The Half-integral Erd\"os-P\'osa Property for Non-null Cycles

Abstract

A Group Labeled Graph is a pair (G,) where G is an oriented graph and is a mapping from the arcs of G to elements of a group. A (not necessarily directed) cycle C is called non-null if for any cyclic ordering of the arcs in C, the group element obtained by `adding' the labels on forward arcs and `subtracting' the labels on reverse arcs is not the identity element of the group. Non-null cycles in group labeled graphs generalize several well-known graph structures, including odd cycles. In this paper, we prove that non-null cycles on Group Labeled Graphs have the half-integral Erd\"os-P\'osa property. That is, there is a function f: N N such that for any k∈ N, any group labeled graph (G,) has a set of k non-null cycles such that each vertex of G appears in at most two of these cycles or there is a set of at most f(k) vertices that intersects every non-null cycle. Since it is known that non-null cycles do not have the integeral Erd\"os-P\'osa property in general, a half-integral Erd\"os-P\'osa result is the best one could hope for.