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Journal of the American Statistical Association Volume 111, 2016 - Issue 514
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Theory and Methods

Multivariate-Sign-Based High-Dimensional Tests for the Two-Sample Location Problem

Long Feng
,
Changliang Zou
&
Zhaojun WangCorrespondence[email protected]
Pages 721-735 | Received 01 Apr 2014, Published online: 18 Aug 2016

References

  • Alon, U., Barkai, N., Notterman, D. A., Gish, K., Ybarra, S., Mack, D., and Levine, A. J. (1999), “Broad Patterns of Gene Expression Revealed by Clustering Analysis of Tumor and Normal Colon Tissues Probed by Oligonucleotide Arrays,” Proceedings of the National Academy of Sciences, 96, 6745–6750.
  • Bai, Z. D., and Saranadasa, H. (1996), “Effect of High Dimension: By an Example of a Two Sample Problem,” Statistica Sinica, 6, 311–329.
  • Bickel, P. J., and Levina, E. (2008), “Regularized Estimation of Large Covariance Matrices,” The Annals of Statistics, 36, 199–227.
  • Biswas, M., and Ghosh, A. K. (2014), “A Nonparametric Two-Sample Test Applicable to High Dimensional Data,” Journal of Multivariate Analysis, 123, 160–171.
  • Cai, T., and Liu, W. (2011), “Adaptive Thresholding for Sparse Covariance Matrix Estimation,” Journal of the American Statistical Association, 106, 672–684.
  • Cai, T., Liu, W., and Xia, Y. (2014), “Two-Sample Test of High Dimensional Means Under Dependence,” Journal of the Royal Statistical Society, Series B, 76, 349–372.
  • Chen, L. S., Paul, D., Prentice, R. L., and Wang, P. (2011), “A Regularized Hotelling’s T2 Test for Pathway Analysis in Proteomic Studies,” Journal of the American Statistical Association, 106, 1345–1360.
  • Chen, S. X., and Qin, Y.-L. (2010), “A Two-Sample Test for High-Dimensional Data With Applications to Gene-Set Testing,” The Annals of Statistics, 38, 808–835.
  • Chen, S. X., Zhang, L.-X., and Zhong, P.-S. (2010), “Tests for High-dimensional Covariance Matrices,” Journal of the American Statistical Association, 105, 810–819.
  • Dempster, A. P. (1958), “A High Dimensional Two Sample Significance Test,” The Annals of Mathematical Statistics, 29, 995–1010.
  • Dudoit, S., Fridlyand, J., and Speed, T. P. (2002), “Comparison of Discrimination Methods for the Classification of Tumors Using Gene Expression Data,” Journal of the American Statistical Association, 97, 77–87.
  • Feng, L., Zou, C., Wang, Z., and Chen, B. (2013), “Rank-based Score Tests for High-dimensional Regression Coefficients,” Electronic Journal of Statistics, 7, 2131–2149.
  • Feng, L., Zou, C., Wang, Z., and Zhu, L. ( 2015), “Two-Sample Behrens-Fisher Problem for High-Dimensional Data,” Statistica Sinica, 25, 1297--1312.
  • Goeman, J. J., Geer, S. A., and Van Houwelingen, H. C. (2006), “Testing Against a High Dimensional Alternative,” Journal of the Royal Statistical Society, Series B, 68, 477–493.
  • Gregory, K. B., Carroll, R. J., Baladandayuthapani, V., and Lahiri, S. N. (2014), “A Two-Sample Test For Equality of Means in High Dimension,” Journal of the American Statistical Association, 110, 837--849.
  • Hall, P., and Heyde, C. C. (1980), Martingale Limit Theory and its Application, New York: Academic Press.
  • Hallin, M., and Paindaveine, D. (2006), “Semiparametrically Efficient Rank-based Inference for Shape. I. Optimal Rank-based Tests for Sphericity,” The Annals of Statistics, 34, 2707–2756.
