a, b and m.phermite(q, a, b, m=2, lower.tail=TRUE)2,
corresponding to the standard Hermite distribution.a, b
and m.McKendrick A G Applications of Mathematics to Medical Problems. Proceedings of the Edinburgh Mathematical Society 1926;44:98–130.
Kemp A W, Kemp C D. An alternative derivation of the Hermite distribution. Biometrika 1966;53 (3-4):627–628.
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Bekelis, D. Convolutions of the Poisson laws in number theory. In Analytic & Probabilistic Methods in Number Theory: Proceedings of the 2nd International Conference in Honour of J. Kubilius, Lithuania 1996;4:283–296.
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Puig P. (2003). Characterizing Additively Closed Discrete Models by a Property of Their Maximum Likelihood Estimators, with an Application to Generalized Hermite Distributions. Journal of the American Statistical Association 2003; 98:687–692.
Distributions for some other distributions,
dhermite, qhermite, rhermite,
hermite-package, glm.hermited <- phermite(4, 0.8, 0.3, m=3)Run the code above in your browser using DataLab