A Size Upper Bound for Dominating Cycles

Abstract

Recently it was shown (by the author) that every graph of size q (the number of edges) and minimum degree δ is hamiltonian if qδ2+δ-1 (arXiv:1107.2201v1). In this paper we present the exact analog of this result for dominating cycles: if G is a 2-connected graph with q8 if δ=2 and q (3(δ-1)(δ+2)-1)/2 if δ3, then each longest cycle in G is a dominating cycle. The result is sharp in all respects.