English

Prevalence of Delay Embeddings with a Fixed Observation Function

Dynamical Systems 2018-06-21 v1 Chaotic Dynamics

Abstract

Let xj+1=ϕ(xj)x_{j+1}=\phi(x_{j}), xjRdx_{j}\in\mathbb{R}^{d}, be a dynamical system with ϕ\phi being a diffeomorphism. Although the state vector xjx_{j} is often unobservable, the dynamics can be recovered from the delay vector (o(x1),,o(xD))\left(o(x_{1}),\ldots,o(x_{D})\right), where oo is the scalar-valued observation function and DD is the embedding dimension. The delay map is an embedding for generic oo, and more strongly, the embedding property is prevalent. We consider the situation where the observation function is fixed at o=π1o=\pi_{1}, with π1\pi_{1} being the projection to the first coordinate. However, we allow polynomial perturbations to be applied directly to the diffeomorphism ϕ\phi, 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.

Keywords

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}
}
R2 v1 2026-06-23T02:35:28.246Z