Lifshitz–Kosevich formula

E243122

physical law theoretical expression

The Lifshitz–Kosevich formula is a key theoretical expression in solid-state physics that describes how the amplitude of quantum oscillations in metals depends on temperature, magnetic field, and electronic properties.

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All labels observed (1)

Label	Occurrences
Lifshitz–Kosevich formula canonical	3

Statements (45)

Predicate	Object
instanceOf	physical law ⓘ theoretical expression ⓘ
appliesTo	Shubnikov–de Haas effect ⓘ de Haas–van Alphen effect ⓘ
assumes	Fermi liquid behavior ⓘ weak impurity scattering ⓘ well-defined quasiparticles ⓘ
characterizes	field dependence of quantum oscillation amplitude ⓘ temperature damping of quantum oscillations ⓘ
dependsOn	Dingle temperature ⓘ Landau level quantization ⓘ effective mass of charge carriers ⓘ electronic properties ⓘ magnetic field ⓘ scattering rate of charge carriers ⓘ temperature ⓘ
describes	amplitude of quantum oscillations in metals ⓘ oscillatory electrical resistance in magnetic field ⓘ oscillatory magnetization of metals ⓘ
field	condensed matter physics ⓘ solid-state physics ⓘ
includes	Dingle damping factor ⓘ spin-splitting factor ⓘ thermal damping factor ⓘ
namedAfter	Alexei Kosevich ⓘ Evgeny Lifshitz ⓘ
relatedTo	Fermi surface cross-sectional area ⓘ Landau levels ⓘ surface form: Landau quantization Onsager reciprocal relations ⓘ surface form: Onsager relation
usedFor	analysis of quantum oscillation experiments ⓘ determination of Fermi surface properties ⓘ estimation of scattering time ⓘ measurement of effective electron mass ⓘ
usedIn	high magnetic field experiments ⓘ low-temperature physics ⓘ metal physics ⓘ semimetal studies ⓘ
usedToAnalyze	quantum oscillations in low-dimensional systems ⓘ quantum oscillations in strongly correlated materials ⓘ
usedToExtract	Fermi surface topology ⓘ cyclotron effective mass ⓘ quasiparticle lifetime ⓘ
usedToTest	Fermi liquid theory in metals ⓘ
validWhen	magnetic field is strong enough to quantize electron orbits ⓘ temperature is low compared to Fermi temperature ⓘ

Referenced by (3)

Full triples — surface form annotated when it differs from this entity's canonical label.

de Haas–van Alphen effect → relatedTo → Lifshitz–Kosevich formula ⓘ

Shubnikov–de Haas effect → theoreticalDescription → Lifshitz–Kosevich formula ⓘ

Evgeny Lifshitz → knownFor → Lifshitz–Kosevich formula ⓘ