Results 141 to 150 of about 579 (168)
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On pseudoconvexity of Reinhardt domains
1996Für Reinhardt'sche Gebiete im \(\mathbb{C}^2\) wird der Zusammenhang zwischen Pseudokonvexität und logarithmischer Konvexität diskutiert.
M. Landucci, SPIRO, Andrea
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Oka's principle in pseudoconvex domains
Complex Variables, Theory and Application: An International Journal, 2001Let x be a Banach space with a Schauder basis, for which the hypothesis (X) in the sense of Lempert is satisfied, and Ω be a pseudoconvex domain in x. Let L be an Abelian complex Lie group. A L or eL be, respectively, the sheaves over Ω of germs of holomorphic or continuous mappings into L and be the canonical inclusion. Then the mapping induced by the
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Carleson Measures on Weakly Pseudoconvex Domains
The Journal of Geometric AnalysiszbMATH Open Web Interface contents unavailable due to conflicting licenses.
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q-pseudoconvex and q-complete domains
1984Main result: If D is a domain with \(C^ 2\) boundary in a Stein manifold M and D has q-pseudoconvex boundary, then D is q-complete. The proof uses a reduction (by embedding and tubular neighbourhood) to the case \(M={\mathbb{C}}^ N\).
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Pseudoconvex Domains and Oka’s Theorem
2016In this chapter we deal with pseudoconvex domains. In Chap. 4 we saw that the Oka–Cartan Fundamental Theorem holds on holomorphically convex domains, and in Chap. 5 that a holomorphically convex domain is equivalent to a domain of holomorphy. These domains are shown to be pseudoconvex (Cartan–Thullen). The converse (Levi’s problem) was proved by K. Oka
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The Bergman kernel and biholomorphic mappings of pseudoconvex domains
Inventiones Mathematicae, 1974Charles Fefferman
exaly
Peak points on weakly pseudoconvex domains
Mathematische Annalen, 1977John Erik Fornæss, Fornæss John Erik
exaly