Permutree sorting

Vincent Pilaud; Vivane Pons; Daniel Tamayo Jimenez

doi:10.5802/alco.249

Permutree sorting

Vincent Pilaud
, Vivane Pons
, Daniel Tamayo Jimenez

INRIA Saclay, Laboratoire de Recherche en Informatique (LRI), Université Paris Sud

Research output: Contribution to journal › Article › peer-review

Abstract

Generalizing stack sorting and c-sorting for permutations, we define the permutree sorting algorithm. Given two disjoint subsets U and D of {2, . . ., n - 1}, the (U, D)-permutree sorting tries to sort the permutation π ∈ Sn and fails if and only if there are 1 ≤ i < j < k ≤ n such that π contains the subword jki if j ∈ U and kij if j ∈ D. This algorithm is seen as a way to explore an automaton which either rejects all reduced words of π, or accepts those reduced words for π whose prefixes are all (U, D)-permutree sortable.

Original language	English
Pages (from-to)	53-74
Number of pages	22
Journal	Algebraic Combinatorics
Volume	6
Issue number	1
DOIs	https://doi.org/10.5802/alco.249
Publication status	Published - 1 Jan 2023

Keywords

automata
permutrees
stack sorting
weak order

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10.5802/alco.249

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N2 - Generalizing stack sorting and c-sorting for permutations, we define the permutree sorting algorithm. Given two disjoint subsets U and D of {2, . . ., n - 1}, the (U, D)-permutree sorting tries to sort the permutation π ∈ Sn and fails if and only if there are 1 ≤ i < j < k ≤ n such that π contains the subword jki if j ∈ U and kij if j ∈ D. This algorithm is seen as a way to explore an automaton which either rejects all reduced words of π, or accepts those reduced words for π whose prefixes are all (U, D)-permutree sortable.

AB - Generalizing stack sorting and c-sorting for permutations, we define the permutree sorting algorithm. Given two disjoint subsets U and D of {2, . . ., n - 1}, the (U, D)-permutree sorting tries to sort the permutation π ∈ Sn and fails if and only if there are 1 ≤ i < j < k ≤ n such that π contains the subword jki if j ∈ U and kij if j ∈ D. This algorithm is seen as a way to explore an automaton which either rejects all reduced words of π, or accepts those reduced words for π whose prefixes are all (U, D)-permutree sortable.

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KW - permutrees

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Permutree sorting

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