomkerns von der Kugelsymmetrie". Z. Physik 94, 457–468.</ref>

Revision as of 08:13, 20 May 2026



← Back to Atomic and spectroscopy Book I

Hyperfine structure is a Book I topic in the Quantum Collection. Hyperfine structure refers to small shifts and splittings of otherwise degenerate electronic energy levels in atoms, molecules, and ions due to interactions between the nucleus and the surrounding electron cloud. These shifts are typically much smaller than those of fine structure and arise from electromagnetic multipole interactions, primarily involving nuclear magnetic dipole and electric quadrupole moments. Hyperfine structure refers to small shifts and splittings of otherwise degenerate electronic energy levels in atoms, molecules, and ions due to interactions between the nucleus and the surrounding electron cloud. These shifts are typically much smaller than those of fine structure and arise from electromagnetic multipole interactions, primarily involving nuclear magnetic dipole and electric quadrupole moments.

Quantum Hyperfine structure.

Overview

In atomic systems, hyperfine structure originates from:

  • interaction between the nuclear magnetic dipole moment and magnetic fields produced by electrons
  • interaction between the nuclear electric quadrupole moment and the electric field gradient

In molecules, additional contributions arise from:

  • nuclear spin–spin interactions
  • nuclear spin–rotation coupling

Hyperfine structure is fundamentally weaker than fine structure and reflects the coupling between nuclear and electronic degrees of freedom.

Magnetic dipole interaction

For a nucleus with spin 𝐈, the magnetic dipole moment is

𝝁I=gIμN𝐈

where gI is the nuclear g-factor and μN the nuclear magneton.

The interaction Hamiltonian is:

H^D=𝝁I𝐁

where 𝐁 is the magnetic field generated by electrons.

In the effective angular momentum form, this becomes:

H^D=A^𝐈𝐉

leading to the hyperfine energy shift:

ΔE=12A[F(F+1)I(I+1)J(J+1)]

where:

  • 𝐉 = total electronic angular momentum
  • 𝐅=𝐈+𝐉 = total angular momentum

This interaction satisfies the Landé interval rule.

Electric quadrupole interaction

For nuclei with spin I1, an electric quadrupole moment exists.

The quadrupole Hamiltonian is:

H^Q=eT2(Q)T2(q)

where:

  • T2(Q) describes the nuclear quadrupole moment
  • T2(q) describes the electric field gradient

This interaction reflects deviations from spherical nuclear charge distributions.

Molecular hyperfine structure

In molecules, hyperfine structure includes additional contributions:

Spin–spin interaction

Magnetic coupling between nuclei:

H^II=αα𝝁α𝐁α

Spin–rotation interaction

Coupling between nuclear spins and molecular rotation:

H^IR𝐈𝐓

These effects are important in rotational spectroscopy.

Experimental observation

Hyperfine structure is observed in:

  • atomic spectra
  • molecular spectroscopy
  • electron paramagnetic resonance
  • nuclear magnetic resonance

A key example is the 21 cm hydrogen line in astrophysics.

Applications

Atomic clocks

The SI second is defined via the hyperfine transition of caesium-133:

f=ΔEh

One second equals exactly:

9192631770 cycles of this transition.

Astrophysics

Hyperfine transitions probe the interstellar medium and molecular clouds.

Quantum computing

Hyperfine states serve as long-lived qubits in trapped-ion systems.

Precision physics

Measurements of hyperfine splitting provide tests of quantum electrodynamics.

History

Hyperfine structure was first described theoretically by Enrico Fermi in 1930.[1]

The nuclear quadrupole moment was introduced in 1935 by H. Schüler and T. Schmidt.[2]

See also

Table of contents (217 articles)

Index

Full contents

References

  1. E. Fermi (1930), "Über die magnetischen Momente der Atomkerne". Z. Physik 60, 320–333.
  2. H. Schüler & T. Schmidt (1935), "Über Abweichungen des Atomkerns von der Kugelsymmetrie". Z. Physik 94, 457–468.


Author: Harold Foppele

Source attribution: Physics:Quantum Hyperfine structure

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