Structure and linear-Pollyanna for some square-free graphs

Abstract

We use Pt and Ct to denote a path and a cycle on t vertices, respectively. A bull is a graph consisting of a triangle with two disjoint pendant edges, a hammer is a graph obtained by identifying an endvertex of a P3 with a vertex of a triangle. A class F is -bounded if there is a function f such that (G)≤ f(ω(G)) for all induced subgraphs G of a graph in F. A class C of graphs is Pollyanna (resp. linear-Pollyanna) if C F is polynomially (resp. linear-polynomially) -bounded for every -bounded class F of graphs. Chudnovsky et al CCDO2023 showed that both the classes of bull-free graphs and hammer-free graphs are Pollyannas. Let G be a connected graph with no clique cutsets and no universal cliques. In this paper, we show that G is (C4, hammer)-free if and only if it has girth at least 5, and G is (C4, bull)-free if and only if it is a clique blowup of some graph of girth at least 5. As a consequence, we show that both the classes of (C4, bull)-free graphs and (C4, hammer)-free graphs are linear-Pollyannas.

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