Component factors in K1,r-free graphs

Abstract

A graph is said to be K1,r-free if it does not contain an induced subgraph isomorphic to K1,r. An F-factor is a spanning subgraph H such that each connected component of H is isomorphic to some graph in F. In particular, H is called an \P2,P3\-factor of G if F=\P2,P3\; H is called an Sn-factor of G if F=\K1,1,K1,2,K1,3,...,K1,n\, where n≥2. A spanning subgraph of a graph G is called a P≥ k-factor of G if its each component is isomorphic to a path of order at least k, where k≥2. A graph G is called a F-factor covered graph if there is a F-factor of G including e for any e∈ E(G). In this paper, we give a minimum degree condition for a K1,r-free graph to have an Sn-factor and a P≥ 3-factor, respectively. Further, we obtain sufficient conditions for K1,r-free graphs to be P≥ 2-factor, P≥ 3-factor or \P2,P3\-factor covered graphs. In addition, examples show that our results are sharp.