The Topological Nature of Two Noguchi Theorems on Sequences of Holomorphic Mappings Between Complex Spaces
Canadian journal of mathematics, Tome 47 (1995) no. 6, pp. 1240-1252

Voir la notice de l'article provenant de la source Cambridge University Press

Let C,D,D* be, respectively, the complex plane, {z ∈ C : |z| < 1}, and D — {0}. If P1(C) is the Riemann sphere, the Big Picard theorem states that if ƒ:D* → P 1(C) is holomorphic and P 1(C) → ƒ(D*) n a s more than two elements, then ƒ has a holomorphic extension . Under certain assumptions on M, A and X ⊂ Y, combined efforts of Kiernan, Kobayashi and Kwack extended the theorem to all holomorphic ƒ: M → A → X. Relying on these results, measure theoretic theorems of Lelong and Wirtinger, and other properties of complex spaces, Noguchi proved in this context that if ƒ: M → A → X and ƒn: M → A → X are holomorphic for each n and ƒn → ƒ, then . In this paper we show that all of these theorems may be significantly generalized and improved by purely topological methods. We also apply our results to present a topological generalization of a classical theorem of Vitali from one variable complex function theory.
DOI : 10.4153/CJM-1995-063-6
Mots-clés : 32H15, 32H20, 54C35, 54C20, 54D50, complex spaces, big Picard theorem, continuous extensions, holomorphic maps, fc-spaces, function spaces, compact-open topology, even continuity, Alexandroff one-point compactification, Ascoli Theorem
Joseph, James E.; Kwack, Myung H. The Topological Nature of Two Noguchi Theorems on Sequences of Holomorphic Mappings Between Complex Spaces. Canadian journal of mathematics, Tome 47 (1995) no. 6, pp. 1240-1252. doi: 10.4153/CJM-1995-063-6
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