高维非线性和非高斯数据图形建模的双重回归方法

Pub Date : 2024-07-19 DOI:10.4310/22-sii756
Siqi Liang, Faming Liang
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引用次数: 0

摘要

图形模型作为一种推断大量随机变量之间条件独立性关系的工具,在统计学中研究已久。现有的图形建模研究大多集中在数据为高斯或混合数据以及变量为线性相关变量的情况下。在本文中,我们提出了一种在高维非线性和非高斯环境下学习图形模型的双重回归方法,并证明所提出的方法在温和条件下是一致的。所提出的方法通过执行一系列非参数条件独立性检验来实现。每个检验的条件集通过双重回归程序进行缩减,其中可以使用无模型确定独立性筛选程序或稀疏深度神经网络。数值结果表明,所提出的方法能很好地处理高维非线性和非高斯数据。
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A double regression method for graphical modeling of high-dimensional nonlinear and non-Gaussian data
Graphical models have long been studied in statistics as a tool for inferring conditional independence relationships among a large set of random variables. The most existing works in graphical modeling focus on the cases that the data are Gaussian or mixed and the variables are linearly dependent. In this paper, we propose a double regression method for learning graphical models under the high-dimensional nonlinear and non-Gaussian setting, and prove that the proposed method is consistent under mild conditions. The proposed method works by performing a series of nonparametric conditional independence tests. The conditioning set of each test is reduced via a double regression procedure where a model-free sure independence screening procedure or a sparse deep neural network can be employed. The numerical results indicate that the proposed method works well for high-dimensional nonlinear and non-Gaussian data.
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