On the Erdos-P\'osa property for long holes in C4-free graphs
Abstract
We prove that there exists a function f(k)=O(k2 k) such that for every C4-free graph G and every k ∈ N, G either contains k vertex-disjoint holes of length at least 6, or a set X of at most f(k) vertices such that G-X has no hole of length at least 6. This answers a question of Kim and Kwon [Erdos-P\'osa property of chordless cycles and its applications. JCTB 2020].
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