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A generalised incomplete beta function and its application to multi-line stock control

Published online by Cambridge University Press:  14 July 2016

J. C. Gittins
Affiliation:
University Engineering Laboratory, Cambridge
M. J. Maher
Affiliation:
Institute for Transport Studies, Leeds University

Abstract

The distribution function for the negative binomial distribution is known to be an incomplete beta function. Here, some of the properties of the family of distribution functions for multivariate negative binomial distributions are explored. These properties are then used in deriving the expected cost per unit time for a multi-line joint-reordering system with Poisson demands. Policies are considered for which the quantity of any particular line in stock is the same at the beginning of every cycle. A method which gives good approximations to the optimal values of these quantities is described.

Type
Research Papers
Copyright
Copyright © Applied Probability Trust 1973 

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References

Abramowitz, M. and Stegun, I. A. (1965) Handbook of Mathematical Functions. Constable, London.Google Scholar
Bates, G. E. and Neyman, J. (1952) Contributions to the theory of accident proneness. University of California Publications in Statistics, Vol. 1, 215254. University of California Press, Berkeley.Google Scholar
Harris, F. (1915) Operations and Cost. Chicago.Google Scholar
Low, R. A. and Waddington, J. F. (1967) The determination of the optimum joint replenishment policy for a group of discount-connected stock lines. Operat. Res. Quart. 18, 443462.Google Scholar
Naddor, E. (1966) Inventory Systems. Wiley, London.Google Scholar
Pearson, K. (1934) Tables of the Incomplete Beta Function. Cambridge University Press, Cambridge.Google Scholar
Silver, E. A. (1965) Some characteristics of a special joint-order inventory model. Operat. Res. 13, 319322.Google Scholar