On the levels of rational regular orthogonal matrices for generalized cospectral graphs

Abstract

For an n-vertex graph G with adjacency matrix A, the walk matrix W(G) of G is the matrix [e,Ae,…,An-1e], where e is the all-ones vector. Suppose that W(G) is nonsingular and p is an odd prime such that W(G) has rank n-1 over the finite field Z/pZ. Let H be a graph that is generalized cospectral with G, and Q be the corresponding rational regular orthogonal matrix satisfying QT A(G) Q=A(H). We prove that equation* vp((Q)) 12vp ( W(G)) equation* where (Q) is the minimum positive integer k such that kQ is an integral matrix, and vp(m) is the maximum nonnegative integer s such that ps divides m. This significantly improves upon a recent result of Qiu et al. [Discrete Math. 346 (2023) 113177] stating that vp((Q)) vp ( W(G))-1.