Interpolation by complete minimal surfaces whose Gauss map misses two points

Abstract

Let M be an open Riemann surface and let ⊂ M be a closed discrete subset. In this paper, we prove the existence of complete conformal minimal immersions Mn, n 3, with prescribed values on and whose generalized Gauss map Mn-1, n 3, avoids n hyperplanes of CPn-1 located in general position. In case n=3, we obtain complete nonflat conformal minimal immersions whose Gauss map M2 omits two (antipodal) values of the sphere. This result is deduced as a consequence of an interpolation theorem for conformal minimal immersions Mn into the Euclidean space Rn, n 3, with n-2 prescribed components.