Distance spectral radius and Hb-factors in graphs

Abstract

Let G be a connected graph, and let b≥2 be an even integer. The distance spectral radius of G is denoted by μ(G). An Hb-factor of G is a spanning subgraph F of G with dF(v)∈\1,3,5,…,b-1,b\ for any v∈ V(G), where dF(v) is the degree of v in F. Lu and Wang provided a sufficient condition with respect to the number of odd components in G-S for a connected graph G of even order to contain an Hb-factor, where S is a vertex subset of G [H. Lu, D. Wang, On Cui-Kano's characterization problem on graph factors, J. Graph Theory 74 (2013) 335--343]. In this paper, motivated by Lu and Wang's above result, we establish an upper bound on the distance spectral radius μ(G) of a connected graph G to guarantee that G contains an Hb-factor.