Dynamical CPA approach to an itinerant fermionic spin glass model
Abstract
We study a fermionic version of the Sherrington-Kirkpatrick model including nearest-neighbor hopping on a
∞
-dimensional simple cubic lattices. The problem is reduced to one of free fermions moving in a dynamical effective random medium. By means of a CPA method we derive a set of self-consistency equations for the spin glass order parameter and for the Fourier components of the local spin susceptibility. In order to solve these equations numerically we employ an approximation scheme which restricts the dynamics to a feasible number of the leading Fourier components. From a sequence of systematically improved dynamical approximations we estimate the location of the quantum critical point.