Dynamics of post-critically finite maps in higher dimension
We study the dynamics of post-critically finite endomorphisms of P^k(C). We prove that post-critically finite endomorphisms are always post-critically finite all the way down under a mild regularity condition on the post-critical set. We study the eigenvalues of periodic points of post-critically fi...
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| Main Author | |
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| Format | Journal Article |
| Language | English |
| Published |
09.09.2016
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| Subjects | |
| Online Access | Get full text |
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| Summary: | We study the dynamics of post-critically finite endomorphisms of P^k(C). We
prove that post-critically finite endomorphisms are always post-critically
finite all the way down under a mild regularity condition on the post-critical
set. We study the eigenvalues of periodic points of post-critically finite
endomorphisms. Then, under a weak transversality condition and assuming
Kobayashi hyperbolicity of the complement of the post-critical set, we prove
that the only possible Fatou components are super-attracting basins, thus
partially extending to any dimension a result of Fornaess-Sibony and Rong
holding in the case k = 2. |
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| DOI: | 10.48550/arxiv.1609.02717 |