On the permanental nullity and matching number of graphs

Abstract

For a graph G with n vertices, let (G) and A(G) denote the matching number and adjacency matrix of G, respectively. The permanental polynomial of G is defined as π(G,x)= per(Ix-A(G)). The permanental nullity of G, denoted by ηper(G), is the multiplicity of the zero root of π(G,x). In this paper, we use the Gallai-Edmonds structure theorem to derive a concise formula which reveals the relationship between the permanental nullity and the matching number of a graph. Furthermore, we prove a necessary and sufficient condition for a graph G to have ηper(G)=0. As applications, we show that every unicyclic graph G on n vertices satisfies n-2(G)-1 ηper(G) n-2(G), that the permanental nullity of the line graph of a graph is either zero or one, and that the permanental nullity of a factor critical graph is always zero.