Equivariant maps into Anti-de Sitter space and the symplectic geometry of H2× H2

Abstract

Given two Fuchsian representations l and r of the fundamental group of a closed oriented surface S of genus ≥ 2, we study the relation between Lagrangian submanifolds of M=(H2/l(π1(S)))× (H2/r(π1(S))) and -equivariant embeddings σ of S into Anti-de Sitter space, where =(l,r) is the corresponding representation into PSL2 R× PSL2 R. It is known that, if σ is a maximal embedding, then its Gauss map takes values in the unique minimal Lagrangian submanifold ML of M. We show that, given any -equivariant embedding σ, its Gauss map gives a Lagrangian submanifold Hamiltonian isotopic to ML. Conversely, any Lagrangian submanifold Hamiltonian isotopic to ML is associated to some equivariant embedding into the future unit tangent bundle of the universal cover of Anti-de Sitter space.