Representatives of similarity classes of matrices over PIDs corresponding to ideal classes

Abstract

For a principal ideal domain A, the Latimer--MacDuffee correspondence sets up a bijection between the similarity classes of matrices in Mn(A) with irreducible characteristic polynomial f(x) and the ideal classes of the order A[x]/(f(x)). We prove that when A[x]/(f(x)) is maximal (i.e., integrally closed, i.e., a Dedekind domain), then every similarity class contains a representative that is, in a sense, close to being a companion matrix. The first step in the proof is to show that any similarity class corresponding to an ideal (not necessarily prime) of degree one contains a representative of the desired form. The second step is a previously unpublished result due to Lenstra that implies that when A[x]/(f(x)) is maximal, every ideal class contains an ideal of degree one.

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