Algebraic and o-minimal flows beyond the cocompact case

Abstract

Let X ⊂ Cn be an algebraic variety, and let ⊂ Cn be a discrete subgroup whose real and complex spans agree. We describe the topological closure of the image of X in Cn / , thereby extending a result of Peterzil-Starchenko in the case when is cocompact. We also obtain a similar extension when X⊂ Rn is definable in an o-minimal structure with no restrictions on , and as an application prove the following conjecture of Gallinaro: for a closed semi-algebraic X⊂ Cn (such as a complex algebraic variety) and :Cn (C*)n the coordinate-wise exponential map, we have (X)=(X) i=1m (Ci)· Ti where Ti⊂ (C*)n are positive-dimensional compact real tori and Ci⊂ Cn are semi-algebraic.