Literatur
Chowla, S.: Proof of a conjecture of Julia Robinson. Det kongelige norske videnskabers selskabs forhandlinger, Bd. 34, Nr. 20. Trondheim 1961.
Green, M.L.: Some Picard Theorems for holomorphic maps to algebraic varieties. Am. J. Math.97, 47–75 (1975)
Green, M.L.: The Hyperbolicity of the complement of 2n+1 Hyperplanes in general position in IP n and related results. Proc. Am. Math. Soc.,66, 109–113 (1977)
Grauert, H., Remmert, R.: Analytische Stellenalgebren. Berlin-Heidelberg-New York: Springer 1971
Kiernan, P.: Hyperbolically Imbedded Spaces and the Big Picard Theorem. Math. Ann.204, 203–209 (1973)
Kobayashi, S.: Hyperbolic manifolds and Holomorphic mappings. New York: Marcel Dekker 1970
Kwack, M.H.: Generalisation of the big Picard Theorem. Ann. Math.90, 9–22 (1969)
Lang, S.: Fundamentals of Diphantine Geometry. New York-Berlin-Heidelberg-Tokyo: Springer 1983
Langmann, K.: Abschätzungen für die Anzahl der holomorphen Abbildungen zwischen algebraischen Räumen. Math. Z.190, 411–418 (1985)
Nagell, T.: Sur une propriété des unités d'un corps algébrique. Ark. Mat.5, 343–356 (1964)
Nevanlinna, R.: Le Théorème de Picard-Borel et la théorie des functions méromorphs. New York: Chelsea 1974
Wu, H.: Ann-dimensional Extension of Picards Theorem. Bull. Am. Math. Soc.75, 1357–1361 (1969)
Kobayashi, S., Ochia, T.: Meromorphic Mappings onto Compact Complex Spaces of General Type. Invent. Math.31, 7–16 (1975)
Vojta, P.: Thesis. Harvard (1983)
Author information
Authors and Affiliations
Rights and permissions
About this article
Cite this article
Langmann, K. Picard-Borel-Eigenschaft und Anwendungen. Math Z 192, 587–601 (1986). https://doi.org/10.1007/BF01162706
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF01162706