William Gignac
Published 2012-12-20, updated 2014-02-25Version 2
We show by explicit example that local intersection multiplicities in holomorphic dynamical systems can grow arbitrarily fast, answering a question of V. I. Arnold. On the other hand, we provide results showing that such behavior is exceptional, and that typically local intersection multiplicities grow subexponentially.
Comments: 13 pages. In version 2, we've included an alternate, more geometric construction of the counterexample to Arnold's conjecture. We've also added new theorems illustrating that Arnold's conjecture holds "generically." To appear in Math. Res. Lett
Semigroup representations in holomorphic dynamics
Analytic multiplicative cocycles over holomorphic dynamical systems
Geometric methods in holomorphic dynamics
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