References
- Aitchison , J. , Kay , J. W. , Lauder , I. J. ( 2005 ). Statistical Concepts and Applications in Clinical Medicine . London : Chapman & Hall .
- Bansal , B. , Gokhale , M. R. , Bhattacharya , A. , Arora , B. M. ( 2007 ). InAs/InP quantum dots with bimodal size distribution: Two evolution pathways . J. Appl. Phys. 101 : 1 – 6 .
- Baten , W. D. ( 1934 ). The probability law for the sum of n independent variables, each subject to the law (1/2 h)sech(x/2 h) . Bull. Amer. Mathemat. Soc. 40 : 284 – 290 .
- Chatterjee , S. , Handcock , M. S. , Simonoff , J. S. ( 1995 ). A Casebook for a First Course in Statistics and Data Analysis . New York : John Wiley & Sons .
- Cobb , L. , Koppstein , P. , Chen , N. H. ( 1983 ). Estimation and moment recursion relations for multimodal distributions of the exponential family . J. Amer. Statist. Assoc. 78 : 124 – 130 .
- Cooray , K. ( 2010 ). Generalized Gumbel distribution . J. Appl. Statist. 37 : 171 – 179 .
- D'Agostino , R. B. , Stephens , M. A. ( 1986 ). Goodness-of-Fit Techniques . New York : Marcel Dekker .
- Everitt , B. S. , Hand , D. J. ( 1981 ). Finite Mixture Distributions . London : Chapman & Hall .
- Famoye , F. , Lee , C. , Eugene , N. ( 2004 ). Beta-normal distribution: bimodality properties and application . J. Modern Appl. Statist. Meth. 3 : 85 – 103 .
- Fisher , R. A. ( 1922 ). On the mathematical foundations of theoretical statistics . Philosoph. Trans. Roy. Soc. London A 222 : 309 – 368 .
- Gilchrist , W. G. (2000). Statistical Modelling with Quantile Functions . London : Chapman & Hall.
- Gupta , R. D. , Kundu , D. ( 2001 ). Exponentiated exponential family: an alternative to gamma and Weibull distributions . Biometr. J. 43 : 117 – 130 .
- Harkness , W. L. , Harkness , M. L. ( 1968 ). Generalized hyperbolic secant distributions . J. Amer. Statist. Assoc. 63 : 329 – 337 .
- Jenkinson , A. F. ( 1955 ). The frequency distribution of the annual maximum (or minimum) values of meteorological events . Quart. J. Roy. Meteorolog. Soc. 81 : 158 – 172 .
- Johnson , N. L. , Kotz , S. , Balakrishnan , N. ( 1994 ). Continuous Univariate Distributions . New York : John Wiley & Sons .
- Karian , Z. A. , Dudewicz , E. J. ( 2000 ). Fitting Statistical Distributions: The Generalized Lambda Distribution and Generalized Bootstrap Methods . Boca Raton , FL : CRC Press .
- Kollia , G. D. ( 1989 ). A study of some quantile function families: Isotones and other applications. Unpublished Ph.D. Thesis, The University of Rochester .
- Lehmann , E. L. , Casella , G. ( 1998 ). Theory of Point Estimation . New York : Springer .
- Mises , R. von ( 1936 ). La distribution de la grande de n valeurs . Review Mathematique Union Interbalcanique 1 : 141 – 160 . Reproduced in Selected Papers of Richard von Mises, II. (1954). Providence, RI: American Mathematical Society, pp. 271–294 .
- Moors , J. J. ( 1988 ). A quantile alternative for kurtosis . Statistician 37 : 25 – 32 .
- Mudholkar , G. S. , Hutson , A. D. ( 1996 ). The exponentiated Weibull family: some properties and a flood data application . Commun. Statist. Theor. Meth. 25 : 3059 – 3083 .
- Mudholkar , G. S. , Srivastava , D. K. ( 1993 ). Exponentiated Weibull family for analyzing bathtub failure-rate data . IEEE Trans. Reliab. R-42 : 299 – 302 .
- Nadarajah , S. ( 2006 ). The exponentiated Gumbel distribution with climate application . Environmetrics 17 : 13 – 23 .
- Pearson , K. ( 1895 ). Contributions to the mathematical theory of evolution-II. Skew variation in homogeneous material . Philosoph. Trans. Roy. Soc. London 186 : 343 – 414 .
- Perks , W. ( 1932 ). On some experiments in the graduation of mortality statistics . J. Instit. Actuar. 58 : 12 – 57 .
- Rao , K. S. , Narayana , J. L. , Sastry , V. P. ( 1988 ). A bimodal distribution . Bull. Calcutta Mathemat. Soc. 80 : 238 – 240 .
- Talacko , J. ( 1956 ). Perks’ distributions and their role in the theory of Wiener's stochastic variables . Trabajos de Estadistica 7 : 159 – 174 .
- Vaughan , D. C. ( 2002 ). The generalized secant hyperbolic distribution and its properties . Commun. Statist. Theor. Meth. 31 : 219 – 238 .
- Verhulst , P. J. ( 1839 ). Notice sur la lois que la population suit dans sons accroissement . Correspondence Mathematique et Physique 10 : 113 – 121 .
- Verhulst , P. J. ( 1845 ). Recherches mathématiques sur la loi d'accroissement de la population . Académie de Bruxelles 18 : 1 – 38 .
- Weisberg , S. ( 2005 ). Applied Linear Regression . New York : John Wiley & Sons .
- Wigner , E. P. ( 1958 ). On the distribution of the roots of certain symmetric matrices . Ann. Math. Sec. Ser. 67 : 325 – 327 .