Classifying GL(n, Z)-orbits of points and rational subspaces

Abstract

We first show that the subgroup of the abelian real group R generated by the coordinates of a point in x = (x1,…,xn)∈Rn completely classifies the GL(n, Z)-orbit of x. This yields a short proof of J.S.Dani's theorem: the GL(n, Z)-orbit of x∈Rn is dense iff xi/xj∈ R Q for some i,j=1,…,n. We then classify GL(n, Z)-orbits of rational affine subspaces F of Rn. We prove that the dimension of F together with the volume of a special parallelotope associated to F yields a complete classifier of the GL(n, Z)-orbit of F.