On the minimum rank of a graph over finite fields

Abstract

In this paper we deal with two aspects of the minimum rank of a simple undirected graph G on n vertices over a finite field q with q elements, which is denoted by (q,G). In the first part of this paper we show that the average minimum rank of simple undirected labeled graphs on n vertices over 2 is (1-n)n, were n∞ n=0. In the second part of this paper we assume that G contains a clique Kk on k-vertices. We show that if q is not a prime then (q,G) n-k+1 for 4 k n-1 and n 5. It is known that (q,G) 3 for k=n-2, n 4 and q 4. We show that for k=n-2 and each n 10 there exists a graph G such that (3,G)>3. For k=n-3, n 5 and q 4 we show that (q,G) 4.