Domenico Aiello, Hansheng Diao, Zhou Fan, Daniel O. King, Jessica Lin, Cesar E. Silva
Published 2011-05-08Version 1
We develop two notions of time-restricted sensitivity to initial conditions for measurable dynamical systems, where the time before divergence of a pair of paths is at most an asymptotically logarithmic function of a measure of their initial distance. In the context of finite measure-preserving transformations on a compact space, we relate these notions to the metric entropy of the system. We examine one of these notions for classes of non-measure-preserving, nonsingular transformations.
Journal: Nonlinearity 25 (2012), no. 12, 3313-3325
Sensitive dependence on initial conditions and chaotic group actions
Upper semi-continuity of metric entropy for diffeomorphisms with dominated splitting
On sensitivity to initial conditions and uniqueness of conjugacies for structurally stable diffeomorphisms
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