The domination number and the least Q-eigenvalue

Abstract

A vertex set D of a graph G is said to be a dominating set if every vertex of V(G) D is adjacent to at least a vertex in D, and the domination number γ(G) (γ, for short) is the minimum cardinality of all dominating sets of G. For a graph, the least Q-eigenvalue is the least eigenvalue of its signless Laplacian matrix. In this paper, for a nonbipartite graph with both order n and domination number γ, we show that n≥ 3γ-1, and show that it contains a unicyclic spanning subgraph with the same domination number γ. By investigating the relation between the domination number and the least Q-eigenvalue of a graph, we minimize the least Q-eigenvalue among all the nonbipartite graphs with given domination number.