Maximum nullity and zero forcing number on cubic graphs

Abstract

Let G be a graph. The maximum nullity of G, denoted by M(G), is defined to be the largest possible nullity over all real symmetric matrices A whose aij≠ 0 for i≠ j, whenever two vertices ui and uj of G are adjacent. In this paper, we characterize all cubic graphs with zero forcing number 3. As a corollary, it is shown that if the zero forcing number is 3, then M(G)=3. In addition, we introduce a family of cubic graphs containing graphs G with M(G)=Z(G)=4. Also, we provide an algorithm which make a relation between maximum nullity of G and the number of leaves in a spanning tree of G.