Holomorphic Mappings of the Hyperbolic Space into the Complex Euclidean Space and the Bloch Theorem

Kyong T. Hahn

doi:10.4153/CJM-1975-053-0

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This paper is to study various properties of holomorphic mappings defined on the unit ball B in the complex euclidean space Cn with ranges in the space Cm. Furnishing B with the standard invariant Kähler metric and Cm with the ordinary euclidean metric, we define, for each holomorphic mapping f : B → Cm, a pair of non-negative continuous functions qf and Qf on B ; see § 2 for the definition.

Let (Ω), Ω > 0, be the family of holomorphic mappings f : B → Cn such that Qf(z) ≦ Ω for all z ∈ B. (Ω) contains the family (M) of bounded holomorphic mappings as a proper subfamily for a suitable M > 0.

References

1. Anderson, J. M., Clunie, J., and Ch. Pommerenke, On Block functions and normal functions, J. Reine Angew Math. 270 (1974), 12–37.Google Scholar

2. Barth, T. J., Taut and tight complex manifolds, Proc. Amer. Math. Soc. 24 (1970), 429–431.Google Scholar

3. Hahn, K. T., The non-euclidean Pythagorean theorem with respect to the Bergman metric, Duke Math. J. 33 (1966), 523–534.Google Scholar

4. Hahn, K. T., Higher dimensional generalization of the Bloch constant and their lower bounds, Trans. Amer. Math. Soc. 179 (1973), 263–274.Google Scholar

5. Hahn, K. T., Quantitative Bloch's theorem for certain classes of holomorphic mappings of the ball into Pn(C) (to appear).Google Scholar

6. Kobayashi, S. and Nomizu, K., Foundations of differential geometry, Vol. 2 (Interscience, New York, 1969).Google Scholar

7. Kobayashi, S., Hyperbolic manifolds and holomorphic mappings (Marcel Dekker, New York, 1970).Google Scholar

8. Landau, E., Ûber die Blochsche Konstante und zwei verwandte Weltkonstanten, Math. Z. 30 (1920), 608–634.Google Scholar

9. Lehto, O. and Virtanen, K. J., Boundary behaviour and normal metvmorphic functions, Acta Math. 97 (1957), 47–65.Google Scholar

10. L∞k, K. H., Schwarz lemma and analytic invariants, Sci. Sinica 7 (1958), 453–504.Google Scholar

11. Seidel, W. and Walsh, J. L., On the derivative of functions analytic in the unit circle and their radii of univalence and of p-valence, Trans. Amer. Math. Soc. 52 (1942), 129–216.Google Scholar

12. Veech, W. A., A second course in complex analysis (Benjamin, New York, 1967).Google Scholar

13. Wu, H., Normal families of holomorphic mappings, Acta Math. 119 (1967), 193–233.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Harris, Lawrence A. 1977. On the size of balls covered by analytic transformations. Monatshefte f�r Mathematik, Vol. 83, Issue. 1, p. 9.

Cima, Joseph A. and Krantz, Steven G. 1983. The Lindelöf principle and normal functions of several complex variables. Duke Mathematical Journal, Vol. 50, Issue. 1,

Hahn, Kyong T. 1984. Asymptotic properties of normal and nonnormal holomorphic mappings. Bulletin of the American Mathematical Society, Vol. 11, Issue. 1, p. 151.

Graham, I. R. 1984. Several Complex Variables. p. 175.

Kubota, Yoshihisa 1986. Some Properties of Bounded Holomorphic Mappings Defined on Bounded Homogeneous Domains. Canadian Mathematical Bulletin, Vol. 29, Issue. 3, p. 358.

Hahn, Kyong T. 1986. Higher dimensional generalizations of some classical theorems on normal meromorphic functions. Complex Variables, Theory and Application: An International Journal, Vol. 6, Issue. 2-4, p. 109.

Hahn, Kyong T. and Youssfi, E. H. 1991. Möbius invariant besov p-spaces and hankel operators in the bergman space on the ball in C n. Complex Variables, Theory and Application: An International Journal, Vol. 17, Issue. 1-2, p. 89.

Hahn, Kyong T. and Youssfi, E. H. 1991. M-harmonic Besovp-spaces and Hankel operators in the Bergman space on the ball in ℂ n. manuscripta mathematica, Vol. 71, Issue. 1, p. 67.

Cohen, Joel M. and Colonna, Flavia 1994. Bounded holomorphic functions on bounded symmetric domains. Transactions of the American Mathematical Society, Vol. 343, Issue. 1, p. 135.

FitzGerald, Carl H. and Gong, Sheng 1994. The Bloch theorem in several complex variables. The Journal of Geometric Analysis, Vol. 4, Issue. 1, p. 35.

Joseph, James E. and Kwack, Myung H. 1997. Families of bloch functions on higher dimensional complex spaces. Complex Variables, Theory and Application: An International Journal, Vol. 32, Issue. 4, p. 299.

Hahn, K. T. and Youssfi, E. H. 1997. Teh Bloch space of M-harmonic functions on bounded symmetric domains. Monatshefte f�r Mathematik, Vol. 123, Issue. 3, p. 229.

Allen, Robert F. and Colonna, Flavia 2009. On the isometric composition operators on the Bloch space in Cn. Journal of Mathematical Analysis and Applications, Vol. 355, Issue. 2, p. 675.

Allen, Robert F. and Colonna, Flavia 2009. Multiplication Operators on the Bloch Space of Bounded Homogeneous Domains. Computational Methods and Function Theory, Vol. 9, Issue. 2, p. 679.

Allen, Robert F. and Colonna, Flavia 2010. Topics in Operator Theory. p. 11.

Allen, Robert F. and Colonna, Flavia 2010. Weighted Composition Operators from H ∞ to the Bloch Space of a Bounded Homogeneous Domain. Integral Equations and Operator Theory, Vol. 66, Issue. 1, p. 21.

Colonna, Flavia and Easley, Glenn R. 2010. Multiplication Operators on the Lipschitz Space of a Tree. Integral Equations and Operator Theory, Vol. 68, Issue. 3, p. 391.

Colonna, Flavia Easley, Glenn R. and Singman, David 2011. Norm of the multiplication operators from H∞ to the Bloch space of a bounded symmetric domain. Journal of Mathematical Analysis and Applications, Vol. 382, Issue. 2, p. 621.

Yang, Gye Tak and Choi, Ki Seong 2012. NOTES ON <TEX>${\alpha}$</TEX>-BLOCH SPACE AND <TEX>$D_p({\mu})$</TEX>. Journal of the Chungcheong Mathematical Society, Vol. 25, Issue. 3, p. 543.

Li, Songxiao and Stević, Stevo 2014. Some new characterizations of the Bloch space. Journal of Inequalities and Applications, Vol. 2014, Issue. 1,

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Holomorphic Mappings of the Hyperbolic Space into the Complex Euclidean Space and the Bloch Theorem

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