Dynamique des applications d'allure polynomiale
Abstract
We study the dynamics of polynomial-like mappings in several variables. A special case of our results is the following theorem. Let f be a proper holomorphic map from an open set U onto a Stein manifold V, . Assume f is of topological degree d_t>1. Then there is a probability measure \mu supported on satisfying the following properties. 1. The measure \mu is invariant, K-mixing, of maximal entropy \log d_t. 2. If J is the Jacobian of f with respect to a volume form then . 3. For every probability measure \nu on V with no mass on pluripolar sets converges to . 4. If the p.s.h. functions on V are \mu-integrables (\mu is PLB) then (a) The Lyapounov exponents for \mu are strictly positive. (b) \mu is exponentially mixing. (c) There is a proper analytic subset E of V such that for , converges to \mu. (d) The measure \mu is a limit of Dirac masses on the repelling periodic points. The condition \mu is PLB is stable under small pertubation of f. This gives large families where it is satisfied.
Cite
@article{arxiv.math/0211271,
title = {Dynamique des applications d'allure polynomiale},
author = {T. C. Dinh and N. Sibony},
journal= {arXiv preprint arXiv:math/0211271},
year = {2007}
}
Comments
61 pages, nouvelle version