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On Fatou maps into compact complex manifolds

Published online by Cambridge University Press:  18 July 2005

KAZUTOSHI MAEGAWA
Affiliation:
Graduate School of Human and Environmental Studies, Kyoto University, Yoshida Nihonmatsu-cho, Sakyo-ku, Kyoto, Japan 606-8501 (e-mail: km@math.h.kyoto-u.ac.jp)

Abstract

We will deal with two topics about normality of the iterates of holomorphic self-maps in compact varieties. First, for a holomorphic self-map f of an irreducible compact variety Z, we show that if at least one subsequence of $\{f^n\}_{n\ge0}$ converges uniformly, then the full sequence $\{f^n\}_{n\ge0}$ itself is a normal family and the full set of the limit maps is finite or has the structure of a compact commutative Lie group. Second, in the case when Z is non-singular, we deal with the dynamics on forward-invariant compact subsets outside the closures of the post-critical sets. We will describe the semi-repelling structure of the dynamics in terms of repelling points and neutral Fatou discs (center manifolds). In particular, in the case of holomorphic self-maps of projective spaces, we will obtain a stronger result.

Type
Research Article
Copyright
2005 Cambridge University Press

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