Exponential Inequalities for Some Mixing Processes and Dynamic Systems
Abstract
Many important dynamic systems, time series models or even algorithms exhibit non-strong mixing properties. In this paper, we introduce the general concept of -mixing to cover such cases, where assumptions on the dependence structure become stronger with increasing We derive a series of sharp exponential-type (or Bernstein-type) inequalities under this dependence concept for and . More specifically, -mixing is equal to the widely discussed -mixing \citep{maume2006exponential}, and we prove a refinement of an Berntsein-type inequality in \cite{hang2017bernstein} for -mixing processes under more general assumptions. As there exist many stochastic processes and dynamic systems, which are not (or )-mixing, we derive Bernstein-type inequalities for -mixing processes as well and we use this result to investigate the convergence rates of plug-in-type estimators of the local conditional mode set for vector-valued output, in particular in situations where the density is less smooth.
Keywords
Cite
@article{arxiv.2208.11481,
title = {Exponential Inequalities for Some Mixing Processes and Dynamic Systems},
author = {Zihao Yuan and Holger Dette},
journal= {arXiv preprint arXiv:2208.11481},
year = {2025}
}