Mathematics – Dynamical Systems
Scientific paper
2012-02-29
Mathematics
Dynamical Systems
30 pages
Scientific paper
In this work we construct the $\Co^{\r}$-completion and $\Co^{\l}$-completion of a dynamical system. If $X$ is a flow, we construct canonical maps $X\to \Co^{\r}(X)$ and $X\to \Co^{\l}(X)$ and when these maps are homeomorphism we have the class of $\Co^{\r}$-complete and $\Co^{\l}$-complete flows, respectively. In this study we find out many relations between the topological properties of the completions and the dynamical properties of a given flow. In the case of a complete flow this gives interesting relations between the topological properties (separability properties, compactness, convergence of nets, etc.) and dynamical properties (periodic points, omega limits, attractors, repulsors, etc.).
Garcia Calcines Jose M.
Hernandez Paricio L. J.
Rivas Rodriguez Teresa M.
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