3-Factor-criticality in double domination edge critical graphs

Abstract

A vertex subset S of a graph G is a double dominating set of G if |N[v] S|≥ 2 for each vertex v of G, where N[v] is the set of the vertex v and vertices adjacent to v. The double domination number of G, denoted by γ× 2(G), is the cardinality of a smallest double dominating set of G. A graph G is said to be double domination edge critical if γ× 2(G+e)<γ× 2(G) for any edge e E. A double domination edge critical graph G with γ× 2(G)=k is called k-γ× 2(G)-critical. A graph G is r-factor-critical if G-S has a perfect matching for each set S of r vertices in G. In this paper we show that G is 3-factor-critical if G is a 3-connected claw-free 4-γ× 2(G)-critical graph of odd order with minimum degree at least 4 except a family of graphs.