Limit Theorems for Conservative Flows on Multiple Stochastic Integrals
Abstract
We consider a stationary sequence constructed by a multiple stochastic integral and an infinite-measure conservative dynamical system. The random measure defining the multiple integral is non-Gaussian, infinitely divisible and has a finite variance. Some additional assumptions on the dynamical system give rise to a parameter quantifying the conservativity of the system. This parameter together with the order of the integral determines the decay rate of the covariance of . The goal of the paper is to establish limit theorems for the partial sum process of . We obtain a central limit theorem with Brownian motion as limit when the covariance decays fast enough, as well as a non-central limit theorem with fractional Brownian motion or Rosenblatt process as limit when the covariance decays slow enough.
Cite
@article{arxiv.2005.07789,
title = {Limit Theorems for Conservative Flows on Multiple Stochastic Integrals},
author = {Shuyang Bai},
journal= {arXiv preprint arXiv:2005.07789},
year = {2021}
}
Comments
23 pages