Quadratic unitary Cayley graphs of finite commutative rings

Abstract

The purpose of this paper is to study spectral properties of a family of Cayley graphs on finite commutative rings. Let R be such a ring and R× its set of units. Let QR=\u2: u∈ R×\ and TR=QR(-QR). We define the quadratic unitary Cayley graph of R, denoted by GR, to be the Cayley graph on the additive group of R with respect to TR; that is, GR has vertex set R such that x, y ∈ R are adjacent if and only if x-y∈ TR. It is well known that any finite commutative ring R can be decomposed as R=R1× R2×·s× Rs, where each Ri is a local ring with maximal ideal Mi. Let R0 be a local ring with maximal ideal M0 such that |R0|/|M0| 3\,(\,4). We determine the spectra of GR and GR0× R under the condition that |Ri|/|Mi| 1\,(\,4) for 1 i s. We compute the energies and spectral moments of such quadratic unitary Cayley graphs, and determine when such a graph is hyperenergetic or Ramanujan.