Sandpile on uncorrelated site-diluted percolation lattice; From three to two dimensions

Abstract

The BTW sandpile model is considered on three dimensional percolation lattice which is tunned with the occupation parameter p. Along with the three-dimensional avalanches, we study the energy propagation in two-dimensional cross-sections. We use the moment analysis to extract the exponents for two separate cases: the critical (p=pc pc3D) and the off-critical (pc<p≤ 1) cases. The three-dimensional avalanches at p=pc has exponents like the regular 2D BTW model, whereas the exponents for the 2D cross-sections have serious similarities with the 2D critical Ising model. The moment analysis show that finite size scaling theory is the fulfilled, and some hyper-scaling relations are confirmed. For the off-critical lattice, the exponents change logarithmically with p-pc, for which the cut-off exponents drop discontinuously from p=pc to the other values. The analysis for the 2D cross-sections show a singular behavior at some p0≈ pc2D (pc3D and pc2D being three- and two-dimensional percolation thresholds). We argue that there are two separate phases in the cross-sections, namely pc3D≤ p<pc2D which, due to lack of 2D percolation cluster, has no thermodynamic limit, and p≥ pc2D having the chance to involve percolated clusters.