Conjugacy classes of regular integer matrices

Abstract

This paper is devoted to the theory of GLn( Z)-conjugacy classes of regular integer n× n matrices. Such a matrix is GLn( Q)-conjugate to the companion matrix of its characteristic polynomial. But the set of GLn( Z)-conjugacy classes of regular integer matrices with a fixed characteristic polynomial f is usually nontrivial (finite if f has simple roots, infinite if f has multiple roots). It is in 1:1-correspondence to a subsemigroup of a certain quotient semigroup of the commutative semigroup of full lattices in the algebra Q[t]/(f). In its first part, the paper gives a survey on old and new results on full lattices and orders in a finite dimensional commutative Q-algebra with unit element and on induced semigroups. In its longer second part, the paper applies this theory to many examples, essentially all cases with n=2, many cases with n=3 and two cases with arbitrary n, the case with n different integer eigenvalues and the case of a single n× n Jordan block.