Fractals of Simple Random Walks in Two Dimensions: A Monte Carlo Study

Abstract

We present a Monte Carlo study of the fractal geometry of clusters formed by discrete-time simple random walks (sRW) of L2 steps on a periodic square L× L lattice. We verify with high precision that the asymptotic behavior of the cluster mass follows M/L2 ( L)-1 [π2+b ( L)-2], with b≈ -(π/2)-2, demonstrating marginal ``logarithmic fractals". We further determine the fractal dimension of the hull to be d hull=1.333\,29(14)=4/3, in excellent agreement with the prediction of Schramm-Loewner evolution ( SLE8/3) for the Brownian frontier universality class. More importantly, we analyze the chemical distance S spanning the cluster and obtain strong evidence that it asymptotically scales as S L( L)1/4, lying exactly on the theoretical upper bound for the chemical distance for level-set percolation clusters on the two-dimensional Gaussian free field. Our numerical results show that the sRW cluster exhibits a conformally invariant external frontier and contains highly efficient asymptotically linear connective paths.