Parity linkage and the Erdos-P\'osa property of odd cycles through prescribed vertices in highly connected graphs

Abstract

We show the following for every sufficiently connected graph G, any vertex subset S of G, and given integer k: there are k disjoint odd cycles in G each containing a vertex of S or there is set X of at most 2k-2 vertices such that G-X does not contain any odd cycle that contains a vertex of S. We prove this via an extension of Kawarabayashi and Reed's result about parity-k-linked graphs (Combinatorica 29, 215-225). From this result it is easy to deduce several other well known results about the Erdos-P\'osa property of odd cycles in highly connected graphs. This strengthens results due to Thomassen (Combinatorica 21, 321-333), and Rautenbach and Reed (Combinatorica 21, 267-278), respectively.