Nonanalytic Corrections to the Landau Diamagnetic Susceptibility

Abstract

We analyze potential non-analytic terms in the Landau diamagnetic susceptibility, dia, at a finite temperature T and/or in-plane magnetic field H in a two-dimensional (2D) Fermi liquid. To do this, we express the diamagnetic susceptibility as dia = (e/c)2 Q→0 JJ (Q)/Q2, where JJ is the transverse component of the static current-current correlator, and evaluate JJ (Q) for a system of fermions with Hubbard interaction to second order in Hubbard U by combining self energy, Maki-Thompson, and Aslamazov-Larkin diagrams. We find that at T=H=0, the expansion of JJ (Q)/Q2 in U is regular, but at a finite T and/or H, it contains U2 T and/or U2 |H| terms. Similar terms have been previously found for the paramagnetic Pauli susceptibility. We obtain the full expression for the non-analytic δ dia (H,T) when both T and H are finite, and show that the H/T dependence is similar to that for the Pauli susceptibility.