Construction of embedded periodic surfaces in Rn

Abstract

We construct embedded minimal surfaces which are n-periodic in Rn. They are new for codimension n-2 2. We start with a Jordan curve of edges of the n-dimensional cube. It bounds a Plateau minimal disk which Schwarz reflection extends to a complete minimal surface. Studying the group of Schwarz reflections, we can characterize those Jordan curves for which the complete surface is embedded. For example, for n=4 exactly five such Jordan curves generate embedded surfaces. Our results apply to surface classes other than minimal as well, for instance polygonal surfaces.