English

The zero forcing polynomial of a graph

Combinatorics 2019-05-20 v1

Abstract

Zero forcing is an iterative graph coloring process, where given a set of initially colored vertices, a colored vertex with a single uncolored neighbor causes that neighbor to become colored. A zero forcing set is a set of initially colored vertices which causes the entire graph to eventually become colored. In this paper, we study the counting problem associated with zero forcing. We introduce the zero forcing polynomial of a graph GG of order nn as the polynomial Z(G;x)=i=1nz(G;i)xi\mathcal{Z}(G;x)=\sum_{i=1}^n z(G;i) x^i, where z(G;i)z(G;i) is the number of zero forcing sets of GG of size ii. We characterize the extremal coefficients of Z(G;x)\mathcal{Z}(G;x), derive closed form expressions for the zero forcing polynomials of several families of graphs, and explore various structural properties of Z(G;x)\mathcal{Z}(G;x), including multiplicativity, unimodality, and uniqueness.

Keywords

Cite

@article{arxiv.1801.08910,
  title  = {The zero forcing polynomial of a graph},
  author = {Kirk Boyer and Boris Brimkov and Sean English and Daniela Ferrero and Ariel Keller and Rachel Kirsch and Michael Phillips and Carolyn Reinhart},
  journal= {arXiv preprint arXiv:1801.08910},
  year   = {2019}
}

Comments

23 pages

R2 v1 2026-06-22T23:58:33.060Z