arXiv:1501.06596 Abstract | arXiv Analytics

arXiv:1501.06596 [math.PR]Abstract References Reviews Resources

Sawtooth models and asymptotic independence in large compositions

Published 2015-01-26Version 1

In this paper we improve the probabilistic approach to compositions of Ehrenborg, Levin and Readdy by introducing a simpler but more general probabilistic model. As consequence we get some new estimates on the behavior of a uniform random permutation $\sigma$ having a fixed descent set. In particular we show that independently of the shape of the descent set, $\sigma(i)$ and $\sigma(j)$ become independent when $i-j$ tends to $+\infty$.

Comments: 32 pages, 4 figures

Categories: math.PR, math.CO

Keywords: asymptotic independence, sawtooth models, large compositions, uniform random permutation, general probabilistic model

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