Zobrazeno 1 - 10
of 240
pro vyhledávání: '"Klas Diederich"'
Autor:
Sergey Pinchuk, Klas Diederich
Publikováno v:
Topics in Several Complex Variables. :117-120
Publikováno v:
The Journal of Geometric Analysis. 24:2124-2134
We show that for any bounded domain \(\varOmega\subset\mathbb{C} ^{n}\) of 1-type 2k which is locally convexifiable at p∈bΩ, having a Stein neighborhood basis, there is a biholomorphic map \(f:\bar{\varOmega}\rightarrow\mathbb{C} ^{n} \) such that
Autor:
Klas Diederich, Emmanuel Mazzilli
Publikováno v:
ANNALI SCUOLA NORMALE SUPERIORE - CLASSE DI SCIENZE. :447-454
Let X ⊂ C n be a closed real-analytic subset and put A := {z ∈ X |∃ A ⊂ X, germ of a complex-analytic set, z ∈ A, dimz A > 0} This article deals with the question of the structure of A.I nthe main result a natural proof is given for the fac
Autor:
Klas Diederich, Sergey Pinchuk
Publikováno v:
Complex Variables and Elliptic Equations. 54:223-241
This survey article gives an insight into the methods of the geometrical reflection principle developed in order to extend a proper holomorphic map f : D → D′ between bounded domains D, D′ ⊂⊂ ℂ n with smooth real-analytic boundaries holom
Autor:
Mihnea Colţoiu, Klas Diederich
Publikováno v:
Mathematische Annalen. 338:283-289
We consider the following question: Let \({p:Y \rightarrow X}\) be an unbranched Riemann domain and assume that X is a Stein space and p is a Stein morphism. Does it follow that Y is Stein ? We show that the answer is affirmative if X has isolated si
Autor:
Takeo Ohsawa, Klas Diederich
Publikováno v:
Publications of the Research Institute for Mathematical Sciences. 43:171-180
Non-existence theorems for Levi fiat hypersurfaces have found great interest in the literature. The question next to this that has to be asked is, when existing Levi flat hypersurfaces are at least rigid under deformations. Here, the case of boundari
Autor:
Sergey Pinchuk, Klas Diederich
Publikováno v:
The Journal of Geometric Analysis. 14:231-239
Let D, D′ ⊂ ℂn be bounded domains with smooth real analytic boundaries and ƒ: D → D′ be a proper holomorphic map. Our main result implies that if the graph of ƒ extends as an analytic set to a neighborhood of a point (a, a′) ∈ ∂D ×
Autor:
Klas Diederich
This volume contains the Proceedings of the International Workshop'Complex Analysis', which was held from February 12-16, 1990, in Wuppertal (Germany) in honour of H. Grauert, one of the most creative mathematicians in Complex Analysis of this centur
Autor:
Klas Diederich, John Erik Fornæss
Publikováno v:
manuscripta mathematica. 112:403-431
Smooth bounded lineally convex domains of finite type constitute a natural class of domains in complex analysis, since they are locally biholomorphically invariant. A smooth family of holomorphic support functions is constructed by an almost explicit
Autor:
Klas Diederich, Takeo Ohsawa
Publikováno v:
Mathematische Annalen. 323:397-403