An improved condition for a graph to be determined by its generalized spectrum

Abstract

A fundamental and challenging problem in spectral graph theory is to characterize which graphs are uniquely determined by their spectra. In Wang [J. Combin. Theory, Ser. B, 122 (2017): 438-451], the author proved that an n-vertex graph G is uniquely determined by its generalized spectrum (DGS) whenever 2-n2 W is odd and square-free. Here, W is the walk matrix of G, namely, W=[e,Ae,…,An-1e] with e all-one vector and A the adjacency matrix of G. In this paper, we focus on a larger family of graphs with dn square-free, where dn refers to the last invariant factor of W. We introduce a new kind of polynomials for a graph G associated with a prime p. Such a polynomial is invariant under generalized cospectrality. Using the newly defined polynomials, we obtain a sufficient condition for a graph in the larger family to be DGS. The main result of this paper improves upon the aforementioned result of Wang while the proof for the main result gives a new way to attack the problem of generalized spectral characterization of graphs.

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