Lucas Gerin scite author profile

We study uniform random permutations in an important class of pattern-avoiding permutations: the separable permutations. We describe the asymptotics of the number of occurrences of any fixed given pattern in such a random permutation in terms of the Brownian excursion. In the recent terminology of permutons, our work can be interpreted as the convergence of uniform random separable permutations towards a "Brownian separable permuton".2010 Mathematics Subject Classification. 60C05,05A05.

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Universal limits of substitution-closed permutation classes

Bassino

Bouvel

Féray

et al. 2020

J. Eur. Math. Soc.

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We consider uniform random permutations in proper substitution-closed classes and study their limiting behavior in the sense of permutons. The limit depends on the generating series of the simple permutations in the class. Under a mild sufficient condition, the limit is an elementary one-parameter deformation of the limit of uniform separable permutations, previously identified as the Brownian separable permuton. This limiting object is therefore in some sense universal. We identify two other regimes with different limiting objects. The first one is degenerate; the second one is nontrivial and related to stable trees. These results are obtained thanks to a characterization of the convergence of random permutons through the convergence of their expected pattern densities. The limit of expected pattern densities is then computed by using the substitution tree encoding of permutations and performing singularity analysis on the tree series.

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On the convergence of population protocols when population goes to infinity

Bournez

Chassaing

Cohen

et al. 2009

Applied Mathematics and Computation

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Lucas Gerin

The Brownian limit of separable permutations

Universal limits of substitution-closed permutation classes

On the convergence of population protocols when population goes to infinity

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