Spectral properties of generalized Paley graphs (2310.15378v2)

Abstract: We study the spectrum of generalized Paley graphs $\Gamma(k,q)=Cay(\mathbb{F}q,R_k)$, undirected or not, with $R_k={x^k:x\in \mathbb{F}_q^*}$ where $q=p^m$ with $p$ prime and $k\mid q-1$. We first show that the eigenvalues of $\Gamma(k,q)$ are given by the Gaussian periods $\eta{i}^{(k,q)}$ with $0\le i\le k-1$. Then, we explicitly compute the spectrum of $\Gamma(k,q)$ with $1\le k \le 4$ and of $\Gamma(5,q)$ for $p\equiv 1\pmod 5$ and $5\mid m$. Also, we characterize those GP-graphs having integral spectrum, showing that $\Gamma(k,q)$ is integral if and only if $p$ divides $(q-1)/(p-1)$. Next, we focus on the family of semiprimitive GP-graphs. We show that they are integral strongly regular graphs (of pseudo-Latin square type). Finally, we characterize all integral Ramanujan graphs $\Gamma(k,q)$ with $1\le k \le 4$ or where $(k,q)$ is a semiprimitive pair.