Global smooth and topological rigidity of hyperbolic lattice actions

Abstract

In this article we prove global rigidity results for hyperbolic actions of higher-rank lattices. Suppose is a lattice in semisimple Lie group, all of whose factors have rank 2 or higher. Let α be a smooth -action on a compact nilmanifold M that lifts to an action on the universal cover. If the linear data of α contains a hyperbolic element, then there is a continuous semiconjugacy intertwining the actions of α and , on a finite-index subgroup of . If α is a C∞ action and contains an Anosov element, then the semiconjugacy is a C∞ conjugacy. As a corollary, we obtain C∞ global rigidity for Anosov actions by cocompact lattices in semisimple Lie group with all factors rank 2 or higher. We also obtain global rigidity of Anosov actions of SL(n, Z) on Tn for n≥ 5 and probability-preserving Anosov actions of arbitrary higher-rank lattices on nilmanifolds.