Embedding of Stein spaces into sequence spaces
Copyright policy )Embedding of Stein spaces into sequence spaces
In this note we show that a connected, reduced Stein space X of arbitrary dimension admits a holomorphic embedding into various sequence spaces, for example into s,s',0(ℂn) or ℂ , and also into infinite dimensional complex Banach spaces. As an application we prove that the Frechet space 0 (X) of holomorphic functions on X is a quotient of s.
- Ludwig-Maximilians-Universität München Germany
- DigiZeitschriften Germany
connected reduced Stein space, 510.mathematics, Banach analytic manifolds and spaces, complex Banach spaces, Stein spaces, sequence spaces, holomorphic embedding, Article, Sequence spaces (including Köthe sequence spaces)
connected reduced Stein space, 510.mathematics, Banach analytic manifolds and spaces, complex Banach spaces, Stein spaces, sequence spaces, holomorphic embedding, Article, Sequence spaces (including Köthe sequence spaces)
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