On globally hypoelliptic abelian actions and their existence on homogeneous spaces

Abstract

We define globally hypoelliptic smooth Rk actions as actions whose leafwise Laplacian along the orbit foliation is a globally hypoelliptic differential operator. When k=1, strong global rigidity is conjectured for such actions by Greenfield-Wallach and Katok: every such action is smoothly conjugate to a Diophantine flow on the torus. The conjecture has been confirmed for all homogeneous flows on homogeneous spaces FFRH. In this paper we conjecture that among homogeneous Rk actions (k 2) on homogeneous spaces globally hypoelliptic actions exist only on nilmanifolds. We obtain a partial result towards this conjecture: we show non-existence of globally hypoelliptic R2 actions on homogeneous spaces G/, with at least one quasi-unipotent generator, where G= SL(n, R). We also show that the same type of actions on solvmanifolds are smoothly conjugate to homogeneous actions on nilmanifolds.