English

Asymptotic equivalence for nonparametric regression with dependent errors: Gauss-Markov processes

Statistics Theory 2021-10-26 v2 Statistics Theory

Abstract

For the class of Gauss-Markov processes we study the problem of asymptotic equivalence of the nonparametric regression model with errors given by the increments of the process and the continuous time model, where a whole path of a sum of a deterministic signal and the Gauss-Markov process can be observed. In particular we provide sufficient conditions such that asymptotic equivalence of the two models holds for functions from a given class, and we verify these for the special cases of Sobolev ellipsoids and H\"older classes with smoothness index >1/2> 1/2 under mild assumptions on the Gauss-Markov process at hand. To derive these results, we develop an explicit characterization of the reproducing kernel Hilbert space associated with the Gauss-Markov process, that hinges on a characterization of such processes by a property of the corresponding covariance kernel introduced by Doob. In order to demonstrate that the given assumptions on the Gauss-Markov process are in some sense sharp we also show that asymptotic equivalence fails to hold for the special case of Brownian bridge. Our findings demonstrate that the well-known asymptotic equivalence of the Gaussian white noise model and the nonparametric regression model with i.i.d. standard normal errors can be extended to a result treating general Gauss-Markov noises in a unified manner.

Keywords

Cite

@article{arxiv.2104.09485,
  title  = {Asymptotic equivalence for nonparametric regression with dependent errors: Gauss-Markov processes},
  author = {Holger Dette and Martin Kroll},
  journal= {arXiv preprint arXiv:2104.09485},
  year   = {2021}
}
R2 v1 2026-06-24T01:20:27.328Z