Crossover from Anomalous to Normal Diffusion: Ising Model with Stochastic Resetting

Abstract

In this paper, we investigate the dynamics of the two-dimensional Ising model with stochastic resetting, utilizing a constant resetting rate procedure with zero-strength initial magnetization. Our results reveal the presence of a characteristic rate rc L-z, where L represents the system size and z denotes the dynamical exponent. Below rc, both the equilibrium and dynamical properties remain unchanged. At the same time, for r > rc, the resetting process induces a transition in the probability distribution of the magnetization from a double-peak distribution to a three-peak distribution, ultimately culminating in a single-peak exponential decay. Besides, we also find that at the critical points, as r increases, the diffusion of the magnetization changes from anomalous to normal, and the correlation time shifts from being dependent on L to being r-dependent only.

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