Cop numbers of periodic graphs

TL;DR

This paper explores the cop number in periodic graphs, comparing it to their footprints, establishing bounds, and providing examples to understand how periodicity influences pursuit-evasion game outcomes.

Contribution

It introduces new bounds and insights into the cop number of periodic graphs and their footprints, highlighting differences and relationships not previously characterized.

Findings

Smallest periodic graph with cop number 3 has at most 8 nodes

Smallest graph with cop number 3 has 10 nodes

Cop number can be loosely tied to properties like treewidth of the footprint

Abstract

A \emph{periodic graph} ${\cal G}=(G_0, G_1, G_2, \dots)$ with period $p$ is an infinite periodic sequence of graphs $G_i = G_{i + p} = (V,E_i)$, where $i \geq 0$. The graph $G=(V,\cup_i E_i)$ is called the footprint of ${\cal G}$. Recently, the arena where the Cops and Robber game is played has been extended from a graph to a periodic graph; in this case, the \emph{cop number} is also the minimum number of cops sufficient for capturing the robber. We study the connections and distinctions between the cop number $c({\cal G})$ of a periodic graph ${\cal G}$ and the cop number $c(G)$ of its footprint $G$ and establish several facts. For instance, we show that the smallest periodic graph with $c({\cal G}) = 3$ has at most $8$ nodes; in contrast, the smallest graph $G$ with $c(G) = 3$ has $10$ nodes. We push this investigation by generating multiple examples showing how the cop numbers of a periodic graph ${\cal G}$, the subgraphs $G_i$ and its footprint $G$ can be loosely tied. Based on these results, we derive upper bounds on the cop number of a periodic graph from properties of its footprint such as its treewidth.