Estimating non-linear functionals of trawl processes

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 SauriVeraart23, we introduce non-parametric estimators for functionals of the type t(g)=∫0tg(a(s))ds and t(g)=∫t∞g(a(s))ds, where a represents the trawl function of interest and g a non-linear test function. We show that our estimator for 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 t(g) as long as g(x)= O ( xp), as x0, for some p>3. Additionally, we illustrate how our results can be used to construct a test statistic robust to memory effects for the presence of T-dependent.