  • Hettmansperger, T. P., and Oja, H. (1994), “Affine Invariant Multivariate Multisample Sign Tests,” Journal of the Royal Statistical Society, Series B, 56, 235–249.
  • Hettmansperger, T. P., and Randles, R. H. (2002), “A Practical Affine Equivariant Multivariate Median,” Biometrika, 89, 851–860.
  • Kosorok, M. R., and Ma, S. (2007), “Marginal Asymptotics for the “Large p, Small N” Paradigm: With Applications to Microarray Data,” The Annals of Statistics, 35, 1456–1486.
  • Ledoit, O., and Wolf, M. (2002), “Some Hypothesis Tests for the Covariance Matrix When the Dimension is Large Compared to the Sample Size,” The Annals of Statistics, 30, 1081–1102.
  • Möttönen, J., and Oja, H. (1995), “Multivariate Spatial Sign and Rank Methods,” Journal of Nonparametric Statistics, 5, 201–213.
  • Nettleton, D., Recknor, J., and Reecy, J. M. (2008), “Identification of Differentially Expressed Gene Categories in Microarray Studies Using Nonparametric Multivariate Analysis,” Bioinformatics, 24, 192–201.
  • Oja, H. (2010), Multivariate Nonparametric Methods With R: An Approach Based on Spatial Signs and Ranks, New York: Springer Science & Business Media.
  • Park, J., and Ayyala, D. N. (2013), “A Test for the Mean Vector in Large Dimension and Small Samples,” Journal of Statistical Planning and Inference, 143, 929–943.
  • Peters, D., and Randles, R. H. (1991), “A Bivariate Signed Rank Test for the Two-Sample Location Problem,” Journal of the Royal Statistical Society, Series B, 53, 493–504.
  • Puri, M. L., and Sen, P. K. (1971), Nonparametric Methods in Multivariate Analysis, New York: Wiley.
  • Randles, R. H. (2000), “A Simpler, Affine-Invariant, Multivariate, Distribution-Free Sign Test,” Journal of the American Statistical Association, 95, 1263–1268.
  • Schott, J. R. (2005), “Testing for Complete Independence in High Dimensions,” Biometrika, 92, 951–956.
  • Serfling, R. J. (2009), Approximation Theorems of Mathematical Statistics, New York: Wiley.
  • Srivastava, M. S., and Du, M. (2008), “A Test for the Mean Vector With Fewer Observations than the Dimension,” Journal of Multivariate Analysis, 99, 386–402.
  • Srivastava, M. S., Katayama, S., and Kano, Y. (2013), “A Two Sample Test in High Dimensional Data,” Journal of Multivariate Analysis, 114, 349–358.
  • Srivastava, M. S., Kollo, T., and von Rosen, D. (2011), “Some Tests for the Covariance Matrix With Fewer Observations than the Dimension Under Non-Normality,” Journal of Multivariate Analysis, 102, 1090–1103.
  • Srivastava, M. S., Yanagihara, H., and Kubokawa, T. (2014), “Tests for Covariance Matrices in High Dimension With Less Sample Size,” Journal of Multivariate Analysis, 130, 289–309.
  • Wang, L., Peng, B., and Li, R. (2015), “A High-Dimensional Nonparametric Multivariate Test for Mean Vector,” Journal of the American Statistical Association.
  • Zhong, P.-S., and Chen, S. X. (2011), “Tests for High-Dimensional Regression Coefficients With Factorial Designs,” Journal of the American Statistical Association, 106, 260–274.
  • Zhong, P.-S., Chen, S. X., and Xu, M. (2013), “Tests Alternative to Higher Criticism for High-Dimensional Means Under Sparsity and Column-wise Dependence,” The Annals of Statistics, 41, 2820–2851.
  • Zou, C., Peng, L., Feng, L., and Wang, Z. (2014), “Multivariate Sign-Based High-Dimensional Tests for Sphericity,” Biometrika, 101, 229–236.

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