Spectral Theory of the Toroidal 3D Queen Graph

Abstract

We study the adjacency spectrum of the toroidal three-dimensional queen graph Gn on (Zn)3. Since Gn is a Cayley graph on an abelian group, its adjacency matrix is diagonalized by Fourier characters. For each frequency a∈(Zn)3, the corresponding eigenvalue is λ(a)=nμ(a)-13, where μ(a) counts the queen directions orthogonal to a modulo n. In the generic odd case, meaning n odd with 3 n, the possible values of μ(a) are exactly 0,1,2,3,4, and 13, and each multiplicity is given by an explicit polynomial in n. The proof combines a geometric classification of frequency points by orthogonality type with two global counting identities.