Primary decomposition theorem and generalized spectral characterization of graphs

Abstract

Suppose G is a controllable graph of order n with adjacency matrix A. Let W=[e,Ae,…,An-1e] (e is the all-one vector) and =Πi>j(αi-αj)2 (αi's are eigenvalues of A) be the walk matrix and the discriminant of G, respectively. Wang and Yu wangyu2016 showed that if θ(G):=\2-n2 W,\ is odd and squarefree, then G is determined by its generalized spectrum (DGS). Using the primary decomposition theorem, we obtain a new criterion for a graph G to be DGS without the squarefreeness assumption on θ(G). Examples are further given to illustrate the effectiveness of the proposed criterion, compared with the two existing methods to deal with the difficulty of non-squarefreeness.

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