de Almeida-Thouless instability in short-range Ising spin-glasses

Abstract

We use high temperature series expansions to study the J Ising spin-glass in a magnetic field in d-dimensional hypercubic lattices for d=5, 6, 7 and 8, and in the infinite-range Sherrington-Kirkpatrick (SK) model. The expansions are obtained in the variable w=2J/T for arbitrary values of u=2h/T complete to order w10. We find that the scaling dimension associated with the ordering-field h2 equals 2 in the SK model and for d 6. However, in agreement with the work of Fisher and Sompolinsky, there is a violation of scaling in a finite field, leading to an anomalous h-T dependence of the Almeida-Thouless (AT) line in high dimensions, while scaling is restored as d 6. Within the convergence of our series analysis, we present evidence supporting an AT line in d 6. In d=5, the exponents γ and are substantially larger than mean-field values, but we do not see clear evidence for the AT line in d=5.