使用边际乘积基系统的多维函数数据高效分析

Efficient Multidimensional Functional Data Analysis Using Marginal Product Basis Systems

Journal of Computational and Graphical Statistics · 2023
被引 1
ABS 3

中文导读

提出一种计算框架,通过可分离基函数和张量分解高效学习多维函数数据的连续表示,避免维度灾难,并应用于临床扩散MRI数据。

Abstract

In areas ranging from neuroimaging to climate science, advances in data storage and sensor technology have led to a proliferation in multidimensional functional datasets. A common approach to analyzing functional data is to first map the discretely observed functional samples into continuous representations, and then perform downstream statistical analysis on these smooth representations. It is well known that many of the traditional approaches used for 1D functional data representation are plagued by the curse of dimensionality and quickly become intractable as the dimension of the domain increases. In this article, we propose a computational framework for learning continuous representations from a sample of multidimensional functional data that is immune to several manifestations of the curse. The representations are constructed using a set of separable basis functions that are defined to be optimally adapted to the data. We show that the resulting estimation problem can be solved efficiently by the tensor decomposition of a carefully defined reduction transformation of the observed data. Roughness-based regularization is incorporated using a class of differential operator-based penalties. Relevant theoretical properties are also discussed. The advantages of our method over competing methods are thoroughly demonstrated in simulations. We conclude with a real data application of our method to a clinical diffusion MRI dataset. Supplementary materials for this article are available online.

函数数据分析降维张量分解神经影像气候科学