Divergent Trajectories in Arithmetic Homogeneous Spaces of Rational Rank Two

Abstract

Let G be a real algebraic group defined over Q, be an arithmetic subgroup of G, and T be a maximal R-split torus. A trajectory in G/ is divergent if eventually it leaves every compact subset. In some cases there is a finite collection of explicit algebraic data which account for the divergence. If this is the case, the divergent trajectory is called obvious. Given a closed cone in T, we study the existence of non-obvious divergent trajectories under its action in G/. We get a sufficient condition for the existence of a non-obvious divergence trajectory in the general case, and a full classification under the assumption that rankQG=rankRG=2.