New type degree conditions for a graph to have a 2-factor

Abstract

A 2-factor of a graph is a 2-regular spanning subgraph. For a graph G and an independent set I of G, let δG(I) denote the minimum degree of vertices contained in I. We show that (1) if every independent set I of G satisfies |I|≤ δG(I)-1, then G has a 2-factor and that (2) if every independent set I of G satisfies |I|≤ δG(I), then G has a 2-factor unless G is isomorphic to a graph in completely determined exceptional graphs. It can be easily shown that the assumption of (1) is a relaxation of the Dirac condition on Hamiltonicity of graphs, and that the assumption of (2) is a relaxation of the Chv\'atal-Erdos condition on Hamiltonicity of graphs. Furthermore, for graphs with the assumption of (1), we show some results on a 2-factor with a bounded number of cycles.

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