1. Mean Equality Tests for High-Dimensional and Higher-Order Data with k -Self Similar Compound Symmetry Covariance Structure.
- Author
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Leiva, Ricardo and Roy, Anuradha
- Subjects
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JORDAN algebras , *SYMMETRY , *ENVIRONMENTAL engineering , *EYE diseases , *SAMPLE size (Statistics) , *HIGH-dimensional model representation - Abstract
An extension of the D 2 test statistic to test the equality of mean for high-dimensional and k-th order array-variate data using k-self similar compound symmetry (k-SSCS) covariance structure is derived. The k-th order data appear in many scientific fields including agriculture, medical, environmental and engineering applications. We discuss the property of this k-SSCS covariance structure, namely, the property of Jordan algebra. We formally show that our D 2 test statistic for k-th order data is an extension or the generalization of the D 2 test statistic for second-order data and for third-order data, respectively. We also derive the D 2 test statistic for third-order data and illustrate its application using a medical dataset from a clinical trial study of the eye disease glaucoma. The new test statistic is very efficient for high-dimensional data where the estimation of unstructured variance-covariance matrix is not feasible due to small sample size. [ABSTRACT FROM AUTHOR]
- Published
- 2022
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