References
- Anderson , T.W. and Fang , K. T. 1987 . Cochran's theorem for eiliptically contoured distributions . Sankhya , 49 : 305 – 315 .
- Fan , J. Acta. Appl. Math. Sinica Edited by: Anderson , T. W. and Fang , K. T. 185 – 198 .
- Fang , K.T. and Zhang , Y. 1990 . Generalized Multivariate Analysis , New York : Springer-Verlag .
- Gupta , A. K. and Varga , T. 1993 . Elliptically Contoured Models in Statistics , Dordrecht : Kluwer Academic .
- Gupta , A. K. and Varga , T. 1994 . A new class of matrix variate elliptically contoured distributions . Journal of Italian Statistical Society , 3 : 255 – 270 .
- Gupta , A. K. and Varga , T. 1994 . Moments and other expected values foi matrix variate elliptically contoured distributions . Statistics , 54 : 361 – 373 .
- Gupta , A. K. and Varga , T. 1995 . Some inference problems for matrix variate elliptically contoured distributions . Statistics , 55 : 219 – 229 .
- Gupta , A. K. and Varga , T. 1995 . Normal Mixture representations of matrix variate elliptically contoured distributions . Sankhya , 57 : 68 – 78 .
- Gupta , A. K. and Varga , T. 1995 . advances in the theory and practice of structures , Edited by: Johnson , L. and Balakrishnan , S. New York : J Wiley .
- Khatri , C.G. and Mitra , S. K. 1976 . Hermitian and nonnegative definite solutions of linear matrix equqtions . SIA.M J. Appl. Math , 31 : 570 – 585 .
- Mathai , A. , Provost , S. B. and Ilayakawa , T. 1995 . Bilinear Forms and Zonal Polynomials, Lecture Notes in Statistics , Vol. 102 , New-York : Springer-Verlag .
- Mathew , T. and Nordstrom , K. 1997 . Wishart and Chi-square distributions associated with matrix quadratic forms . J.Multivariate Anal , 61 : 129 – 143 .
- Tonghui , Wang . 1996 . Moments for elliptically contoured random matrices II . Sankhya , 58 : 115 – 125 .
- Tonghui , Wang and Chi Song , Wong . 1995 . Cochran theorems for a multivariate elliptically contoured model . J. Statist. Planning and Inference , 43 : 257 – 270 .