A spectral Erdos-P\'osa Theorem

Abstract

A set of cycles is called independent if no two of them have a common vertex. Let Sn, 2k-1 be the complete split graph, which is the join of a clique of size 2k-1 with an independent set of size n-2k+1. In 1962, Erdos and P\'osa established the following edge-extremal result: for every graph G of order n which contains no k independent cycles, where k≥2 and n≥ 24k, we have e(G)≤ (2k-1)(n-k), with equality if and only if G Sn,2k-1. In this paper, we prove a spectral version of Erdos-P\'osa Theorem. Let k≥1 and n≥ 16(2k-1)λ2 with λ=1120k2. If G is a graph of order n which contains no k independent cycles, then (G)≤ (Sn,2k-1), the equality holds if and only if G Sn,2k-1. This presents a new example illustration for which edge-extremal problems have spectral analogues. Finally, a related problem is proposed for further research.