Almost strict domination and anti-de Sitter 3-manifolds

Abstract

We define a condition called almost strict domination for pairs of representations 1:π1(Sg,n) PSL(2,R), 2:π1(Sg,n) G, where G is the isometry group of a Hadamard manifold (X,), and prove it holds if and only if one can find a (1,2)-equivariant spacelike maximal surface in a certain pseudo-Riemannian manifold, unique up to fixing some parameters. The proof amounts to setting up and solving an interesting variational problem that involves infinite energy harmonic maps. Adapting a construction of Tholozan, we construct all such representations and parametrize the deformation space. When (X,)=(H,σ), an almost strictly dominating pair is equivalent to the data of an anti-de Sitter 3-manifold with specific properties. The results on maximal surfaces provide a parametrization of the deformation space of such 3-manifolds as a union of components in a PSL(2,R)× PSL(2,R) relative representation variety.