The Mittag-Leffler theorem for proper minimal surfaces and directed meromorphic curves
Abstract
We establish a Mittag-Leffler-type theorem with approximation and interpolation for meromorphic curves M Cn (n≥ 3) directed by Oka cones in Cn on any open Riemann surface M. We derive a result of the same type for proper conformal minimal immersions M Rn. This includes interpolation in the poles and approximation by embeddings, the latter if n 5 in the case of minimal surfaces. As applications, we show that complete minimal ends of finite total curvature in R5 are generically embedded, and characterize those open Riemann surfaces which are the complex structure of a proper minimal surface in R3 of weak finite total curvature.
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