Square-free Discriminants of Matrices and the Generalized Spectral Characterizations of Graphs

Abstract

Let Sn(Z) and On(Q) denote the set of all n× n symmetric matrices over the ring of integers Z and the set of all n× n orthogonal matrices over the field of rational numbers Q, respectively. The paper is mainly concerned with the following problem: Given a matrix A∈ Sn(Z). How can one find all rational orthogonal matrices Q∈On(Q) such that QTAQ∈ Sn(Z), and in particular, when does QTAQ∈ Sn(Z) with Q∈On(Q) imply that Q is a signed permutation matrix (i.e., the matrix obtained from a permutation matrix P by replacing each 1 in P with 1 or -1)? A surprisingly simple answer was given in terms of whether the discriminant of the characteristic polynomial of A is odd and square-free, which partially answers the above questions. More precisely, let A= (φ,φ') be the discriminant of matrix A, where (φ,φ') is the resultant of the characteristic polynomial φ of A and its derivative φ'. We show that if A is odd and square-free, then QTAQ∈ Sn(Z) with Q∈On(Q) implies that Q is a signed permutation matrix. As an application, we present a simple and efficient method for testing whether a graph is determined by the generalized spectrum, which significantly extends our previous work.