Hat guessing numbers of strongly degenerate graphs

TL;DR

This paper investigates the hat guessing number of graphs, introducing the concept of strong degeneracy, and provides bounds and exact characterizations, notably improving bounds for outerplanar and other graph classes.

Contribution

The paper introduces strong degeneracy as a new parameter to bound the hat guessing number and characterizes graphs with bounded strong degeneracy, improving existing bounds significantly.

Findings

Bound the hat guessing number using strong degeneracy.

Exact characterization of graphs with bounded strong degeneracy.

Improved upper bound for outerplanar graphs from 2^{125000} to 40.

Abstract

Assume $n$ players are placed on the $n$ vertices of a graph $G$. The following game was introduced by Winkler: An adversary puts a hat on each player, where each hat has a colour out of $q$ available colours. The players can see the hat of each of their neighbours in $G$, but not their own hat. Using a prediscussed guessing strategy, the players then simultaneously guess the colour of their hat. The players win if at least one of them guesses correctly, else the adversary wins. The largest integer $q$ such that there is a winning strategy for the players is denoted by $\text{HG}(G)$, and this is called the hat guessing number of $G$. Although this game has received a lot of attention in the recent years, not much is known about how the hat guessing number relates to other graph parameters. For instance, a natural open question is whether the hat guessing number can be bounded from above in terms of degeneracy. In this paper, we prove that the hat guessing number of a graph can be bounded from above in terms of a related notion, which we call strong degeneracy. We further give an exact characterisation of graphs with bounded strong degeneracy. As a consequence, we significantly improve the best known upper bound on the hat guessing number of outerplanar graphs from $2^{125000}$ to $40$, and further derive upper bounds on the hat guessing number for any class of $K_{2,s}$-free graphs with bounded expansion, such as the class of $C_4$-free planar graphs, more generally $K_{2,s}$-free graphs with bounded Hadwiger number or without a $K_t$-subdivision, and for Erd\H{o}s-R\'enyi random graphs with constant average degree.