Singularity of Random Matrices over Finite Fields

Abstract

Let A be an n × n random matrix with iid entries over a finite field of order q. Suppose that the entries do not take values in any additive coset of the field with probability greater than 1 - α for some fixed 0 < α < 1. We show that the singularity probability converges to the uniform limit with an exponentially small error depending only on α. We also show that the distribution of the determinant of A converges to its limiting distribution at an exponential rate.