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Article Dans Une Revue Discrete Mathematics Année : 2017

The pure descent statistic on permutations

Résumé

We introduce a new statistic based on permutation descents which has a distribution given by the Stirling numbers of the first kind, i.e., with the same distribution as for the number of cycles in permutations. We study this statistic on the sets of permutations avoiding one pattern of length three by giving bivariate generating functions. As a consequence, new classes of permutations enumerated by the Motzkin numbers are obtained. Finally, we deduce results about the popularity of the pure descents in all these restricted sets. (C) 2017 Elsevier B.V. All rights reserved.

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Mathématiques [math]

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https://u-bourgogne.hal.science/hal-01627131

Soumis le : mardi 31 octobre 2017-18:35:58

Dernière modification le : jeudi 18 avril 2024-15:11:37

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hal-01627131 , version 1 (31-10-2017)

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Jean-Luc Baril, Sergey Kirgizov. The pure descent statistic on permutations. Discrete Mathematics, 2017, 340 (10), pp.2550 - 2558. ⟨10.1016/j.disc.2017.06.005⟩. ⟨hal-01627131⟩

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