English

Paley-like graphs over finite fields from vector spaces

Combinatorics 2022-10-10 v1 Number Theory

Abstract

Motivated by the well-known Paley graphs over finite fields and their generalizations, in this paper we explore a natural multiplicative-additive analogue of such graphs arising from vector spaces over finite fields. Namely, if n2n\ge 2 and UFqnU\subsetneq \mathbb F_{q^n} is an Fq\mathbb F_q-vector space, GUG_{U} is the (undirected) graph with vertex set V(GU)=FqnV(G_U)=\mathbb F_{q^n} and edge set E(GU)={(a,b)Fqn2ab,abU}E(G_U)=\{(a, b)\in \mathbb F_{q^n}^2\,|\, a\ne b, ab\in U\}. We describe the structure of an arbitrary maximal clique in GUG_U and provide bounds on the clique number ω(GU)\omega(G_U) of GUG_U. In particular, we compute the largest possible value of ω(GU)\omega(G_U) for arbitrary qq and nn. Moreover, we obtain the exact value of ω(GU)\omega(G_U) when UFqnU\subsetneq \mathbb F_{q^n} is any Fq\mathbb F_q-vector space of dimension dU{1,2,n1}d_U\in \{1, 2, n-1\}.

Keywords

Cite

@article{arxiv.2210.03236,
  title  = {Paley-like graphs over finite fields from vector spaces},
  author = {Lucas Reis},
  journal= {arXiv preprint arXiv:2210.03236},
  year   = {2022}
}

Comments

Accepted for publication in Finite Fields and Their Applications

R2 v1 2026-06-28T02:58:08.133Z