Every nonflat conformal minimal surface is homotopic to a proper one

Abstract

Given an open Riemann surface M, we prove that every nonflat conformal minimal immersion Mn (n≥ 3) is homotopic through nonflat conformal minimal immersions Mn to a proper one. If n≥ 5, it may be chosen in addition injective, hence a proper conformal minimal embedding. Prescribing its flux, as a consequence, every nonflat conformal minimal immersion Mn is homotopic to the real part of a proper holomorphic null embedding Mn. We also obtain a result for a more general family of holomorphic immersions from an open Riemann surface into Cn directed by Oka cones in Cn.