Dynamique des applications d'allure polynomiale
read the original 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, $U\subset\subset V$. Assume f is of topological degree d_t>1. Then there is a probability measure \mu supported on $\bigcap_{n\geq 0}f^{-n}(V)$ 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 $\int \log J \d \mu \geq \log d_t$. 3. For every probability measure \nu on V with no mass on pluripolar sets $d_t^{-n} (f^n)^*\nu$ converges to $\mu$. 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 $z\not\in\E$, $\mu^z_n:=d_t^{-n} (f^n)^*\delta_z$ 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.
This paper has not been read by Pith yet.
discussion (0)
Sign in with ORCID, Apple, or X to comment. Anyone can read and Pith papers without signing in.