@article{oai:tsukuba.repo.nii.ac.jp:02001767,
 author = {Ishii, Aki and 矢田, 和善 and YATA, Kazuyoshi and 青嶋, 誠 and AOSHIMA, Makoto},
 issue = {3},
 journal = {Annals of the Institute of Statistical Mathematics},
 month = {Jun},
 note = {We consider hypothesis testing for high-dimensional covariance structures in which the covariance matrix is a (i) scaled identity matrix, (ii) diagonal matrix, or (iii) intraclass covariance matrix. Our purpose is to systematically establish a nonparametric approach for testing the high-dimensional covariance structures (i)–(iii). We produce a new common test statistic for each covariance structure and show that the test statistic is an unbiased estimator of its corresponding test parameter. We prove that the test statistic establishes the asymptotic normality. We propose a new test procedure for (i)–(iii) and evaluate its asymptotic size and power theoretically when both the dimension and sample size increase. We investigate the performance of the proposed test procedure in simulations. As an application of testing the covariance structures, we give a test procedure to identify an eigenvector. Finally, we demonstrate the proposed test procedure by using a microarray data set.},
 pages = {599--622},
 title = {Hypothesis tests for high-dimensional covariance structures},
 volume = {73},
 year = {2021},
 yomi = {ヤタ, カズヨシ and アオシマ, マコト}
}