Nilpotent-independent sets and estimation in matrix algebras

Abstract

Efficient methods for computing with matrices over finite fields often involve randomised algorithms, where matrices with a certain property are sought via repeated random selection. Complexity analyses for these algorithms require knowledge of the proportion of relevant matrices in the ambient group or algebra. We introduce a method for estimating proportions of families N of elements in the algebra of all d× d matrices over a field of order q, where membership of a matrix in N depends only on its `invertible part'. The method is based on estimating proportions of certain subsets of GL(d,q) depending on N, so that existing estimation techniques for nonsingular matrices can be leveraged to deal with families containing singular matrices. As an application we investigate primary cyclic matrices, which are used in the Holt-Rees MEAT-AXE algorithm for testing irreducibility of matrix algebras.