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Some statistics about Tropical Sandpile Model

Combinatorics 2024-02-14 v3 Dynamical Systems

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 Z2\mathbb Z^2. Given a set PP of points in a compact convex domain ΩR2\Omega\subset \mathbb R^2 this linearized model produces a tropical polynomial GP0ΩG_P{\bf 0}_\Omega. Here we present some quantitative statistical characteristics of this model and some speculative explanations. Namely, we study the dependence between the number nn of randomly dropped points P={p1,,pn}[0,1]2=ΩP=\{p_1,\dots,p_n\}\subset[0,1]^2=\Omega and the degree of the tropical polynomial GP0ΩG_{P}{\bf 0}_\Omega. We also study the distributions of the coefficients of GP0ΩG_{P}{\bf 0}_\Omega and the correlation between them. This paper's main (experimental) result is that the tropical curve C(GP0Ω)C(G_{P}{\bf 0}_\Omega) defined by GP0ΩG_{P}{\bf 0}_\Omega 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 C(GP0Ω)C(G_{P}{\bf 0}_\Omega) are of directions (1,0),(0,1),(1,1),(1,1)(1,0),(0,1),(1,1),(-1,1). The main theoretical result is that C(GP0Ω)(PΩ)C(G_{P}{\bf 0}_\Omega)\setminus (P\cap \partial\Omega), i.e. the tropical curve in Ω\Omega^\circ with marked points PP 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}
}
R2 v1 2026-06-23T09:46:08.953Z