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

Abstract

Let Gσ=(G,σ) be a signed graph and A(G,σ) be its adjacency matrix. Denote by m(G) the matching number of G. Let η(G,σ) be the nullity of (G,σ). He et al. [Bounds for the matching number and cyclomatic number of a signed graph in terms of rank, Linear Algebra Appl. 572 (2019), 273--291] proved that |V(G)|-2m(G)-c(G)≤η(G,σ)≤ |V(G)|-2m(G)+2c(G), where c(G) is the dimension of cycle space of G. Signed graphs reaching the lower bound or the upper bound are respectively characterized by the same paper. In this paper, we will prove that no signed graphs with nullity |V(G)|-2m(G)+2c(G)-1. We also prove that there are infinite signed graphs with nullity |V(G)|-2m(G)+2c(G)-s,~(0≤ s≤3c(G), s≠1) for a given c(G).