References
- Anderson, T.W., Fang, K.T., Hsu, H. (1986). Maximum-likelihood estimates and likelihood-ratio criteria for multivariate elliptically contoured distributions. Can. J. Stat. 14:55–59.
- Azzalini, A. (1985). A class of distributions which includes the normal ones. Scandinavian J. Stat. 12:171–178.
- Azzalini, A. (1986). Further results on a class of distributions which includes the normal ones. Statistica 46:199–208.
- Azzalini, A., Capitanio, A. (2003). Distributions generated by perturbation of symmetry with emphasis on a multivariate skew t-distribution. J. Royal Stat. Soc. B 65:367–389.
- Brockwell, P., Davis, R.A. (2002). Introduction to Time Series and Forecasting. New York: Springer Verlag.
- Chu, K.C. (1973). Estimation and decision for linear systems with elliptical random processes. IEEE Trans. Auto. Control 18:499–505.
- Durbin, J., Watson, G.S. (1950). Testing for serial correlation in least squares regression I. Biometrika 37:409–428.
- Durbin, J., Watson, G.S. (1951). Testing for serial correlation in least squares regression II. Biometrika 38:159–178.
- Durbin, J., Watson, G.S. (1971). Testing for serial correlation in least squares regression III. Biometrika 58:1–19.
- Fang, K.T., Kotz, S., Ng, K.W. (1990). Symmetric Multivariate and Related Distributions. London: Chapman and Hall.
- Fourdrinier, D., Ouassou, I. (2000). Estimation of the mean of a spherically symmetric distribution with constraints on the norm. Can. J. Stat. 28:399–415.
- Gomez, H.W., Quintana, F.A., Torres, F.J. (2007). A new family of slash-distributions with elliptical contours. Stat. Probab. Lett. 77:717–725.
- Goodman, I.R., Kotz, S. (1973). Multivariate θ-generalized normal distributions. J. Multivariate Anal. 3:204–219.
- Gradshteyn, I.S., Ryzhik, I.M. (2000). Table of Integrals, Series, and Products, 6th edition. San Diego: Academic Press.
- Gutierrez-Jaimez, R., Jimenez-Lopez, J.D., Gutierrez-Sanchez, R. (2006). Efficient linear estimation problem in the bivariate Kotz distribution under dependence assumptions. J. Stat. Comput. Simul. 76:115–130.
- Hashorva, E. (2009). Asymptotics for Kotz type III elliptical distributions. Stat. Probab. Lett. 79:927–935.
- Helu, A., Naik, D.N. (2006). Estimation of interclass correlation via a Kotz-type distribution. Comput. Stat. Data Anal. 51:1523–1534.
- Helu, A., Naik, D.N. (2007). Estimation of sib-sib correlation via a Kotz-type density function. Commun. Stat. – Theory Methods 36:1021–1029.
- Hosking, J.R.M. (1990). L-moments: Analysis and estimation of distributions using linear combinations of order statistics. J. Royal Stat. Soc. B 52:105–124.
- Iyengar, S., Tong, Y.L. (1989). Convexity properties of elliptically contoured distributions. Sankhyā A 51:13–29.
- Kotz, S. (1975). Multivariate distributions at a cross-road. In: Patil, G.P., Kotz, S., Ord, J.K., eds. Statistical Distributions in Scientific Work (volume 1, pp. 247–270). Dordrecht: D. Reidel Publishing Company.
- Kotz, S., Nadarajah, S. (2001). Some extremal type elliptical distributions. Stat. Probab. Lett. 54:171–182.
- Kotz, S., Ostrovskii, I. (1994). Characteristic functions of a class of elliptical distributions. J. Multivariate Anal. 49:164–178.
- McDonald, J.B., Newey, W.K. (1988). Partially adaptive estimation of regression models via the generalized t distribution. Economet. Theory 4:428–457.
- McDonald, J.B., Richards, D.O. (1987a). Model selection: Some generalized distributions. Commun. Stat. – Theory Methods 16:1049–1074.
- McDonald, J.B., Richards, D.O. (1987b). Some generalized models with application to reliability. J. Stat. Plann. Inference 16:365–376.
- Miao, W., Gel, Y.R., Gastwirth, J.L. (2006). A new test of symmetry about an unknown median. In: Hsiung, A., Zhang, C.-H., Ying, Z., eds. Random Walk, Sequential Analysis and Related Topics - A Festschrift in Honor of Yuan-Shih Chow. Singapore: World Scientific Publisher.
- Nadarajah, S. (2005). A generalized normal distribution. J. Appl. Stat. 32:685–694.
- Naik, D.N., Plungpongpun, K. (2006). A Kotz-type distribution for multivariate statistical inference. In: Balakrishnan, N., Castillo, E., Sarabia, J.M., eds. Advances in Distribution Theory, Order Statistics, and Inference (pp. 111–124).
- Parzen, E. (1962). On estimation of a probability density function and mode. Ann. Math. Stat. 33:1065–1076.
- Pogány, T.K., Nadarajah, S. (2010). On the characteristic function of the generalized normal distribution. Comptes Rendus Mathematique 348:203–206.
- Pogány, T.K., Srivastava, H.M., Tomovski, Ž. (2006). Some families of Mathieu a-series and alternating Mathieu a-series. Appl. Math. Comput. 173:69–108.
- Sarr, A., Gupta, A.K. (2009). Estimation of the precision matrix of multivariate Kotz type model. J. Multivariate Anal. 100:742–752.
- Silverman, B.W. (1998). Density Estimation for Statistics and Data Analysis. London: Chapman and Hall.
- Stacy, E.W. (1962). A generalization of the gamma distribution. Ann. Math. Stat. 33:1187–1192.
- Streit, F. (1991). On the characteristic functions of the Kotz-type distributions. Comptes Rendus Mathématiques, La Société Royale du Canada (L’Académie des Sciences) 13:121–124.
- Subbotin, M.Th. (1923). On the law of frequency of error. Matematicheskiĭ Sbornik 31:296–301.
- Zhao, Y. (1994). Covariance matrices of quadratic forms in elliptical distributions. Stat. Probab. Lett. 21:131–140.