Crossings and Nestings for Arc-Coloured Permutations
نویسنده
چکیده
The equidistribution of many crossing and nesting statistics exists in several combinatorial objects like matchings, set partitions, permutations, and embedded labelled graphs. The involutions switching nesting and crossing numbers for set partitions given by Krattenthaler, also by Chen, Deng, Du, Stanley, and Yan, and for permutations given by Burrill, Mishna, and Post involved passing through tableau-like objects. Recently, Chen and Guo for matchings, and Marberg for set partitions extended the result to coloured arc annotated diagrams. We prove that symmetric joint distribution continues to hold for arc-coloured permutations. As in Marberg’s recent work, but through a different interpretation, we also conclude that the ordinary generating functions for all j-noncrossing, k-nonnesting, r-coloured permutations according to size n are rational functions. We use the interpretation to automate the generation of these rational series for both noncrossing and nonnesting coloured set partitions and permutations. L’équidistribution de plusieurs statistiques décrites en termes d’emboitements et de chevauchements d’arcs s’observes dans plusieurs familles d’objects combinatoires, tels que les couplages, partitions d’ensembles, permutations et graphes étiquetés. L’involution échangeant le nombre d’emboitements et de chevauchements dans les partitions d’ensemble due à Krattenthaler, et aussi Chen, Deng, Du, Stanley et Yan, et l’involution similaire dans les permutations due à Burrill, Mishna et Post, requièrent d’utiliser des objets de type tableaux. Récemment, Chen et Guo pour les couplages, et Marberg pour les partitions d’ensembles, ont étendu ces résultats au cas de diagrammes arc-annotés coloriés. Nous démontrons que la propriété d’équidistribution s’observe est aussi vraie dans le cas de permutations aux arcs coloriés. Tout comme dans le travail résent de Marberg, mais via un autre chemin, nous montrons que les séries génératrices ordinaires des permutations r-coloriées ayant au plus j chevauchements et k emboitements, comptées selon la taille n, sont des fonctions rationnelles. Nous décrivons aussi des algorithmes permettant de calculer ces fonctions rationnelles pour les partitions d’ensembles et les permutations coloriées sans emboitement ou sans chevauchement.
منابع مشابه
Crossings and Nestings for Arc-Coloured Permutations and Automation
Symmetric joint distribution between crossings and nestings was established in several combinatorial objects. Recently, Marberg extended Chen and Guo’s result on coloured matchings to coloured set partitions following a multi-dimensional generalization of the bijection and enumerative methods from Chen, Deng, Du, Stanley, and Yan. We complete the study for arc-coloured permutations by establish...
متن کاملCombinatorics of Arc Diagrams, Ferrers Fillings, Young Tableaux and Lattice Paths
Several recent works have explored the deep structure between arc diagrams, their nestings and crossings, and several other combinatorial objects including permutations, graphs, lattice paths, and walks in the Cartesian plane. This thesis inspects a range of related combinatorial objects that can be represented by arc diagrams, relationships between them, and their connection to nestings and cr...
متن کاملSymmetric Distribution of Crossings and Nestings in Permutations of Type B
This note contains two results on the distribution of crossing numbers and nesting numbers in permutations of type B. More precisely, we prove a Bn-analogue of the symmetric distribution of crossings and nestings of permutations due to Corteel [Adv. Appl. Math. 38(2)(2007), 149–163] as well as the symmetric distribution of k-crossings and k-nestings of permutations due to Burrill et al. [DMTCS ...
متن کاملOn k-crossings and k-nestings of permutations
We introduce k-crossings and k-nestings of permutations. We show that the crossing number and the nesting number of permutations have a symmetric joint distribution. As a corollary, the number of k-noncrossing permutations is equal to the number of k-nonnesting permutations. We also provide some enumerative results for k-noncrossing permutations for some values of k. Résumé. Nous introduisons l...
متن کاملEquidistributed Statistics on Matchings and Permutations
We show that the bistatistic of right nestings and right crossings in matchings without left nestings is equidistributed with the number of occurrences of two certain patterns in permutations, and furthermore that this equidistribution holds when refined to positions of these statistics in matchings and permutations. For this distribution we obtain a non-commutative generating function which sp...
متن کامل