Far-apart Erdős--Pósa property of long cycles
Abstract
We prove that there exist functions f: N2 N and g: N N such that for all positive integers k, d, and 3, every graph G either contains k cycles of length at least that are pairwise at distance greater than d, or admits a subset of vertices X with |X| f(k,) such that G-BG(X,g(d)) contains no cycle of length at least , where BG(X,r) denotes the ball of radius r around X. This generalizes a theorem of Dujmović, Joret, Micek, and Morin (2024), which established the =3 case. Moreover, we prove that the theorem holds with f(k,)∈O( k k) and g(d)∈O(d). The linear bound on g is best possible, while the bound on f is optimal as a function of k for every fixed . In particular, for =3 our result improves the previous bound of O(k18polylog k) by Dujmović et al.
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