Research Article Open Access

One-Sided Multivariate Tests for High Dimensional Data

Samruam Chongcharoen1
  • 1 , Thailand

Abstract

Problem statement: For a multivariate normal population with size smaller than dimension, n<p, the likelihood ratio tests of the null hypothesis that the mean vector was zero with a one-sided alternative were no longer valid because they involved with sample covariance matrix which was singular. Approach: The test statistics for one-sided multivariate hypotheses with n<p were proposed. Results: The simulation study showed that the proposed tests provided reasonable type I error rate for one-sided covariance structures. They also give good powers. The application of these tests was given by testing of one-sided hypotheses on DNA micro array data. Conclusion: Under that there have no such other tests available at present for this kind of hypothesis testing with n<p yet, the proposed tests are good ones. However, the methodology is valid for any one-sided hypotheses application which involves high-dimensional data.

Journal of Mathematics and Statistics
Volume 8 No. 2, 2012, 274-282

DOI: https://doi.org/10.3844/jmssp.2012.274.282

Submitted On: 14 February 2012 Published On: 20 June 2012

How to Cite: Chongcharoen, S. (2012). One-Sided Multivariate Tests for High Dimensional Data. Journal of Mathematics and Statistics, 8(2), 274-282. https://doi.org/10.3844/jmssp.2012.274.282

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Keywords

  • DNA micro arrays
  • multivariate normal
  • one-sided multivariate test
  • Follmann’s test
  • power comparison