Fiber bundles associated with Anosov representations

Abstract

Anosov representations of a hyperbolic group into a semisimple Lie group G are known to admit cocompact domains of discontinuity in flag varieties G/Q, endowing the compact quotient manifolds M with a (G,G/Q)-structure. In general the topology of M can be quite complicated. In this article, we consider the case when is the fundamental group of a closed (real or complex) hyperbolic manifold N and is a deformation of a (twisted) lattice embedding Isom( H K) G through Anosov representations. We prove that, in this situation, M is alway a smooth fiber bundle over N. Determining the topology of the fiber seems hard in general. The second part of the paper focuses on the special case when N is a surface, a quasi-Hitchin representation into Sp(4, C), and M is modelled on the space of complex Lagrangians in C4. We show that, in this case, the fiber is homeomorphic to CP2 CP2.