Spectral properties of generalized Paley graphs and their associated irreducible cyclic codes

Abstract

For q=pm with p prime and k q-1, we consider the generalized Paley graph (k,q) = Cay(Fq, Rk), with Rk=\ xk : x ∈ Fq* \, and the irreducible p-ary cyclic code C(k,q) = \(Trq/p(γ ωik)i=0n-1)\γ ∈ Fq, with ω a primitive element of Fq and n=q-1k. We first express the spectra of (k,q) in terms of Gaussian periods. Then, we show that the spectra of (k,q) and C(k,q) are mutually determined by each other if further k q-1p-1. We give Spec((k,q)) explicitly for those graphs associated with irreducible 2-weight cyclic codes in the semiprimitive and exceptional cases. We also compute Spec((3,q)) and Spec((4,q)).