Products of nonprimary cyclic conjugacy classes in the general linear group
Abstract
A cyclic square matrix (and its conjugacy class) C over a field K is called (m,k)-cyclic if it has a decomposition C = A B, where A = m, B = k and m, k 0. It is shown that the product of two nonsingular (m,k)-cyclic conjugacy classes Ω and Ψ of GL(m+k,K) contains all nonscalar matrices P in GL(m+k,K) with determinant P = ΩΨ.
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