Spectral radius and [a,b]-factors in graphs

Abstract

An [a,b]-factor of a graph G is a spanning subgraph H such that a≤ dH(v)≤ b for each v∈ V(G). In this paper, we provide spectral conditions for the existence of an odd [1,b]-factor in a connected graph with minimum degree δ and the existence of an [a,b]-factor in a graph, respectively. Our results generalize and improve some previous results on perfect matchings of graphs. For a=1, we extend the result of OS.O to obtain an odd [1,b]-factor and further improve the result of Liu, Liu and FengW.L for a=b=1. For n≥ 3a+b-1, we confirm the conjecture of Cho, Hyun, O and ParkE.C. We conclude some open problems in the end.