Sandpiles with finite-range interactions

Abstract

We investigate the sandpile model with Yukawa-type interactions, whose effective range is tuned by an external parameter R. Our results reveal that at specific values of R, the system exhibits giant avalanches that span the system, leading to percolation. The probability of such giant avalanches demonstrates two distinct regimes as a function of R: for sufficiently small R, it increases monotonically, whereas for large R it undergoes threshold dynamics, so that at certain values of R, the percolation probability exhibits abrupt jumps. We refer it to as pseudo-percolation transitions, based on which we propose a hierarchical percolation model at the mean-field level: each percolation transition corresponds to percolation within a disc of radius R. We further examine both local and global geometrical observables. The local quantities include avalanche size, mass, and duration and sub-avalanche mass, while for the global characterization we analyze the loop length and gyration radius of the external perimeter, as well as the mass of sub-avalanches. Remarkably, all these observables exhibit power-law scaling for all values of R, with exponents that vary systematically with R. Notably, in the vicinity of the pseudo-percolation transition points, the exponents approach characteristic values, signaling a distinct critical behavior.