We investigate the dynamical behaviour of a holomorphic map on a $f-$invariant subset $C$ of $U,$ where $f:U \to \mathbb{C}^k.$ We study two cases: when $U$ is open, connected and polynomially convex subset of $\mathbb{C}^k$ and $C \subset \subset U,$ closed in $U,$ and when $\partial U$ has a p.s.h. barrier at each of its points and $C$ is not relatively compact in $U.$ In the second part of the paper, we prove a Birkhoff's type theorem for holomorphic maps in several complex variables, i.e. given an injective holomorphic map $f,$ defined in a neighborhood of $\overline{U},$ with $U$ star-shaped and $f(U)$ a Runge domain, we prove the existence of a unique, forward invariant, maximal, compact and connected subset of $\overline{U}$ which touches $\partial U.$
On Closed invariant sets in local dynamics
BISI, Cinzia
2009
Abstract
We investigate the dynamical behaviour of a holomorphic map on a $f-$invariant subset $C$ of $U,$ where $f:U \to \mathbb{C}^k.$ We study two cases: when $U$ is open, connected and polynomially convex subset of $\mathbb{C}^k$ and $C \subset \subset U,$ closed in $U,$ and when $\partial U$ has a p.s.h. barrier at each of its points and $C$ is not relatively compact in $U.$ In the second part of the paper, we prove a Birkhoff's type theorem for holomorphic maps in several complex variables, i.e. given an injective holomorphic map $f,$ defined in a neighborhood of $\overline{U},$ with $U$ star-shaped and $f(U)$ a Runge domain, we prove the existence of a unique, forward invariant, maximal, compact and connected subset of $\overline{U}$ which touches $\partial U.$I documenti in SFERA sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
