A Test on the Multivariate Behrens–Fisher Problem in High–Dimensional Data by Block Covariance Estimation

Paranut Sukcharoen, S. Chongcharoen
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引用次数: 1

Abstract

In this paper, we proposed a new testing statistic for testing the equality of mean vectors from two multivariate normal populations when the covariance matrices are unknown and unequal in high–dimensional data. A new test is proposed based on the idea of keeping more information from the sample covariance matrices as much as possible. A proposed test is invariant under scalar transformations and location shifts. We showed that the asymptotic distribution of proposed statistic is standard normal distribution when number of random variables approach infinity. We also compared the performance of the proposed test with other three existing tests by the simulation study. The simulation results showed that the attained significance level of proposed test close to setting nominal significance level satisfactorily. The attained power of proposed test outperforms as the other comparative tests under form of covariance matrices considered which can be arranged to block diagonal matrix structure. The attained power becomes more powerful when the dimension increases for a given sample size or vice versa, or relationship level between random variables in each sample increases. Finally, the proposed test is also illustrated with an analysis of DNA microarray data.
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用块协方差估计检验高维数据中的多元Behrens-Fisher问题
本文提出了一种新的检验统计量,用于在高维数据中,当协方差矩阵未知且不相等时,检验两个多元正态总体的均值向量是否相等。基于尽可能多地保留样本协方差矩阵信息的思想,提出了一种新的检验方法。所提出的测试在标量变换和位置移位下是不变性的。我们证明了当随机变量的数目趋近于无穷时,所提出的统计量的渐近分布是标准正态分布。通过仿真研究,将所提出的测试方法与其他三种现有测试方法的性能进行了比较。仿真结果表明,所提出的检验的显著性水平接近设定的名义显著性水平。在协方差矩阵的形式下,所提出的检验所获得的功率优于其他比较检验,考虑到协方差矩阵可以排列成对角矩阵结构。当给定样本量的维度增加或反之亦然,或每个样本中随机变量之间的关系水平增加时,获得的功率变得更强大。最后,提出的测试也说明了DNA微阵列数据的分析。
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33.30%
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