Uniqueness and non-uniqueness for the asymptotic Plateau problem in hyperbolic space

Abstract

We prove several results on the number of solutions to the asymptotic Plateau problem in H3. Firstly we discuss criteria that ensure uniqueness. Given a Jordan curve in the asymptotic boundary of H3, we show that uniqueness of the minimal surfaces with asymptotic boundary is equivalent to uniqueness in the smaller class of stable minimal disks. Then we show that if a quasicircle (or more generally, a Jordan curve of finite width) is the asymptotic boundary of a minimal surface with principal curvatures less than or equal to 1 in absolute value, then uniqueness holds. In the direction of non-uniqueness, we construct an example of a quasicircle that is the asymptotic boundary of uncountably many pairwise distinct stable minimal disks.