Diameter of Some Monomial Digraphs

Abstract

Let p be a prime, e a positive integer, q = pe, and let Fq denote the finite field of q elements. Let fi : Fq2q be arbitrary functions, where 1 i l, i and l are integers. The digraph D = D(q;f), where f=(f1,…o,fl) : Fq2ql, is defined as follows. The vertex set of D is Fql+1. There is an arc from a vertex x = (x1,…o,xl+1) to a vertex y = (y1,…o,yl+1) if xi + yi = fi-1(x1,y1) for all i, 2 i l+1. In this paper we study the diameter of D(q; f) in the special case of monomial digraphs D(q; m,n): f = f1 and f1(x,y) = xm yn for some nonnegative integers m and n.