On the Gauss map of equivariant immersions in hyperbolic space

Abstract

Given an oriented immersed hypersurface in hyperbolic space Hn+1, its Gauss map is defined with values in the space of oriented geodesics of Hn+1, which is endowed with a natural para-K\"ahler structure. In this paper we address the question of whether an immersion G of the universal cover of an n-manifold M, equivariant for some group representation of π1(M) in Isom(Hn+1), is the Gauss map of an equivariant immersion in Hn+1. We fully answer this question for immersions with principal curvatures in (-1,1): while the only local obstructions are the conditions that G is Lagrangian and Riemannian, the global obstruction is more subtle, and we provide two characterizations, the first in terms of the Maslov class, and the second (for M compact) in terms of the action of the group of compactly supported Hamiltonian symplectomorphisms.