Harmonic Bernoulli strings and random permutations
Articles
Eugenius Manstavičius
Vilnius University
Published 2004-12-17
https://doi.org/10.15388/LMR.2004.31867
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Keywords

Bernoulli string
invariance principle
Brownian motion
symmetric group

How to Cite

Manstavičius, E. (2004) “Harmonic Bernoulli strings and random permutations”, Lietuvos matematikos rinkinys, 44(spec.), pp. 90–94. doi:10.15388/LMR.2004.31867.

Abstract

We examine fairly special b-harmonic Bernoulli strings appearing in n observations. It is shown that their count number can be used to define a random process converging to the Brownian motion as n tends to infinity. The proof is based upon the invariance principle for random permutations.

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