Asymptotic Behavior of Normal Mappings of Several Complex Variables
Canadian journal of mathematics, Tome 36 (1984) no. 4, pp. 718-746

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

Let M and N be connected Hermitian manifolds of dimensions m and n with Hermitian metrics hM and hN, respectively. Then the space l(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 l(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:M → N is a closed subspace of l(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 H(M, N), see also [25], we obtain various relations which exist between these notions.
Hahn, Kyong T. Asymptotic Behavior of Normal Mappings of Several Complex Variables. Canadian journal of mathematics, Tome 36 (1984) no. 4, pp. 718-746. doi: 10.4153/CJM-1984-041-9
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