https://doi.org/10.1007/s100510170047
Magnetoquantum de Haas-van Alphen oscillations in spin-split two-dimensional Fermi liquid
Technion-Israel Institute of Technology, Department of Chemistry, Haifa 32000, Israel
Corresponding author: a chr40im@techunix.technion.ac.il
Received:
20
December
2000
Revised:
13
July
2001
Published online: 15 October 2001
Theory of magnetoquantum oscillations with spin-split structure in strongly anisotropic (two-dimensional (2D)) metal is developed in the formalism of level approach. Parametric method for exact calculation of oscillations wave forms and amplitudes, developed earlier for spin degenerate levels is generalized on a 2D electron system with spin-split levels. General results are proved: 1) proportionality relation between magnetization and chemical potential oscillations accounting for spin-split energy levels and magnetic field unperturbed levels (states of reservoir), 2) basic equation for chemical potential oscillations invariant to various models of 2D and 1D energy bands (intersecting or overlapping) and localized states. Equilibrium transfer of carriers between overlapping 2D and 1D bands, characterizing the band structure of organic quasi 2D metals, is considered. Transfer parameter, calculated in this model to be of the order of unity, confirms the fact that the wave form of oscillations in organic metals should be quasisymmetric up to ultralow temperature. Presented theory accounts for spin-split magnetization oscillations at magnetic field directions tilted relative to the anisotropic axis of a metal. Theoretical results are compared with available experimental data on organic quasi-2D metal α-(BEDT-TTF)2KHg(SNC)4 explaining the appearance of clear split structure under the kink magnetic field and absence above by the corresponding change in the electron g-factor rather than cyclotron mass.
PACS: 75.20.-g – Diamagnetism, paramagnetism, and superparamagnetism / 75.20.En – Metals and alloys / 75.30.Cr – Saturation moments and magnetic susceptibilities
© EDP Sciences, Società Italiana di Fisica, Springer-Verlag, 2001