Some sufficient conditions for path-factor uniform graphs

Abstract

For a set H of connected graphs, a spanning subgraph H of G is called an H-factor of G if each component of H is isomorphic to an element of H. A graph G is called an H-factor uniform graph if for any two edges e1 and e2 of G, G has an H-factor covering e1 and excluding e2. Let each component in H be a path with at least d vertices, where d≥2 is an integer. Then an H-factor and an H-factor uniform graph are called a P≥ d-factor and a P≥ d-factor uniform graph, respectively. In this article, we verify that (1) a 2-edge-connected graph G is a P≥3-factor uniform graph if δ(G)>α(G)+42; (2) a (k+2)-connected graph G of order n with n≥5k+3-35γ-1 is a P≥3-factor uniform graph if |NG(A)|>γ(n-3k-2)+k+2 for any independent set A of G with |A|=γ(2k+1), where k is a positive integer and γ is a real number with 13≤γ≤1.