English

Non-Stabilizing Parallel Chip-Firing Games

Combinatorics 2024-08-27 v2

Abstract

In 2010, Kominers and Kominers proved that any parallel chip-firing game on G(V,E)G(V,\,E) with σ4EV|\sigma|\geq 4|E|-|V| chips stabilizes. Recently, Bu, Choi, and Xu made the bound exact: all games with σ<E|\sigma|< |E| chips or σ>3EV|\sigma|> 3|E|-|V| chips stabilize. Meanwhile, Levine found a "devil's staircase'' pattern in the plot of the activity of parallel chip-firing games against their density of chips. The stabilizing bound of Bu, Choi, and Xu corresponds to the top and bottom stairs of this staircase, in which the activity is 1 and 0, respectively. In this paper, we analyze the middle stair of the staircase, corresponding to activity 12\frac{1}{2}. We prove that all parallel chip-firing games with 2EV<σ<2E2|E|-|V|< |\sigma|< 2|E| have period T3,4T\neq 3,\,4. In fact, this is exactly the range of σ|\sigma| for which all games are non-stabilizing. We conjecture that all parallel chip-firing games with 2EV<σ<2E2|E|-|V|< |\sigma|<2|E| have T=2T=2 and thus activity 12\frac{1}{2}. This conjecture has been proven for trees by Bu, Choi, and Xu, cycles by Dall'asta, and complete graphs by Levine. We extend Levine's method of conjugate configurations to prove the conjecture on complete bipartite graphs Ka,aK_{a,a}.

Cite

@article{arxiv.2408.10508,
  title  = {Non-Stabilizing Parallel Chip-Firing Games},
  author = {David Ji and Michael Li and Daniel Wang},
  journal= {arXiv preprint arXiv:2408.10508},
  year   = {2024}
}

Comments

11 pages

R2 v1 2026-06-28T18:17:37.146Z