Hp,q-convex cocompactness and higher higher Teichm\"uller spaces

Abstract

For any integers p≥ 2 and q≥ 1, let Hp,q be the pseudo-Riemannian hyperbolic space of signature (p,q). We prove that if is the fundamental group of a closed aspherical p-manifold, then the set of representations of to PO(p,q+1) which are convex cocompact in Hp,q is a union of connected components of Hom(,PO(p,q+1)). More generally, we show that if is any finitely generated group with no infinite nilpotent normal subgroups and with virtual cohomological dimension p, then the set of injective and discrete representations of to PO(p,q+1) preserving a non-degenerate non-positive (p-1)-sphere in the boundary of Hp,q is a union of connected components of Hom(,PO(p,q+1)). This gives new examples of higher-dimensional higher-rank Teichm\"uller spaces.