Asymptotic and exterior Dirichlet problems for the minimal surface equation in the Heisenberg group with a balanced metric

Abstract

It is proved that the Heisenberg group *Nil3 with a balanced metric, the sum of the left and right invariant metrics, splits as a Riemannian product T× Z, where T is a totally geodesic surface and Z the center of *Nil% 3. It is then proved the existence of complete properly embedded minimal surfaces in *Nil3 by solving the asymptotic Dirichlet problem for the minimal surface equation on T. It is also proved the existence of complete properly embedded minimal surfaces foliating an open set of *Nil3 having as boundary a given curve in T, satisfying the exterior circle condition, by solving the exterior Dirichlet problem for the minimal surface equation in the unbounded connected component of T.