On nonlinear Rudin-Carleson type theorem

Abstract

In this paper we study nonlinear interpolation problems for interpolation and peak-interpolation sets of function algebras. The subject goes back to the classical Rudin-Carleson interpolation theorem. In particular, we prove the following nonlinear version of this theorem: Let D⊂ C be the closed unit disk, T⊂ D the unit circle, S⊂ T a closed subset of Lebesgue measure zero and M a connected complex manifold. Then for every continuous M-valued map f on S there exists a continuous M-valued map g on D holomorphic on its interior such that g|S=f. We also consider similar interpolation problems for continuous maps f: S→ M, where M is a complex manifold with boundary ∂ M and interior M. Assuming that f(S)∂ M we are looking for holomorphic extensions g of f such that g( D S)⊂ M.

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