Harmonic mappings and conformal minimal immersions of Riemann surfaces into Rn

Abstract

We prove that for any open Riemann surface N, natural number n≥ 3, non-constant harmonic map h:N Rn-2 and holomorphic 2-form H on N, there exists a weakly complete harmonic map X=(Xj)j=1,…,n:N Rn with Hopf differential H and (Xj)j=3,…,n=h. In particular, there exists a complete conformal minimal immersion Y=(Yj)j=1,…,n:N Rn such that (Yj)j=3,…,n=h. As a consequence of these results, complete full non-decomposable minimal surfaces with arbitrary conformal structure and whose generalized Gauss map is non-degenerate and fails to intersect n hyperplanes of CPn-1 in general position are constructed. Moreover, complete non-proper embedded minimal surfaces in Rn, ∀ n>3, are exhibited.