Off-Equilibrium Dynamics in Finite-Dimensional Spin Glass Models
Abstract
The low temperature dynamics of the two- and three-dimensional Ising spin glass model with Gaussian couplings is investigated via extensive Monte Carlo simulations. We find an algebraic decay of the remanent magnetization. For the autocorrelation function C(t,tw)=[< Si(t+tw)Si(tw)>]av a typical aging scenario with a t/tw scaling is established. Investigating spatial correlations we find an algebraic growth law (tw) twα(T) of the average domain size. The spatial correlation function G(r,tw)=[< Si(tw)Si+r(tw)>2]av scales with r/(tw). The sensitivity of the correlations in the spin glass phase with respect to temperature changes is examined by calculating a time dependent overlap length. In the two dimensional model we examine domain growth with a new method: First we determine the exact ground states of the various samples (of system sizes up to 100× 100) and then we calculate the correlations between this state and the states generated during a Monte Carlo simulation.
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