Reuniting -boundedness with polynomial -boundedness
Abstract
A class F of graphs is -bounded if there is a function f such that (H) f(ω(H)) for all induced subgraphs H of a graph in F. If f can be chosen to be a polynomial, we say that F is polynomially -bounded. Esperet proposed a conjecture that every -bounded class of graphs is polynomially -bounded. This conjecture has been disproved; it has been shown that there are classes of graphs that are -bounded but not polynomially -bounded. Nevertheless, inspired by Esperet's conjecture, we introduce Pollyanna classes of graphs. A class C of graphs is Pollyanna if C F is polynomially -bounded for every -bounded class F of graphs. We prove that several classes of graphs are Pollyanna and also present some proper classes of graphs that are not Pollyanna.
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