Erdos--P\'osa property of cycles that are far apart

Abstract

We prove that there exist functions f,g:N such that for all nonnegative integers k and d, for every graph G, either G contains k cycles such that vertices of different cycles have distance greater than d in G, or there exists a subset X of vertices of G with |X|≤ f(k) such that G-BG(X,g(d)) is a forest, where BG(X,r) denotes the set of vertices of G having distance at most r from a vertex of X.

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