Some statistics about Tropical Sandpile Model
Abstract
Tropical sandpile model (or linearized sandpile model) is the only known continuous geometric model exhibiting self-organised criticality. This model represents the scaling limit behavior of a small perturbation of the maximal stable sandpile state on a big subset of . Given a set of points in a compact convex domain this linearized model produces a tropical polynomial . Here we present some quantitative statistical characteristics of this model and some speculative explanations. Namely, we study the dependence between the number of randomly dropped points and the degree of the tropical polynomial . We also study the distributions of the coefficients of and the correlation between them. This paper's main (experimental) result is that the tropical curve defined by is a small perturbation of the standard square grid lines. This explains a previously known fact that most of the edges of the tropical curve are of directions . The main theoretical result is that , i.e. the tropical curve in with marked points removed, is a tree.
Keywords
Cite
@article{arxiv.1906.02802,
title = {Some statistics about Tropical Sandpile Model},
author = {Nikita Kalinin and Yulieth Prieto},
journal= {arXiv preprint arXiv:1906.02802},
year = {2024}
}