Parking functions and chip-firing on hypergraphs
Abstract
For a connected graph with sink vertex , a -parking function is a vector of nonnegative integers whose entries are determined by cut-sets in . Such objects also arise as the superstable configurations in the context of chip-firing. The set of all -parking functions have various algebraic and combinatorial properties; for instance they relate to evaluations of the Tutte polynomial and in particular are counted by spanning trees of . We extend these constructions to the setting of hypergraphs, where edges can have multiple vertices. For a hypergraph with sink , we define -parking functions in terms of cuts in and prove that the maximal such sequences are characterized by certain acyclic orientations of . We introduce a notion of a -rooted spanning tree for , and prove that the set of all such objects are counted by -parking functions. We also show how -parking functions can be recovered as the superstable configurations in a version of chip-firing on , where chips have a choice of where to go when fired. We prove that one can recover such configurations via chip-firing on a family of digraphs associated to .
Cite
@article{arxiv.2508.09720,
title = {Parking functions and chip-firing on hypergraphs},
author = {Timothy Blanton and Anton Dochtermann and Isabelle Hong and SuHo Oh and Zhan Zhan},
journal= {arXiv preprint arXiv:2508.09720},
year = {2025}
}
Comments
30 pages, 11 figures