Multicolor urn models with reducible replacement matrices

Bose, Arup ; Dasgupta, Amites ; Maulik, Krishanu (2009) Multicolor urn models with reducible replacement matrices Bernoulli, 15 (1). pp. 279-295. ISSN 1350-7265

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Related URL: http://dx.doi.org/10.3150/08-BEJ150

Abstract

Consider the multicolored urn model where, after every draw, balls of the different colors are added to the urn in a proportion determined by a given stochastic replacement matrix. We consider some special replacement matrices which are not irreducible. For three- and four-color urns, we derive the asymptotic behavior of linear combinations of the number of balls. In particular, we show that certain linear combinations of the balls of different colors have limiting distributions which are variance mixtures of normal distributions. We also obtain almost sure limits in certain cases in contrast to the corresponding irreducible cases, where only weak limits are known.

Item Type:Article
Source:Copyright of this article belongs to Bernoulli Society for Mathematical Statistics and Probability.
Keywords:Martingale; Reducible Stochastic Replacement Matrix; Urn Model; Variance Mixture of Normal
ID Code:93942
Deposited On:30 Jun 2012 08:07
Last Modified:19 May 2016 06:53

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