Normal approximation in an urn model with indistinguishable balls |
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| Authors: | N.K. Indira V.V. Menon |
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| Affiliation: | 1. Stat-Math Unit Indian Statistical Institute , R.V. College Post , Bancralore, 560 059, INDIA;2. Dept. of Applied Mathematics Institute of Technology , Banaras Hindu University , Varam |
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| Abstract: | ![]()
For the Bose-Einstein Statistics, where n indistinguishable balls are distributed in m urns such that all the arrangements are equally likely, define the random variables Mk = number of urns containing exactly k balls each; Nk = number of urns containing at least k balls each. We consider the approximation of the distributions of Mk and Nk by suitable normal distributions, for large but finite m. Estimates are found for the error in the approximation to both the probability mass function and the distribution function in each case. These results apply also to the alternative model where no urn is allowed to be empty. The results are illustrated by some numerical examples. |
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| Keywords: | Bose-Einstein statistics occupany variable central limit therom local central limit therom expansions related to central limit therom |
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