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Comportement asymptotique des marches aleatoires associees aux polynomes de Gegenbauer et applications

Published online by Cambridge University Press:  01 July 2016

Leonard Gallardo
Leonard Gallardo*
Affiliation:
Université de Nancy II
*
Adresse postale: UER de Mathématiques et Informatique, Université de Nancy II, 23 Boulevard Albert 1er, 54000 Nancy, France.
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Abstract

Random walks on N associated with orthogonal polynomials have properties similar to classical random walks on . In fact such processes have independent increments with respect to a hypergroup structure on with a convolution and a Fourier transform which is the basic tool for their study. We illustrate these ideas by giving a description of the asymptotic behaviour (CLT and ILL) of the random walks associated with Gegenbauer's polynomials. Moreover we can then use these random walks as a reference scale to deduce asymptotic properties of other Markov chains on via a comparison theorem which is of independent interest.

Keywords

GENERALIZED CONVOLUTIONSFOURIER-GEGENBAUER TRANSFORMSCENTRAL LIMIT THEOREM (NON-CLASSICAL)ITERATED LOG LAW (NON-CLASSICAL)COMPARISON OF TWO MARKOV CHAINS
Type
Research Article
Information
Advances in Applied Probability , Volume 16 , Issue 2 , June 1984 , pp. 293 - 323
Copyright
Copyright © Applied Probability Trust 1984 

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References

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