1. Continuous dependence of attractors on parameters of non-autonomous dynamical systems and infinite iterated function systems
- Author
-
David Cheban and Cristiana Mammana
- Subjects
Discrete mathematics ,Pure mathematics ,Dynamical systems theory ,non-autonomous dynamical system ,Applied Mathematics ,Periodic point ,Global attractor ,infinite iterated functions systems ,Lambda ,Linear dynamical system ,Hausdorff distance ,Iterated function system ,Attractor ,Discrete Mathematics and Combinatorics ,Limit set ,Analysis ,Mathematics - Abstract
The paper is dedicated to the study of the problem of continuous dependence of compact global attractors on parameters of non-autonomous dynamical systems and infinite iterated function systems (IIFS). We prove that if a family of non-autonomous dynamical systems ‹ $(X,\mathbb T_1,\pi_{\lambda}),(Y,\mathbb T_{2},\sigma),h $ › depending on parameter $\lambda\in\Lambda$ is uniformly contracting (in the generalized sense), then each system of this family admits a compact global attractor $J^{\lambda}$ and the mapping $\lambda \to J^{\lambda}$ is continuous with respect to the Hausdorff metric. As an application we give a generalization of well known Theorem of Bransley concerning the continuous dependence of fractals on parameters.
- Published
- 2007
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