Dissipative Abelian Sandpile Models
Abstract
We introduce a family of abelian sandpile models with two parameters defined on finite lattices on -dimensional torus. Sites with or more grains of sand are unstable and topple, and in each toppling grains dissipate from the system. Because of dissipation in bulk, the models are well-defined on the shift-invariant lattices and the infinite-volume limit of systems can be taken. From the determinantal expressions, we obtain the asymptotic forms of the avalanche propagators and the height- correlations of sandpiles for large distances in the infinite-volume limit in any dimensions . We show that both of them decay exponentially with the correlation length if the dissipation rate is positive. By considering a series of models with increasing , we discuss the limit and the critical exponent defined by is determined as for all . Comparison with the limit of -state Potts model in external magnetic field is discussed.
Keywords
Cite
@article{arxiv.1505.00334,
title = {Dissipative Abelian Sandpile Models},
author = {Makoto Katori},
journal= {arXiv preprint arXiv:1505.00334},
year = {2015}
}
Comments
AMS-LaTeX, 33 pages, 6 figures