No mixed graph with the nullity η(G)=|V(G)|-2m(G)+2c(G)-1

Abstract

A mixed graph G is obtained from a simple undirected graph G, the underlying graph of G, by orienting some edges of G. Let c(G)=|E(G)|-|V(G)|+ω(G) be the cyclomatic number of G with ω(G) the number of connected components of G, m(G) be the matching number of G, and η(G) be the nullity of G. Chen et al. (2018)LSC and Tian et al. (2018)TFL proved independently that |V(G)|-2m(G)-2c(G) ≤ η(G) ≤ |V(G)|-2m(G)+2c(G), respectively, and they characterized the mixed graphs with nullity attaining the upper bound and the lower bound. In this paper, we prove that there is no mixed graph with nullity η(G)=|V(G)|-2m(G)+2c(G)-1. Moreover, for fixed c(G), there are infinitely many connected mixed graphs with nullity |V(G)|-2m(G)+2c(G)-s ( 0 ≤ s ≤ 3c(G), s≠1 ) is proved.