An Upper Bound on the Number of Generalized Cospectral Mates of Oriented Graphs

Abstract

This paper examines the spectral characterizations of oriented graphs. Let be an n-vertex oriented graph with skew-adjacency matrix S. Previous research mainly focused on self-converse oriented graphs, proposing arithmetic conditions for these graphs to be uniquely determined by their generalized skew-spectrum (DGSS). However, self-converse graphs are extremely rare; this paper considers a more general class of oriented graphs Gn (not limited to self-converse graphs), consisting of all n-vertex oriented graphs such that 2- n2 W() is an odd and square-free integer, where W()=[e,Se,…,Sn-1e] (e is the all-one vector) is the skew-walk matrix of . Given that is cospectral with its converse T, there always exists a unique regular rational orthogonal Q0 such that Q0 TSQ0=-S. This study reveals that there exists a deep relationship between the level 0 of Q0 and the number of generalized cospectral mates of . More precisely, we show, among others, that the maximum number of generalized cospectral mates of ∈Gn is at most 2t-1, where t is the number of prime factors of 0. Moreover, some numerical examples are also provided to demonstrate that the above upper bound is attainable. Finally, we also provide a criterion for the oriented graphs ∈Gn to be weakly determined by the generalized skew-spectrum (WDGSS).

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