A Degree Condition for a Graph to have (a,b)-Parity Factors

Abstract

Let a,b,n be three positive integers such that a b 2 and n≥ b(a+b)(a+b+2)/(2a). Let G be a graph of order n with minimum degree at least a+b/a-1. We show that G has an (a,b)-parity factor, if max\dG(u),dG(v)\≥ ana+b for any two nonadjacent vertices u,v of G. It is an extension of Nishimura's results for the existence of k-factors (J. Graph Theory, 16 (1992), 141--151) and generalizes Li and Cai's result in some senses (J. Graph Theory, 27 (1998), 1--6). These conditions are tight.