具有时空相关系数的独立同分布随机微分方程的非参数估计

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS

ACS Applied Bio Materials Pub Date : 2024-05-21 DOI:10.1137/23m1581662

Fabienne Comte, Valentine Genon-Catalot

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引用次数: 0

摘要

SIAM/ASA 不确定性量化期刊》第 12 卷第 2 期第 377-410 页，2024 年 6 月。摘要。我们考虑具有漂移[math]和扩散系数[math]的[math]独立同分布一维非均质扩散过程[math]，其中[math]和[math]函数[math]和[math]是已知的。我们关心的是如何从对固定时间间隔[math]内样本路径[math]的连续观测中，对[math]维未知函数[math]进行非参数估计。我们建立了属于[math]有限维子空间乘积的投影估计器集合。[math]风险由经验规范或与问题相匹配的确定性规范的期望值定义。讨论了大[math]的收敛速率。提出了投影空间维数的数据驱动选择。模拟数据的数值实验说明了理论结果。

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Nonparametric Estimation for Independent and Identically Distributed Stochastic Differential Equations with Space-Time Dependent Coefficients

SIAM/ASA Journal on Uncertainty Quantification, Volume 12, Issue 2, Page 377-410, June 2024.
Abstract. We consider [math] independent and identically distributed one-dimensional inhomogeneous diffusion processes [math] with drift [math] and diffusion coefficient [math], where [math] and the functions [math] and [math] are known. Our concern is the nonparametric estimation of the [math]-dimensional unknown function [math] from the continuous observation of the sample paths [math] throughout a fixed time interval [math]. A collection of projection estimators belonging to a product of finite-dimensional subspaces of [math] is built. The [math]-risk is defined by the expectation of either an empirical norm or a deterministic norm fitted to the problem. Rates of convergence for large [math] are discussed. A data-driven choice of the dimensions of the projection spaces is proposed. The theoretical results are illustrated by numerical experiments on simulated data.

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来源期刊

ACS Applied Bio Materials Chemistry-Chemistry (all)

CiteScore

9.40

自引率

2.10%

发文量

464