Advanced search
Publication Cover
Communications in Statistics - Simulation and Computation Volume 52, 2023 - Issue 9
Submit an article Journal homepage
112
Views
1
CrossRef citations to date
0
Altmetric
Article

Distribution approximation of covariance matrix eigenvalues

Shin-ichi Tsukadaa School of Education, Meisei University, Hino City, Tokyo, JapanCorrespondence[email protected]
&
Takatoshi Sugiyamab Institute of Statistical Science, Suginami-ku, Tokyo, Japan
Pages 4313-4325 | Received 25 Nov 2020, Accepted 21 Jul 2021, Published online: 24 Aug 2021

References

  • Anderson, G. A. 1965. An asymptotic expansion for the distribution of the latent roots of the estimated covariance matrix. The Annals of Mathematical Statistics 36 (4):1153–73. doi:10.1214/aoms/1177699989.
  • Anderson, T. W. 1963. Theory for principal component analysis. The Annals of Mathematical Statistics 34 (1):122–48. doi:10.1214/aoms/1177704248.
  • Fujikoshi, Y. 1980. Asymptotic expansions for the distributions of the sample roots under non normality. Biometrika 67 (1):45–51. doi:10.1093/biomet/67.1.45.
  • Girshick, M. A. 1939. On the sampling theory of roots of determinantal equations. The Annals of Mathematical Statistics 10 (3):203–24. doi:10.1214/aoms/1177732180.
  • Hashiguchi, H., and N. Niki. 2006. Numerical computation on distributions of the largest and the smallest latent roots of the Wishart matrix. Journal of the Japanese Society of Computational Statistics 19 (1):45–56. doi:10.5183/jjscs1988.19.45.
  • Hashiguchi, H., Y. Numata, N. Takayama, and A. Takemura. 2013. Holonomic gradient method for the distribution function of the largest root of a Wishart matrix. Journal of Multivariate Analysis 117:296–312. doi:10.1016/j.jmva.2013.03.011.
  • Johnson, R. A., and D. W. Wichern. 2007. Applied multivariate statistical analysis, 6th ed. London, UK: Pearson Education Inc.
  • Kato, H., and H. Hashiguchi. 2014. Chi-squre approximations for eigenvalue distributions and confidential interval construction on population eigenvalues. Bulletin of the Computational Statistics of Japan 27:11–28.
  • Koev, P., and A. Edelman. 2006. The efficient evaluation of the hypergeometric function of a matrix argument. Mathematics of Computation 75 (254):833–46. doi:10.1090/S0025-5718-06-01824-2.
  • Konishi, S., and T. Sugiyama. 1981. Improved approximations to distributions of the largest and smallest latent roots of a Wishart matrix. Annals of the Institute of Statistical Mathematics 33 (1):27–33. doi:10.1007/BF02480916.
  • Sugiura, N. 1973. Derivatives of the characteristic root of a symmetric or a Hermitian matrix with two applications in multivariate analysis. Communications in Statistics - Simulation and Computation 1 (5):393–417. doi:10.1080/03610917308548243.
  • Sugiyama, T. 1967. On the distribution of the largest latent root of the covariance matrix. The Annals of Mathematical Statistics 38 (4):1148–51. doi:10.1214/aoms/1177698783.
  • Sugiyama, T. 1972a. Approximation for the distribution of the largest latent root of a Wishart matrix. Australian Journal of Statistics 14 (1):17–24. doi:10.1111/j.1467-842X.1972.tb00332.x.
  • Sugiyama, T. 1972b. Percentile points of the largest latent root of a matrix and power calculations for testing hypothesis Σ=I. Journal of the Japan Statistical Society, Japanese Issue 3:1–8.
  • Sugiyama, T., M. Fukuda, and Y. Takeda. 1999. Recurrence relations of coefficients of the generalized hypergeometric function in multivariate analysis. Communications in Statistics - Theory and Methods 28 (3-4):825–37. doi:10.1080/03610929908832328.
  • Sugiyama, T., T. Ogura, and Y. Fujikoshi. 2014. Multivaraite Data Analysis (in Japanese). Tokyo, Japan: Asakura Publishing Co., Ltd.
  • Sugiyama, T., T. Ogura, Y. Takeda, and H. Hashiguchi. 2013. Approximation of upper percentile points for the second largest latent root in principal component analysis. International Journal of Knowledge Engineering and Soft Data Paradigms 4 (2):107–17. doi:10.1504/IJKESDP.2013.058126.
  • Sugiyama, T., Y. Takeda, and M. Fukuda. 1998. A non-parametric method to test equality of intermediate latent roots of two populations in a principal component analysis. Journal of the Japan Statistical Society 28 (2):227–8. doi:10.14490/jjss1995.28.227.
  • Takemura, A., and Y. Sheena. 2005. Distribution of eigenvalues and eigenvectors of Wishart matrix when the population eigenvalues are infinitely dispersed and its application to minimax estimation of covariance matrix. Journal of Multivariate Analysis 94 (2):271–99. doi:10.1016/j.jmva.2004.05.003.
  • Takeuchi, K. 1975. Approximation of Probability Distributions (in Japanese). Tokyo, Japan: Kyouiku Shuppan.
  • Tsuchiya, T., and S. Konishi. 1999. General saddlepoint approximations to distributions under an elliptical population. Communications in Statistics - Theory and Methods 28 (3-4):727–54. doi:10.1080/03610929908832323.

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.