On the regularity of time-delayed embeddings with self-intersections

Abstract

We study regularity of the time-delayed coordinate maps \[φh,k(x) = (h(x), h(Tx), …, h(Tk-1x))\] for a diffeomorphism T of a compact manifold M and smooth observables h on M. Takens' embedding theorem shows that if k > 2 M, then φh,k is an embedding for typical h. We consider the probabilistic case, where for a given probability measure μ on M one allows self-intersections in the time-delayed embedding to occur along a zero-measure set. We show that if k ≥ M and k > H(supp μ), then for a typical observable, φh,k is injective on a full-measure set with a pointwise Lipschitz inverse. If moreover k > M, then φh,k is a local diffeomorphism at almost every point. As an application, we show that if k > M, then the Lyapunov exponents of the original system can be approximated with arbitrary precision by almost every orbit in the time-delayed model of the system. We also give almost sure pointwise bounds on the prediction error and provide a non-dynamical analogue of the main result, which can be seen as a probabilistic version of Whitney's embedding theorem.