TSSS: A Novel Triangulated Spherical Spline Smoothing for Surface-Based Data.

IF 0.9 4区数学 Q3 STATISTICS & PROBABILITY

Journal of Nonparametric Statistics Pub Date : 2025-01-01 Epub Date: 2025-01-07 DOI:10.1080/10485252.2025.2449886

Zhiling Gu, Shan Yu, Guannan Wang, Ming-Jun Lai, Lily Wang

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引用次数: 0

Abstract

Surface-based data are prevalent across diverse practical applications in various fields. This paper introduces a novel nonparametric method to discover the underlying signals from data distributed on complex surface-based domains. The proposed approach involves a penalized spline estimator defined on a triangulation of surface patches, enabling effective signal extraction and recovery. The proposed method offers superior handling of "leakage" or "boundary effects" over complex domains, enhanced computational efficiency, and capabilities for analyzing sparse and irregularly distributed data on complex objects. We provide rigorous theoretical guarantees, including convergence rates and asymptotic normality of the estimators. We demonstrate that the convergence rates are optimal within the framework of nonparametric estimation. A bootstrap method is introduced to quantify the uncertainty in the proposed estimators and to provide pointwise confidence intervals. The advantages of the proposed method are demonstrated through simulations and data applications on cortical surface neuroimaging data and oceanic near-surface atmospheric data.

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一种新的基于曲面数据的三角球面样条平滑方法。

基于表面的数据在各个领域的各种实际应用中都很普遍。本文介绍了一种从分布在复杂表面域的数据中发现底层信号的非参数方法。所提出的方法包括在表面斑块的三角剖分上定义一个惩罚样条估计量，从而实现有效的信号提取和恢复。该方法对复杂域上的“泄漏”或“边界效应”提供了更好的处理，提高了计算效率，并具有分析复杂对象上稀疏和不规则分布数据的能力。我们提供了严格的理论保证，包括收敛率和渐近正态性。我们证明了在非参数估计框架下的收敛速度是最优的。引入了一种自举方法来量化所提出的估计量中的不确定性，并提供了点态置信区间。通过对皮层表面神经成像数据和海洋近地表大气数据的模拟和数据应用，证明了该方法的优越性。

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 Nonparametric Statistics 数学-统计学与概率论

CiteScore

1.50

自引率

8.30%

发文量

审稿时长

6-12 weeks

期刊介绍： Journal of Nonparametric Statistics provides a medium for the publication of research and survey work in nonparametric statistics and related areas. The scope includes, but is not limited to the following topics: Nonparametric modeling, Nonparametric function estimation, Rank and other robust and distribution-free procedures, Resampling methods, Lack-of-fit testing, Multivariate analysis, Inference with high-dimensional data, Dimension reduction and variable selection, Methods for errors in variables, missing, censored, and other incomplete data structures, Inference of stochastic processes, Sample surveys, Time series analysis, Longitudinal and functional data analysis, Nonparametric Bayes methods and decision procedures, Semiparametric models and procedures, Statistical methods for imaging and tomography, Statistical inverse problems, Financial statistics and econometrics, Bioinformatics and comparative genomics, Statistical algorithms and machine learning. Both the theory and applications of nonparametric statistics are covered in the journal. Research applying nonparametric methods to medicine, engineering, technology, science and humanities is welcomed, provided the novelty and quality level are of the highest order. Authors are encouraged to submit supplementary technical arguments, computer code, data analysed in the paper or any additional information for online publication along with the published paper.