John Taylor
Published 2013-08-13Version 1
We give a definition of chaos for a continuous self-map of a general topological space. This definition coincides with the Devanney definition for chaos when the topological space happens to be a metric space. We show that in a uniform Hausdorff space, there is a meaningful definition of sensitive dependence on initial conditions, and prove that if a map is chaotic on a such a space, then it necessarily has sensitive dependence on initial conditions. The proof is interesting in that it explains very clearly what causes a chaotic process to have sensitive dependence. Finally, we construct a chaotic map on a non-metrizable topological space.
Sensitive dependence on initial conditions and chaotic group actions
On sensitivity to initial conditions and uniqueness of conjugacies for structurally stable diffeomorphisms
Sensitive dependence of geometric Gibbs states
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