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Normality criteria for families of holomorphic mappings of several complex variables into \(P^N(\mathbb{C})\)

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Titel: Normality criteria for families of holomorphic mappings of several complex variables into \(P^N(\mathbb{C})\)
Autoren: Tu, Zhen-han
Verlagsinformationen: American Mathematical Society (AMS), Providence, RI
Schlagwörter: Nevanlinna theory, Picard-type theorems and generalizations for several complex variables, heuristic principle, complex projective spaces, normal families, Picard type theorems, Montel normality criteria, Value distribution of meromorphic functions of one complex variable, Nevanlinna theory, Special families of functions of several complex variables, holomorphic mappings, hyperplanes in general position, Normal functions of one complex variable, normal families, hyperplanes, Value distribution theory in higher dimensions
Beschreibung: By modifying the heuristic principle in several complex variables obtained by \textit{G. Aladro} and \textit{S. G. Krantz} [J. Math. Anal. Appl. 161, 1-8 (1991; Zbl 0749.32001)], the author proves some normality criteria for families of holomorphic mappings of a domain \(D\subset \mathbb{C}^n\) into the complex \(N\)-dimensional projective space \(\mathbb{P}^N(\mathbb{C})\) related to the Green's and Nochka's Picard type theorems. The equivalence of normality to being uniformly Montel at a point is obtained: Let \(F\) be a family of holomorphic mappings of a domain \(D\subset \mathbb{C}^N\) into \(\mathbb P^N(\mathbb C).\) Then \(F\) is normal at a point \(z_0\in D\) iff \(F\) is uniformly Montel at the point \(z_0.\) Two examples are included to illustrate the author's theory.
Publikationsart: Article
Dateibeschreibung: application/xml
DOI: 10.1090/s0002-9939-99-04610-9
Zugangs-URL: https://zbmath.org/1245428
Dokumentencode: edsair.c2b0b933574d..fd8e83f4e89ca3700775f2395b1bc6dd
Datenbank: OpenAIRE
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