Some New Results In Random Matrices Over Finite Fields

In this note, we give various characterizations of random walks with possibly different steps that have relatively large discrepancy from the uniform distribution modulo a prime p, and use these results to study the distribution of the rank of random matrices over Fp and the equi-distribution behavior of normal vectors of random hyperplanes. We also study the probability that a random square matrix is eigenvalue-free, or when its characteristic polynomial is divisible by a given irreducible polynomial in the limit n ->infinity in Fp. We show that these statistics are universal, extending results of Stong and Neumann-Praeger beyond the uniform model.