A characterization of domination weak bicritical graphs with large diameter

Abstract

The domination number of a graph G, denoted by γ (G), is the minimum cardinality of a dominating set of G. A vertex of a graph is called critical if its deletion decreases the domination number, and a graph is called critical if its all vertices are critical. A graph G is called weak bicritical if for every non-critical vertex x∈ V(G), G-x is a critical graph with γ (G-x)=γ (G). In this paper, we characterize the connected weak bicritical graphs G whose diameter is exactly 2γ (G)-2. This is a generalization of some known results concerning the diameter of graphs with a domination-criticality.