References
- Abramowitz, M., & Stegun, I. A. (1992). Handbook of mathematical functions with formulas, graphs, and mathematical tables. (Reprint of the 1972 ed.). New York, NY: Dover Publications, Inc.
- Apostol, T. M. (2010). Hurwitz zeta function. NIST Handbook of Mathematical Functions. Edited by Frank W. J.Olver, Daniel W.Lozier, Ronald F.Boisvert, and Charles W.Clark, U. S. Department of Commerce, National Institute of Standards and Technology. Cambridge: Cambridge University Press.
- Askey, R. A., & Roy, R. (2010). Polygamma functions. NIST Handbook of Mathematical Functions. Edited by Frank W. J.Olver, Daniel W.Lozier, Ronald F.Boisvert and Charles W.Clark, U. S. Department of Commerce, National Institute of Standards and Technology, Washington, DC; Cambridge: Cambridge University Press.
- Muirhead, R.J. (1982). Aspects of multivariate statistical theory. New York, NY: John Wiley & Sons.
- Nagar, D.K., & Gupta, A.K. (2004). Percentage points for testing homogeneity of several univariate Gaussian populations. Applied Mathematics and Computations, 156, 551–561.
- Pearson, E.S., & Wilks, S.S. (1933). Methods of statistical analysis appropriate for k samples of two variables. Biometrika, 25(3–4), 353–337.
- Perlman, M.D. (1980). Unbiasedness of the likelihood ratio tests for testing equality of several covariance matrices and equality of several multivariate normal populations. Annals of Statistics, 8, 247–263.