Sufficient conditions for the existence of path-factors with given properties

Abstract

A spanning subgraph H of a graph G is called a P≥ k-factor of G if every component of H is isomorphic to a path of order at least k, where k≥2 is an integer. A graph G is called a (P≥ k,l)-factor critical graph if G-V' contains a P≥ k-factor for any V'⊂eq V(G) with |V'|=l. A graph G is called a (P≥ k,m)-factor deleted graph if G-E' has a P≥ k-factor for any E'⊂eq E(G) with |E'|=m. Intuitively, if a graph is dense enough, it will have a P≥ 3-factor. In this paper, we give some sufficient conditions for a graph to be a (P≥ 3,l)-factor critical graph or a (P≥ 3,m)-factor deleted graph. In this paper, we demonstrate that (i) G is a (P≥ 3,l)-factor critical graph if its sun toughness s(G)>l+13 and (G)≥ l+2. (ii) G is a (P≥ 3,l)-factor critical graph if its degree sum σ3(G)≥ n+2l and (G)≥ l+1. (iii) G is a (P≥ 3,m)-factor deleted graph if its sun toughness s(G)≥ m+1m+2 and (G)≥ 2m+1. (iv) G is a (P≥ 3,m)-factor deleted graph if its degree sum σ3(G)≥ n+2m and (G)≥ 2m+1.