SUP-NORM ADAPTIVE DRIFT ESTIMATION FOR MULTIVARIATE NONREVERSIBLE DIFFUSIONS
成果类型:
Article
署名作者:
Aeckerle-willems, Cathrine; Strauch, Claudia
署名单位:
University of Mannheim; Aarhus University
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/22-AOS2237
发表日期:
2022
页码:
3484-3509
关键词:
invariant density
CONVERGENCE
pointwise
inference
THEOREMS
rates
摘要:
We consider the question of estimating the drift for a large class of er-godic multivariate and possibly nonreversible diffusion processes, based on continuous observations, in sup-norm loss. Nonparametric classes of smooth functions of unknown order are considered, and we suggest an adaptive ap-proach which allows to construct drift estimators attaining optimal sup-norm rates of convergence. Reversibility structures and related functional inequali-ties are known to be key tools for these estimation problems. We can discard such restrictions by making use of mixing properties which are satisfied for the very general class of processes under consideration. Analysing diffusions, the scalar case is very distinct from the general multivariate setting. There-fore, we treat scalar and multivariate processes separately which leads to in several aspects improved univariate results. While we consider drift estima-tion on bounded domains for exponentially beta-mixing multivariate processes, for scalar diffusion processes we work under minimal assumptions that allow estimation of unbounded drift terms over the entire real line, and we pro-vide classical minimax results (including lower bounds) which cannot be ob-tained under state-of-the-art conditions in the multivariate case. In addition, we prove a Donsker theorem for the classical kernel estimator of the invariant density in the scalar setting and establish its semiparametric efficiency.