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Some aspects of the Kemp families of distributions. (English) Zbl 0418.62016

MSC:
62E15 Exact distribution theory in statistics
62E10 Characterization and structure theory of statistical distributions
60E05 Probability distributions: general theory
60E10 Characteristic functions; other transforms
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[1] Crow, E.L. and Bardwell, G.E. Estimation of the parameters of the hyper-Poisson distributions. Proc. of International Symposium on Discrete Distributions. Montreal. pp.127–140. Pergamon Press. · Zbl 0137.13301
[2] Dacey M.F., Sankhya, Series B 34 pp 243– (1972)
[3] DOI: 10.2307/2527787 · Zbl 0081.13902
[4] Gurland J., Biometrika 44 pp 265– (1957) · Zbl 0084.14003
[5] Gurland, J. and Tripathi, R.C. A Modern Course on Statistical Distributions in Scientific Work. D. Proc. of the Int. Conf. on Characterization of Statistical Distributions Held at University of Calgary. Alberta. Vol. 1, pp.59–82. Dordrecht, Holland: Reidel Publishing Company. Estimation of parameters in some extensions of the Katz family of discrete distributions involving hypergeometric functions
[6] Katz, L. Unified treatment of a broad class of discrete probability distributions. Proc. of Int. Symposium on Discrete Distributions. Montreal. pp.175–182. Pergamon Press.
[7] Kemp A.W., Sankhya, Series A 30 pp 401– (1968)
[8] DOI: 10.1080/03610927408827220 · Zbl 0329.62012
[9] DOI: 10.2307/2343403
[10] Slater L.J., Generalized Hypergeometric Functions (1966) · Zbl 0135.28101
[11] Tripathi R.C., Estimation in the 2-, and 3-parameter Binomial Beta distribution (1976)
[12] Tripathi R.C., J. Royal Stat. Soc, Series B 39 pp 349– (1977)
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