两个协方差矩阵的高维比例检验及其在基因表达数据中的应用

IF 0.7 Q3 STATISTICS & PROBABILITY Statistical Theory and Related Fields Pub Date : 2021-10-06 DOI:10.1080/24754269.2021.1984373
Long Feng, Xiaoxu Zhang, Binghui Liu
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引用次数: 0

摘要

随着现代科学技术的发展,越来越多的高维数据出现在应用领域。由于高维可能会增加协方差结构的复杂性,因此在高维数据分析中,比较总体之间的协方差矩阵是非常有动力的。在本文中,我们考虑两个高维协方差矩阵的比例检验,其中数据维度可能远大于样本大小,甚至大于样本大小的平方。我们设计了一种新的高维空间秩检验,它比许多现有的流行检验有很大的改进,特别是对于一些重尾分布产生的数据。所提出的检验统计量的渐近正态性是在椭圆对称分布族下建立的,椭圆对称分布是一个比正态分布族更一般的分布族,包括许多常用的重尾分布。大量的数值实验证明了所提出的测试在经验大小和功率方面的优越性。然后,实际数据分析证明了所提出的高维基因表达数据测试的实用性。
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High-dimensional proportionality test of two covariance matrices and its application to gene expression data
With the development of modern science and technology, more and more high-dimensional data appear in the application fields. Since the high dimension can potentially increase the complexity of the covariance structure, comparing the covariance matrices among populations is strongly motivated in high-dimensional data analysis. In this article, we consider the proportionality test of two high-dimensional covariance matrices, where the data dimension is potentially much larger than the sample sizes, or even larger than the squares of the sample sizes. We devise a novel high-dimensional spatial rank test that has much-improved power than many existing popular tests, especially for the data generated from some heavy-tailed distributions. The asymptotic normality of the proposed test statistics is established under the family of elliptically symmetric distributions, which is a more general distribution family than the normal distribution family, including numerous commonly used heavy-tailed distributions. Extensive numerical experiments demonstrate the superiority of the proposed test in terms of both empirical size and power. Then, a real data analysis demonstrates the practicability of the proposed test for high-dimensional gene expression data.
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来源期刊
CiteScore
0.90
自引率
20.00%
发文量
21
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