Spectral and Combinatorial Properties of Some Algebraically Defined Graphs

Abstract

Let k 3 be an integer, q be a prime power, and Fq denote the field of q elements. Let fi, gi∈Fq[X], 3 i k, such that gi(-X) = -\, gi(X). We define a graph S(k,q) = S(k,q;f3,g3,·s,fk,gk) as a graph with the vertex set Fqk and edges defined as follows: vertices a = (a1,a2,…,ak) and b = (b1,b2,…,bk) are adjacent if a1 b1 and the following k-2 relations on their components hold: bi-ai = gi(b1-a1)fi(b2-a2b1-a1)\;, 3 i k. We show that graphs S(k,q) generalize several recently studied examples of regular expanders and can provide many new such examples.