Statics and dynamics of the infinite-range Ising spin glass model

Abstract

The Sherrington-Kirkpatrick (SK) spin glass model (1975) is studied by Monte Carlo simulation. Below T_c there is a spectrum of relaxation times which diverge like exp(cN¹4/) as N, the number of spins, tends to infinity. In zero field, h, there is one more timescale, tau _eg, which is the time to turn over all the spins. Averaging over samples (ln tau _eg)_j(=ln tau _eg) varies as N¹2/. However, ln tau _eg is not a self-averaging quantity and there are large sample-to-sample variations even for N to infinity . For h>>h*=T/N¹2/, where T is the temperature, fluctuations on timescale tau _eg may not occur. Above the Almeida-Thouless line (1978) relaxation times are finite and the SK solution is correct. Below this line, the results agree well with Parisi's theory (1983) if the latter is correctly interpreted.