Polynomial hulls with convex sections and interpolating spaces

Slodkowski, Zbigniew

doi:10.1090/S0002-9939-1986-0818455-X

Polynomial hulls with convex sections and interpolating spaces
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Proc. Amer. Math. Soc. 96 (1986), 255-260 Request permission

Abstract:

Assume that $L \subset \partial D \times {{\mathbf {C}}^m}$ is compact and has convex vertical sections. Denote by $K$ its polynomially convex hull. It is shown that $K\backslash \partial D \times {{\mathbf {C}}^m}$, if nonempty, can be covered by graphs of analytic functions $f:D \to {{\mathbf {C}}^m}$. The proof is based on complex interpolation theory for families of finite-dimensional normed spaces.

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Analytic multifunctions

-plurisubharmonic functions and uniform algebras

A generalization of Vesentini and Wermer’s theorems