Tight Toughness and Isolated Toughness for \K2,Cn\-factor critical avoidable graph

Abstract

A spannning subgraph F of G is a \K2,Cn\-factor if each component of F is either K2 or Cn. A graph G is called a (\K2,Cn\,n)-factor critical avoidable graph if G-X-e has a \K2,Cn\-factor for any S⊂eq V(G) with |X|=n and e∈ E(G-X). In this paper, we first obtain a sufficient condition with regard to isolated toughness of a graph G such that G is \K2,Cn\-factor critical avoidable. In addition, we give a sufficient condition with regard to tight toughness and isolated toughness of a graph G such that G is \K2,C2i+1|i ≥slant 2\-factor critical avoidable respectively.