A Degree Condition for Graphs Having All (a,b)-Parity Factors

Abstract

Let a and b be positive integers such that a≤ b and a b 2. We say that G has all (a, b)-parity factors if G has an h-factor for every function h: V(G) → \a,a+2,…,b-2,b\ with b|V(G)| even and h(v) b 2 for all v∈ V(G). In this paper, we prove that every graph G with n≥ 3(b+1)(a+b) vertices has all (a,b)-parity factors if δ(G)≥ (b2-b)/a, and for any two nonadjacent vertices u,v ∈ V(G), \dG(u),dG(v)\≥ bna+b. Moreover, we show that this result is best possible in some sense.