Complex temperature plane zeros in the mean-field approximation

The distribution of zeros of the partition function of the random energy model is described both for the complex temperature and magnetic field planes. There are regions where these zeros become dense. It is shown that for T < T c a dense region of zeros reaches the real magnetic field axis as the t

Zeros of the moment of the partition function ½Z n J with respect to complex n are investigated in the zero-temperature limit b-1, n-0 keeping y ¼ bn % Oð1Þ. We numerically investigate the zeros of the 7 J Ising spin-glass models on several Cayley trees and hierarchical lattices and compare those re

The explicit expression for the Gaussian approximation about any possible mean-field of a given Hamiltonian is derived using functional integration techniques that generalizes the Hubbard-Stratonovich transformation. In the limit of weak two-body potentials it is shown that the Gaussian approximatio