Limit shape of single-source stochastic sandpiles with p-topplings on Z

Abstract

We investigate the limit shape of the single-source model for stochastic sandpiles on the integer line subject to p--topplings. In this model, an initial configuration of n∈N particles is placed at the origin and stabilized according to a random toppling rule depending on p∈ (0,1): an unstable vertex sends exactly one particle to its left neighbor with probability p, and independently sends exactly one particle to its right neighbor with probability p. We prove that as n ∞, the macroscopic limit shape of the final stable configuration is a symmetric interval around the origin. Furthermore, by analyzing the center of mass martingale, we establish a central limit theorem for the boundary fluctuations, showing that after proper rescaling, they converge to a Gaussian distribution.