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Urn model

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One of the simplest models in probability theory. A description of an urn model is as follows: Consider some vessel — an urn — with black and white balls. One ball is drawn at random from the urn, and then it is returned to the urn together with $c$ balls of the same colour as the ball drawn and $d$ balls of the other colour. After mixing the balls in the urn, the procedure is repeated a certain number of times. It is assumed that initially the urn contains $a>0$ white and $b>0$ black balls. The numbers $c$ and $d$, the parameters of the urn model, may also be negative.

The urn model offers a convenient means for calculating certain basic probabilities by use of conditional probabilities. For different values of the parameters $c$ and $d$ many known models of probability theory are obtained: for $c=0$, $d=0$ the model of random choice with replacement (cf. Bernoulli trials), for $c=-1$, $d=0$ the model of random choice without replacement, for $c=-1$, $d=-1$ the Ehrenfest diffusion model, for $c>0$, $d=0$ the Pólya urn model, etc. These special cases serve as models for many real phenomena and provide methods for studying them. For example, the Pólya urn model is used for the description of epidemics, in which the occurrence of any event increases the likelihood of a subsequent occurrence of this event. Within the framework of urn models many distributions in probability theory can be introduced, such as the binomial, the hypergeometric, the geometric, and the Pólya distributions. The negative binomial distribution and the Poisson distribution arise as limit distributions from certain urn models.

References

[1] W. Feller, "An introduction to probability theory and its applications", 1–2, Wiley (1957–1971)

Comments

References

[a1] N.L. Johnson, S. Kotz, "Urn models and their application" , Wiley (1977)
How to Cite This Entry:
Urn model. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Urn_model&oldid=32005
This article was adapted from an original article by A.V. Prokhorov (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article