Minimal Lagrangian diffeomorphisms between domains in the hyperbolic plane
arXiv:0805.1897
Abstract
Let N be a complete, simply-connected surface of constant curvature κ\leq 0. Moreover, suppose that Ωand \tildeΩ are strictly convex domains in N with the same area. We show that there exists an area-preserving diffeomorphism from Ωto \tildeΩ whose graph is a minimal submanifold of N \times N.
revised version, to appear in J. Diff. Geom