Complete minimal surfaces densely lying in arbitrary domains of Rn

Abstract

In this paper we prove that, given an open Riemann surface M and an integer n 3, the set of complete conformal minimal immersions Mn with X(M)=Rn forms a dense subset in the space of all conformal minimal immersions Mn endowed with the compact-open topology. Moreover, we show that every domain in Rn contains complete minimal surfaces which are dense on it and have arbitrary orientable topology (possibly infinite); we also provide such surfaces whose complex structure is any given bordered Riemann surface. Our method of proof can be adapted to give analogous results for non-orientable minimal surfaces in Rn (n 3), complex curves in Cn (n 2), holomorphic null curves in Cn (n 3), and holomorphic Legendrian curves in C2n+1 (n∈N).