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Asymptotic Behavior of Normal Mappings of Several Complex Variables

Published online by Cambridge University Press:  20 November 2018

Kyong T. Hahn
Kyong T. Hahn*
Affiliation:
The Pennsylvania State University, University Park, Pennsylvania
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Let M and N be connected Hermitian manifolds of dimensions m and n with Hermitian metrics hM and hN, respectively. Then the space (M, N) of continuous mappings between M and N endowed with the compact-open topology is second countable so that a metric can be furnished in (M, N) which induces the compact-open topology. A sequence {fn} in ℓ(M, N) converges to a n f in ℓ(M, N) in this topology if and only if fn converges to f uniformly on compact subsets of M. It is then an easy consequence of the Cauchy integral formula to show that the space ℋ(M, N) of holomorphic mappings f:MN is a closed subspace of (M, N).

In this paper, generalizing the classical notions of normal functions, Bloch functions, regular sequences and P-point sequences of one complex variable to the mappings in (M, N), see also [25], we obtain various relations which exist between these notions.

Type
Research Article
Information
Canadian Journal of Mathematics , Volume 36 , Issue 4 , 01 August 1984 , pp. 718 - 746
Copyright
Copyright © Canadian Mathematical Society 1984

References

1. Anderson, J. M., Clunie, J. and Pommerenke, Ch., On Block functions and normal Junctions, J. Reine Angew. Math. 270 (1974), 1237.Google Scholar
2. Barth, T., Taut and tight complex manifolds, Proc. Amer. Math. Soc. 24 (1970), 429431.Google Scholar
3. Brody, R., Compact manifolds and hyperbolicity, Trans. Amer. Math. Soc. 235 (1978), 213219.Google Scholar
4. Cima, J. A. and Krantz, S. G., Lindelöf principle and normal junctions of several complex variables, Duke Math. J. 50 (1983), 303328.Google Scholar
5. Cirka, E., The theorems of Lindelöf and Fatou in Cn , Mat. Sb. 92 (134) (1973), 622644; Math. U.S.S.R. Sb. 21 (1973), 619–639.Google Scholar
6. Diederieh, K., Das Randverhalton der Bergmansehen Kernjunktion und Metrik in Streng pseudo-komvexen Gebieten, Math. Ann. 187 (1970), 936.Google Scholar
7. Dovbus, P. V., Boundary behavior of normal holomorphic junctions of several complex variables, Soviet Math. Dokl. 25 (1982), 267270.Google Scholar
8. Gauthier, P., A criterion for normal, Nagoya Math. J. 32 (1968), 277282.Google Scholar
9. Gavrilov, V. I., On the distribution of values of non-normal meromorphic junctions in the unit disc (Russian), Mat. Sb. 109 (N.S. 67) (1965), 408427.Google Scholar
10. Gavrilov, V. I. and Dovbus, P. V., Boundary singularities generated by cluster sets of functions of several complex variables, Soviet Math. Dokl. 26 (1982), 186189.Google Scholar
11. Graham, I., Boundary behavior of the Caratheodory and Kobayashi metrics on strongly pseudoconvex domains in Cn with smooth boundary, Trans. Amer. Math. Soc. 207 (1975), 219240.Google Scholar
12. Hahn, K. T., Holomorphic mappings of the hyperbolic space into the complex euclidean space and Bloch theorem, Can. J. Math. 27 (1975), 446458.Google Scholar
13. Hahn, K. T., On completeness of the Bergman metric and its subordinate metrics, II, Pacific J. Math. 68 (1977), 437446.Google Scholar
14. Hahn, K. T., Geometry of the unit ball of a complex Hilbert space, Can. J. Math. 30 (1978), 2231.Google Scholar
15. Kerzman, N. and Rosay, J. P., Fonctions pluri-sousharmoniques d'exhaustion bornées et domaines taut, Math. Ann. 257 (1981), 171184.Google Scholar
16. Kiernan, P. J., On the relations between taut, tight and hyperbolic mamjolds. Bull. Amer. Math. Soc. 76 (1970), 4951.Google Scholar
17. Kobayashi, S., Hyperbolic manifolds and holomorphic mappings (Marcel Dekker, New York, 1970).Google Scholar
18. Lehto, O. and Virtanen, V. I., Boundary behavior and normal meromorphic functions. Acta. Math. 97 (1957), 4763.Google Scholar
19. Lohwater, A. J. and Pommeranke, Ch., On normal meromorphic functions, Ann. Acad. Sci. Fenn., Ser. A I 550 (1973).Google Scholar
20. Royden, H. L., Remarks on the Kobayashi metric, several complex variables II, Lecture Notes in Math. 185 (1971). Springer, 125137.Google Scholar
21. Seidel, W. and Walsh, J. L., On the derivatives of functions analytic in the unit circle and their radii of univalence and of p-valence. Trans. Amer. Math. Soc. 52 (1942), 128216.Google Scholar
22. Stein, E. M., Boundary behavior of holomorphic functions of several complex variables (Princeton University Press, Princeton, 1972).Google Scholar
23. Timoney, R. M., Bloch functions in several complex variables. Thesis, University of Illinois (1978).Google Scholar
24. Wicker, F., Generalized Block mappings in complex Hilbert space. Can. J. Math. 29 (1977), 299306.Google Scholar
25. Wicker, F., Basic properties of normal and Bloch mappings. Thesis, Pennsylvania State University (1975).Google Scholar
26. Wu, H. H., Normal families of holomorphic mappings. Acta Math. 119 (1967), 193233.Google Scholar