English

A simple arithmetic criterion for graphs being determined by their generalized spectra

Combinatorics 2014-10-22 v3

Abstract

A graph GG is said to be determined by its generalized spectrum (DGS for short) if for any graph HH, HH and GG are cospectral with cospectral complements implies that HH is isomorphic to GG. It turns out that whether a graph GG is DGS is closely related to the arithmetic properties of its walk-matrix. More precisely, let AA be the adjacency matrix of a graph GG, and let W=[e,Ae,A2e,...,An1e]W =[e, Ae, A^2e,...,A^{n-1}e] (ee is the all-one vector) be its \textit{walk-matrix}. Denote by Gn\mathcal{G}_n the set of all graphs on nn vertices with det(W)0\det(W)\neq 0. In [Wang, Generalized spectral characterization of graphs revisited, The Electronic J. Combin., 20 (4),(2013), #P4P_4], the author defined a large family of graphs Fn={GGndet(W)2n2is an odd squarefree integer}\mathcal{F}_n = \{G \in{\mathcal{G}_n}|\frac{\det(W)}{2^{\lfloor\frac{n}{2}\rfloor}}{is~ an ~odd~ square-free~ integer}\} (which may have positive density among all graphs, as suggested by some numerical experiments) and conjectured every graph in Fn\mathcal{F}_n is DGS. In this paper, we show that the conjecture is actually true, thereby giving a simple arithmetic condition for determining whether a graph is DGS.

Keywords

Cite

@article{arxiv.1410.2164,
  title  = {A simple arithmetic criterion for graphs being determined by their generalized spectra},
  author = {Wei Wang},
  journal= {arXiv preprint arXiv:1410.2164},
  year   = {2014}
}
R2 v1 2026-06-22T06:16:50.714Z