Multicritical Nishimori point in the phase diagram of the +- J Ising model on a square lattice

Abstract

We investigate the critical behavior of the random-bond +- J Ising model on a square lattice at the multicritical Nishimori point in the T-p phase diagram, where T is the temperature and p is the disorder parameter (p=1 corresponds to the pure Ising model). We perform a finite-size scaling analysis of high-statistics Monte Carlo simulations along the Nishimori line defined by 2p-1= Tanh(1/T), along which the multicritical point lies. The multicritical Nishimori point is located at p*=0.89081(7), T*=0.9528(4), and the renormalization-group dimensions of the operators that control the multicritical behavior are y1=0.655(15) and y2 = 0.250(2); they correspond to the thermal exponent = 1/y2=4.00(3) and to the crossover exponent φ= y1/y2=2.62(6).