An arithmetic criterion for graphs being determined by their generalized Aα-spectrum

Abstract

Let G be a graph on n vertices, its adjacency matrix and degree diagonal matrix are denoted by A(G) and D(G), respectively. In 2017, Nikiforov 0007 introduced the matrix Aα(G)=α D(G)+(1-α)A(G) for α∈ [0, 1]. The Aα-spectrum of a graph G consists of all the eigenvalues (including the multiplicities) of Aα(G). A graph G is said to be determined by the generalized Aα-spectrum (or, DGAαS for short) if whenever H is a graph such that H and G share the same Aα-spectrum and so do their complements, then H is isomorphic to G. In this paper, when α is rational, we present a simple arithmetic condition for a graph being DGAαS. More precisely, put Acα:=cαAα(G), here cα is the smallest positive integer such that Acα is an integral matrix. Let Wα(G)=[ 1,Acα 1cα,…, Acαn-1 1cα], where 1 denotes the all-ones vector. We prove that if Wα(G)2n2 is an odd and square-free integer and the rank of Wα(G) is full over Fp for each odd prime divisor p of cα, then G is DGAαS except for even n and odd cα\,(≥slant 3). By our obtained results in this paper we may deduce the main results in 0005 and 0002.