O-minimal flows on nilmanifolds

Abstract

Let G be a connected, simply connected nilpotent Lie group, identified with a real algebraic subgroup of UT(n,R), and let be a lattice in G, with π:G G/ the quotient map. For a semi-algebraic X⊂eq G, and more generally a definable set in an o-minimal structure on the real field, we consider the topological closure of π(X) in the compact nilmanifold G/. Our theorem describes cl(π(X)) in terms of finitely many families of cosets of real algebraic subgroups of G. The underlying families are extracted from X, independently of . We also prove an equidistribution result in the case of curves.