Long cycles have the edge-Erdos-P\'osa property
Abstract
We prove that the set of long cycles has the edge-Erdos-P\'osa property: for every fixed integer 3 and every k∈N, every graph G either contains k edge-disjoint cycles of length at least (long cycles) or an edge set X of size O(k2 k + k) such that G-X does not contain any long cycle. This answers a question of Birmel\'e, Bondy, and Reed (Combinatorica 27 (2007), 135--145).
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