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基于函数可加回归算子的非参数函数型图模型

Nonparametric Functional Graphical Modeling Through Functional Additive Regression Operator

Journal of the American Statistical Association · 2021
被引 16
ABS 4

中文导读

提出一种非参数图模型,通过函数可加回归算子捕捉多元随机函数间的非线性关系,避免维数灾难,适用于大规模网络,并在脑电图数据上验证了有效性。

Abstract

In this article, we develop a nonparametric graphical model for multivariate random functions. Most existing graphical models are restricted by the assumptions of multivariate Gaussian or copula Gaussian distributions, which also imply linear relations among the random variables or functions on different nodes. We relax those assumptions by building our graphical model based on a new statistical object—the functional additive regression operator. By carrying out regression and neighborhood selection at the operator level, our method can capture nonlinear relations without requiring any distributional assumptions. Moreover, the method is built up using only one-dimensional kernel, thus, avoids the curse of dimensionality from which a fully nonparametric approach often suffers, and enables us to work with large-scale networks. We derive error bounds for the estimated regression operator and establish graph estimation consistency, while allowing the number of functions to diverge at the exponential rate of the sample size. We demonstrate the efficacy of our method by both simulations and analysis of an electroencephalography dataset. Supplementary materials for this article are available online.

非参数统计图模型函数型数据分析高维统计