Sandpiles on the square lattice

Abstract

We give a non-trivial upper bound for the critical density when stabilizing i.i.d. distributed sandpiles on the lattice Z2. We also determine the asymptotic spectral gap, asymptotic mixing time and prove a cutoff phenomenon for the recurrent state abelian sandpile model on the torus ( Z / mZ )2. The techniques use analysis of the space of functions on Z2 which are harmonic modulo 1. In the course of our arguments, we characterize the harmonic modulo 1 functions in p(Z2) as linear combinations of certain discrete derivatives of Green's functions, extending a result of Schmidt and Verbitskiy.