Proportion of cyclic matrices in maximal reducible matrix algebras
Abstract
Let M(V)= M(n,Fq) denote the algebra of n× n matrices over Fq, and let M(V)U denote the (maximal reducible) subalgebra that normalizes a given r-dimensional subspace U of V=Fqn where 0<r<n. We prove that the density of non-cyclic matrices in M(V)U is at least q-2(1+c1q-1), and at most q-2(1+c2q-1), where c1 and c2 are constants independent of n,r, and q. The constants c1=-43 and c2=353 suffice.
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