Fluctuation bounds for chaos plus noise in dynamical systems
Abstract
We are interested in time series of the form yn = xn + n where xn is generated by a chaotic dynamical system and where n models observational noise. Using concentration inequalities, we derive fluctuation bounds for the auto-covariance function, the empirical measure, the kernel density estimator and the correlation dimension evaluated along y0, ..., yn, for all n. The chaotic systems we consider include for instance the H\'enon attractor for Benedicks-Carleson parameters.
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