Effective action for the Kondo lattice model. New approach for S=1/2

Abstract

In the partition function of the Kondo lattice (KL), spin matrices are exactly replaced by bilinear combinations of Fermi operators with the purely imaginary chemical potential λ=−iπ T/2 (Popov representation). This new representation of spin operators allows one to introduce new Green's Functions (GF) with Matsubara frequencies ω n=2 πT(n+ 1 4 ) for S= 1 2 . A simple temperature diagram technique is constructed with the path integral method. This technique is standard and does not contain the complicated combinatoric rules characteristic of most of the known variants of the diagram techniques for spin systems. The effective action for the almost antiferromagnetic KL problem is derived.