Primary Cyclic Matrices in Irreducible Matrix Subalgebras

Abstract

Primary Cyclic matrices were used (but not named) by Holt and Rees in their version of Parker's MEAT-AXE algorithm to test irreducibility of finite matrix groups and algebras. They are matrices X with at least one cyclic component in the primary decomposition of the underlying vector space as an X-module. Let M(c,qb) be an irreducible subalgebra of M(n,q), where n=bc >c. We prove a generalisation of the Kung-Stong Cycle Index, and use it to obtain a lower bound for the proportion of primary cyclic matrices in M(c,qb). This extends work of Glasby and the second author on the case b=1.