Abstract
Some issues on fluctuation of solutions to Lorenz and Rossler systems, for instance, are related to viability kernels of subsets under continuous time systems, or in the case of Julia sets, for instance, under discrete time systems. It happens that viability kernels of subsets, capture basins of targets and the combination of the twos provide tools for the analysis of the local behavior around equilibria (local stable and unstable manifolds), the asymptotic behavior and the functuation of evolutions between two areas of a domain, etc. Since algorithms and softwares do exist for computing the viability kernels and the capture basins, as well as evolutions viable in the viability kernel until they converge to a target infinite time, we are able to localize fluctuation basins.
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