Prevalence of Delay Embeddings with a Fixed Observation Function
Abstract
Let , , be a dynamical system with being a diffeomorphism. Although the state vector is often unobservable, the dynamics can be recovered from the delay vector , where is the scalar-valued observation function and is the embedding dimension. The delay map is an embedding for generic , and more strongly, the embedding property is prevalent. We consider the situation where the observation function is fixed at , with being the projection to the first coordinate. However, we allow polynomial perturbations to be applied directly to the diffeomorphism , thus mimicking the way dynamical systems are parametrized. We prove that the delay map is an embedding with probability one with respect to the perturbations. Our proof introduces a new technique for proving prevalence using the concept of Lebesgue points.
Cite
@article{arxiv.1806.07529,
title = {Prevalence of Delay Embeddings with a Fixed Observation Function},
author = {Raymundo Navarrete and Divakar Viswanath},
journal= {arXiv preprint arXiv:1806.07529},
year = {2018}
}