English

Multivariate limits of multilinear polynomial-form processes with long memory

Probability 2013-04-19 v1

Abstract

We consider the multilinear polynomial-form process X(n)=1i1<<ik<ai1aikϵni1ϵnik,X(n)=\sum_{1\le i_1<\ldots<i_k<\infty}a_{i_1}\ldots a_{i_k}\epsilon_{n-i_1}\ldots\epsilon_{n-i_k}, obtained by applying a multilinear polynomial-form filter to i.i.d.\ sequence {ϵi}\{\epsilon_i\} where {ai}\{a_i\} is regularly varying. The resulting sequence {X(n)}\{X(n)\} will then display either short or long memory. Now consider a vector of such X(n), whose components are defined through different {ai}\{a_i\}'s, that is, through different multilinear polynomial-form filters, but using the same {ϵi}\{\epsilon_i\}. What is the limit of the normalized partial sums of the vector? We show that the resulting limit is either a) a multivariate Gaussian process with Brownian motion as marginals, or b) a multivariate Hermite process, or c) a mixture of the two. We also identify the independent components of the limit vectors.

Keywords

Cite

@article{arxiv.1304.5209,
  title  = {Multivariate limits of multilinear polynomial-form processes with long memory},
  author = {Murad S. Taqqu and Shuyang Bai},
  journal= {arXiv preprint arXiv:1304.5209},
  year   = {2013}
}
R2 v1 2026-06-22T00:02:32.256Z