English

Estimating non-linear functionals of trawl processes

Probability 2026-03-20 v3 Statistics Theory Statistics Theory

Abstract

Trawl processes are a family of continuous-time, infinitely divisible, stationary processes whose correlation structure is entirely characterized by their so-called trawl function. This paper investigates the problem of estimating non-linear functionals of a trawl function under in-fill and long-span sampling schemes. Specifically, building on the work of \cite{SauriVeraart23}, we introduce non-parametric estimators for functionals of the type Ψt(g)=0tg(a(s))ds\Psi_{t}(g)=\int_{0}^{t}g(a(s))\mathrm{d}s and Λt(g)=tg(a(s))ds \Lambda_t(g)=\int_{t}^{\infty}g(a(s))\mathrm{d}s, where aa represents the trawl function of interest and gg a non-linear test function. We show that our estimator for Ψt(g)\Psi_{t}(g) is consistent and asymptotically Gaussian regardless of the memory of the process. We further demonstrate that the same phenomenon occurs for the estimation of Λt(g)\Lambda_t(g) as long as g(x)=O(xp)g(x)= \mathrm{O} (\lvert x\rvert^p), as x0x\to0, for some p>3p>3. Additionally, we illustrate how our results can be used to construct a test statistic robust to memory effects for the presence of TT-dependent.

Keywords

Cite

@article{arxiv.2508.19949,
  title  = {Estimating non-linear functionals of trawl processes},
  author = {Orimar Sauri},
  journal= {arXiv preprint arXiv:2508.19949},
  year   = {2026}
}
R2 v1 2026-07-01T05:08:34.361Z