Separating polynomial -boundedness from -boundedness

Abstract

Extending the idea from the recent paper by Carbonero, Hompe, Moore, and Spirkl, for every function f\∞\ with f(1)=1 and f(n)≥3n+13, we construct a hereditary class of graphs G such that the maximum chromatic number of a graph in G with clique number n is equal to f(n) for every n∈N. In particular, we prove that there exist hereditary classes of graphs that are -bounded but not polynomially -bounded.