Numerical Study of the Correspondence Between the Dissipative and Fixed Energy Abelian Sandpile Models

Abstract

We consider the Abelian sandpile model (ASM) on the large square lattice with a single dissipative site (sink). Particles are added by one per unit time at random sites and the resulting density of particles is calculated as a function of time. We observe different scenarios of evolution depending on the value of initial uniform density (height) h0=0,1,2,3. During the first stage of the evolution, the density of particles increases linearly. Reaching a critical density c(h0), the system changes its behavior sharply and relaxes exponentially to the stationary state of the ASM with s=25/8. We found numerically that c(0)=s and c(h0>0) ≠ s. Our observations suggest that the equality c=s holds for more general initial conditions with non-positive heights. In parallel with the ASM, we consider the conservative fixed-energy Abelian sandpile model (FES). The extensive Monte-Carlo simulations for h0=0,1,2,3 have confirmed that in the limit of large lattices c(h0) coincides with the threshold density th(h0) of FES. Therefore, th(h0) can be identified with s if the FES starts its evolution with non-positive uniform height h0 ≤ 0.