Testing covariance separability for continuous functional data

IF 1.2 4区数学 Q3 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS

Journal of Time Series Analysis Pub Date : 2024-08-12 DOI:10.1111/jtsa.12764

Holger Dette, Gauthier Dierickx, Tim Kutta

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引用次数: 0

Abstract

Analyzing the covariance structure of data is a fundamental task of statistics. While this task is simple for low‐dimensional observations, it becomes challenging for more intricate objects, such as multi‐variate functions. Here, the covariance can be so complex that just saving a non‐parametric estimate is impractical and structural assumptions are necessary to tame the model. One popular assumption for space‐time data is separability of the covariance into purely spatial and temporal factors. In this article, we present a new test for separability in the context of dependent functional time series. While most of the related work studies functional data in a Hilbert space of square integrable functions, we model the observations as objects in the space of continuous functions equipped with the supremum norm. We argue that this (mathematically challenging) setup enhances interpretability for users and is more in line with practical preprocessing. Our test statistic measures the maximal deviation between the estimated covariance kernel and a separable approximation. Critical values are obtained by a non‐standard multiplier bootstrap for dependent data. We prove the statistical validity of our approach and demonstrate its practicability in a simulation study and a data example.

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测试连续函数数据的协方差可分性

分析数据的协方差结构是统计学的一项基本任务。虽然这项任务对于低维观测数据来说很简单，但对于更复杂的对象（如多变量函数）来说就变得具有挑战性。在这种情况下，协方差可能非常复杂，仅仅保存一个非参数估计是不切实际的，因此需要结构假设来驯服模型。对于时空数据，一种流行的假设是将协方差分离为纯粹的空间和时间因素。在本文中，我们提出了一种在依赖函数时间序列背景下的新的可分性检验方法。大多数相关工作都是在方形可积分函数的希尔伯特空间中研究函数数据，而我们则将观测数据建模为连续函数空间中的对象，并配备了至上规范。我们认为，这种（数学上具有挑战性的）设置增强了用户的可解释性，也更符合实际预处理的需要。我们的检验统计量测量的是估计协方差核与可分离近似值之间的最大偏差。临界值是通过对依存数据进行非标准乘法自举得到的。我们通过模拟研究和数据示例证明了我们方法的统计有效性，并展示了其实用性。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of Time Series Analysis 数学-数学跨学科应用

CiteScore

2.00

自引率

0.00%

发文量

审稿时长

6-12 weeks

期刊介绍： During the last 30 years Time Series Analysis has become one of the most important and widely used branches of Mathematical Statistics. Its fields of application range from neurophysiology to astrophysics and it covers such well-known areas as economic forecasting, study of biological data, control systems, signal processing and communications and vibrations engineering. The Journal of Time Series Analysis started in 1980, has since become the leading journal in its field, publishing papers on both fundamental theory and applications, as well as review papers dealing with recent advances in major areas of the subject and short communications on theoretical developments. The editorial board consists of many of the world''s leading experts in Time Series Analysis.