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Transitive Limit Closures of Convex Dynamical Systems |
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| Authors: | Phil Diamond Alexander Vladimirov and Peter Kloeden |
| Institution: | (1) Mathematics Department, University of Queensland, 4072, Australia;(2) Department of Computing and Mathematics, Deakin University, Geelong, Victoria, 3217, Australia |
| Abstract: | Convex dynamical systems are iterated set-valued maps with convex graphs. The closed union of all finite powers of a given convex relation will be called its limit closure. We address the question of transitivity of limit closures and establish a sufficient condition for such transitivity (limit transitivity). We also present examples showing that the limit closure of a general compact convex system is not necessarily transitive. limit closure can be intransitive as well. It is also shown that the restriction of a linear single-valued map to a convex set containing an open neighborhood of the origin is always limit transitive. |
| Keywords: | convex relation set-valued dynamical system Hausdorff metric linear map transitivity |
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