Ising Model with Power Law Resetting

Abstract

We investigate the nonequilibrium dynamics of the nearest-neighbour Ising model subjected to stochastic resetting, where the system is intermittently returned to an initial configuration with magnetisation m0, with the inter-reset times drawn from the power law distribution α τ0α / τα+1. The heavy-tailed resets generate magnetisation distributions that differ significantly from both equilibrium dynamics and the previously studied Ising model with exponentially distributed reset times. In two dimensions, for T > TC, we find a quasi-ferro state for all α, marked by a double-peaked distribution that diverges at m=0 and m=m0; no steady state exists for α < 1, while a stationary state emerges for α > 1. For T < TC, power law resetting produces two distinct regimes separated by a crossover exponent α* = 1-c: a single-peak ferromagnetic phase localised at meq for α < α*, and a dual-peak ferromagnetic phase with divergences at meq and m0 for α > α*. Analytic results in one and two dimensions, supported by simulations, yield a rich phase diagram in the (T,α) plane and reveal how heavy-tailed resetting generates nonequilibrium phases very different from those seen in the case of exponential resetting.