Stochastic Cutoff Method for Long-Range Interacting Systems

Abstract

A new Monte-Carlo method for long-range interacting systems is presented. This method consists of eliminating interactions stochastically with the detailed balance condition satisfied. When a pairwise interaction Vij of a N-particle system decreases with the distance as rij-α, computational time per one Monte Carlo step is O(N) for α d and O(N2-α/d) for α < d, where d is the spatial dimension. We apply the method to a two-dimensional magnetic dipolar system. The method enables us to treat a huge system of 2562 spins with reasonable computational time, and reproduces a circular order originated from long-range dipolar interactions.