The central limit theorem for entries of random matrices with specific rank over finite fields

Abstract

Let Fq be the finite field of order q, and A a non-empty proper subset of Fq. Let M be a random m × n matrix of rank r over Fq taken with uniform distribution. It was proved recently by Sanna that as m,n ∞ and r,q,A are fixed, the number of entries of M in A approaches a normal distribution. The question was raised as to whether or not one can still obtain a central limit theorem of some sort when r goes to infinity in a way controlled by m and n. In this paper we answer this question affirmatively.