This is a preview of subscription content, log in via an institution to check access.
References
T. W. Anderson, “The non-central Wishart distribution and certain problems of multivariate statistics,”Ann. Math. Statist., 17 (1946), 409–431.
T. W. Anderson,An Introduction to Multivariate Statistical Analysis, Wiley, New York, 1958.
T. W. Anderson and M. A. Girshick, “Some extensions of the Wishart distribution,”Ann. Math. Statist., 15 (1944), 345–357.
A. G. Constantine, “The distribution of Hotelling’s generalizedT 0 2,”Ann. Math. Statist., 37 (1966), 215–225.
A. K. Gupta, “Some central and non-central distribution problems in multivariate analysis,” Mimeograph Series No. 139 (1968), Department of Statistics, Purdue Univ.
A. T. James, “The distribution of non-central means with known covariance,”Ann. Math. Statist., 32 (1961), 874–882.
A. T. James, “Distributions of matrix variates and latent roots derived from normal samples,”Ann. Math. Statist., 35 (1964), 475–501.
C. G. Khatri, “Distribution of the generalized multiple correlation matrix in the dual case,”Ann. Math. Statist., 35 (1964), 1801–1806.
C. G. Khatri, “Classical statistical analysis based on a certain multivariate complex Gaussian distribution,”Ann. Math. Statist., 36 (1965), 98–114.
C. G. Khatri, “Some distribution problems connected with the characteristic roots ofS 1 S 2 −1,”Ann. Math. Statist., 38 (1967), 944–948.
C. G. Khatri and K. C. S. Pillai, “Some results on the non-central multivariate beta distribution and moments of traces of two matrices,”Ann. Math. Statist., 36 (1965), 1511–1520.
C. G. Khatri and K. C. S. Pillai, “Further results on the non-central multivariate bete distribution and moments of traces of two matrices,” Mimeograph Series No. 38, 1965, Department of Statistics, Purdue Univ.
C. G. Khatri and K. C. S. Pillai, “On the moments of elementary symmetric functions of two matrices and an approximation to a distribution,”Ann. Math. Statist., 39 (1968), 1274–1281.
A. M. Kshirsagar, “The non-central multivariate beta distribution,”Ann. Math. Statist., 32 (1961), 104–111.
K. C. S. Pillai, “On the moments of elementary symmetric functions of the roots of two matrices,”Ann. Math. Statist., 35 (1964), 1704–1712.
K. C. S. Pillai, “On elementary symmetric functions of the roots of two matrices in multivariate analysis,”Biometrika, 52 (1965), 499–506.
K. C. S. Pillai, “Moment generating function of Pillai’sV (s) criterion,”Ann. Math. Statist., 39 (1968), 877–880.
K. C. S. Pillai and A. K. Gupta, “On the non-central distribution of the second elementary symmetric function of the roots of a matrix,”Ann. Math. Statist., 39 (1968), 833–839.
S. N. Roy,Some Aspects of Multivariate Analysis, Wiley, New York, 1957.
S. N. Roy and R. Gnanadesikan, “Some contributions to ANOVA in one or two dimensions: II,”Ann. Math. Statist., 30 (1959), 318–340.
Author information
Authors and Affiliations
Additional information
The work of this author was supported by the National Science Foundation Grant No. GP-7663.
About this article
Cite this article
Sreedharan Pillai, K.C., Jouris, G.M. On the moments of elementary symmetric functions of the roots of two matrices. Ann Inst Stat Math 21, 309–320 (1969). https://doi.org/10.1007/BF02532258
Received:
Revised:
Issue Date:
DOI: https://doi.org/10.1007/BF02532258