Extended negative binomial distribution

In probability and statistics the extended negative binomial distribution is a discrete probability distribution extending the negative binomial distribution. It is a truncated version of the negative binomial distribution^[1] for which estimation methods have been studied.^[2]

In the context of actuarial science, the distribution appeared in its general form in a paper by K. Hess, A. Liewald and K.D. Schmidt^[3] when they characterized all distributions for which the extended Panjer recursion works. For the case Template:Math, the distribution was already discussed by Willmot^[4] and put into a parametrized family with the logarithmic distribution and the negative binomial distribution by H.U. Gerber.^[5]

Probability mass function

For a natural number Template:Math and real parameters Template:Mvar, Template:Mvar with Template:Math and Template:Math, the probability mass function of the ExtNegBin(Template:Mvar, Template:Mvar, Template:Mvar) distribution is given by

f (k; m, r, p) = 0 for k \in {0, 1, \dots, m - 1}

and

f (k; m, r, p) = \frac{(\binom{k + r - 1}{k}) p^{k}}{(1 - p)^{- r} - \sum_{j = 0}^{m - 1} (\binom{j + r - 1}{j}) p^{j}} for k \in ℕ with k \geq m,

where

(\binom{k + r - 1}{k}) = \frac{Γ (k + r)}{k! Γ (r)} = (- 1)^{k} (\binom{- r}{k}) (1)

is the (generalized) binomial coefficient and Template:Math denotes the gamma function.

Probability generating function

Using that Template:Math for Template:Math Template:Open-closed is also a probability mass function, it follows that the probability generating function is given by

\begin{matrix} φ (s) & = \sum_{k = m}^{\infty} f (k; m, r, p) s^{k} \\ = \frac{(1 - p s)^{- r} - \sum_{j = 0}^{m - 1} (\binom{j + r - 1}{j}) (p s)^{j}}{(1 - p)^{- r} - \sum_{j = 0}^{m - 1} (\binom{j + r - 1}{j}) p^{j}} for | s | \leq \frac{1}{p} . \end{matrix}

For the important case Template:Math, hence Template:Math Template:Open-open, this simplifies to

φ (s) = \frac{1 - (1 - p s)^{- r}}{1 - (1 - p)^{- r}} for | s | \leq \frac{1}{p} .

References

↑ Jonhnson, N.L.; Kotz, S.; Kemp, A.W. (1993) Univariate Discrete Distributions, 2nd edition, Wiley Template:ISBN (page 227)
↑ Shah S.M. (1971) "The displaced negative binomial distribution", Bulletin of the Calcutta Statistical Association, 20, 143–152
↑ Template:Cite journal
↑ Template:Cite journal
↑ Template:Cite journal

Template:ProbDistributions

[1] Jonhnson, N.L.; Kotz, S.; Kemp, A.W. (1993) Univariate Discrete Distributions, 2nd edition, Wiley Template:ISBN (page 227)

[2] Shah S.M. (1971) "The displaced negative binomial distribution", Bulletin of the Calcutta Statistical Association, 20, 143–152

[Schmidt-3] Template:Cite journal

[Willmot-4] Template:Cite journal

[Gerber-5] Template:Cite journal

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[2]

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Extended negative binomial distribution

Probability mass function

Probability generating function

References

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