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Asymptotic expansions for distributions of the large sample matrix resultant and related statistics on the Stiefel manifold

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  • Chikuse, Yasuko

Abstract

Let Vk,m denote the Stiefel manifold which consists of m - k(m >= k) matrices X such that X'X = Ik. Let X1,..., Xn be a random sample of size n from the matrix Langevin (or von Mises-Fisher) distribution on Vk,m, which has the density proportional to exp(tr F'X), with F an m - k matrix, and let Z = (m/n)1/2 [Sigma]j = 1n Xj. The exact expression of the distribution of Z in an integral form is intractable. In this paper, we derive asymptotic expansions, for large n and up to the order of n-3, for the distributions of Z, Z'Z, and related statistics in connection with testing problems on F, under the hypothesis of uniformity (F = 0) and local alternative hypotheses. In the derivation, we utilize zonal and invariant polynomials in matrix arguments and Hermite and Laguerre polynomials in one-dimensional variable and matrix argument.

Suggested Citation

  • Chikuse, Yasuko, 1991. "Asymptotic expansions for distributions of the large sample matrix resultant and related statistics on the Stiefel manifold," Journal of Multivariate Analysis, Elsevier, vol. 39(2), pages 270-283, November.
    • Handle: RePEc:eee:jmvana:v:39:y:1991:i:2:p:270-283
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    Cited by:

    1. Chikuse, Yasuko, 2003. "Concentrated matrix Langevin distributions," Journal of Multivariate Analysis, Elsevier, vol. 85(2), pages 375-394, May.
    2. Chikuse, Yasuko, 1998. "Density Estimation on the Stiefel Manifold," Journal of Multivariate Analysis, Elsevier, vol. 66(2), pages 188-206, August.

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