Some existence theorems on path-factor critical avoidable graphs

Abstract

A spanning subgraph F of G is called a path factor if every component of F is a path of order at least 2. Let k≥2 be an integer. A P≥ k-factor of G means a path factor in which every component has at least k vertices. A graph G is called a P≥ k-factor avoidable graph if for any e∈ E(G), G has a P≥ k-factor avoiding e. A graph G is called a (P≥ k,n)-factor critical avoidable graph if for any W⊂eq V(G) with |W|=n, G-W is a P≥ k-factor avoidable graph. In other words, G is (P≥ k,n)-factor critical avoidable if for any W⊂eq V(G) with |W|=n and any e∈ E(G-W), G-W-e admits a P≥ k-factor. In this article, we verify that (1) an (n+r+2)-connected graph G is (P≥2,n)-factor critical avoidable if I(G)>n+r+32(r+2); (2) an (n+r+2)-connected graph G is (P≥3,n)-factor critical avoidable if t(G)>n+r+22(r+2); (3) an (n+r+2)-connected graph G is (P≥3,n)-factor critical avoidable if I(G)>n+3(r+2)2(r+2); where n and r are two nonnegative integers.