On q-integrals over order polytopes (extended abstract)

Counting words with Laguerre polynomials

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.2369 ◽

2013 ◽

Vol DMTCS Proceedings vol. AS,... (Proceedings) ◽

Author(s):

Jair Taylor

Keyword(s):

Generating Function ◽

Generating Functions ◽

Laguerre Polynomials ◽

Equal Length ◽

Combinatorial Interpretation ◽

International Audience ◽

Nous Utilisons

International audience We develop a method for counting words subject to various restrictions by finding a combinatorial interpretation for a product of formal sums of Laguerre polynomials. We use this method to find the generating function for $k$-ary words avoiding any vincular pattern that has only ones. We also give generating functions for $k$-ary words cyclically avoiding vincular patterns with only ones whose runs of ones between dashes are all of equal length, as well as the analogous results for compositions. Nous développons une méthode pour compter des mots satisfaisants certaines restrictions en établissant une interprétation combinatoire utile d’un produit de sommes formelles de polynômes de Laguerre. Nous utilisons cette méthode pour trouver la série génératrice pour les mots $k$-aires évitant les motifs vinculars consistant uniquement de uns. Nous présentons en suite les séries génératrices pour les mots $k$-aires évitant de façon cyclique les motifs vinculars consistant uniquement de uns et dont chaque série de uns entre deux tirets est de la même longueur. Nous présentons aussi les résultats analogues pour les compositions.

The Selberg integral and Young books

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.2408 ◽

2014 ◽

Vol DMTCS Proceedings vol. AT,... (Proceedings) ◽

Author(s):

Jang Soo Kim ◽

Suho Oh

Keyword(s):

Young Tableaux ◽

Combinatorial Interpretation ◽

Selberg Integral ◽

Combinatorial Objects ◽

Special Cases ◽

International Audience ◽

Enumeration Formula ◽

Standard Young Tableaux

International audience The Selberg integral is an important integral first evaluated by Selberg in 1944. Stanley found a combinatorial interpretation of the Selberg integral in terms of permutations. In this paper, new combinatorial objects "Young books'' are introduced and shown to have a connection with the Selberg integral. This connection gives an enumeration formula for Young books. It is shown that special cases of Young books become standard Young tableaux of various shapes: shifted staircases, squares, certain skew shapes, and certain truncated shapes. As a consequence, enumeration formulas for standard Young tableaux of these shapes are obtained. L’intégrale de Selberg est une partie intégrante importante abord évaluée par Selberg en 1944. Stanley a trouvé une interprétation combinatoire de la Selberg aide en permutations. Dans ce papier, de nouveaux objets combinatoires “livres de Young” sont introduits et présentés à avoir un lien avec l’intégrale de Selberg. Cette connexion donne une formule d'énumération pour les livres de Young. Il est démontré que des cas spéciaux de livres de Young deviennent tableaux standards de Young de formes diverses: escaliers décalés, places, certaines formes gauches et certaines formes tronquées. En conséquence, l’énumération des formules pour tableaux standards de Young de ces formes sont obtenues.

Congruence successions in compositions

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.1252 ◽

2014 ◽

Vol Vol. 16 no. 1 (Combinatorics) ◽

Author(s):

Toufik Mansour ◽

Mark Shattuck ◽

Mark Wilson

Keyword(s):

General Formula ◽

Generating Function ◽

Asymptotic Estimate ◽

International Audience ◽

Limiting Case ◽

Positive Integers

Combinatorics International audience A composition is a sequence of positive integers, called parts, having a fixed sum. By an m-congruence succession, we will mean a pair of adjacent parts x and y within a composition such that x=y(modm). Here, we consider the problem of counting the compositions of size n according to the number of m-congruence successions, extending recent results concerning successions on subsets and permutations. A general formula is obtained, which reduces in the limiting case to the known generating function formula for the number of Carlitz compositions. Special attention is paid to the case m=2, where further enumerative results may be obtained by means of combinatorial arguments. Finally, an asymptotic estimate is provided for the number of compositions of size n having no m-congruence successions.

Counting occurrences for a finite set of words: an inclusion-exclusion approach

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.3543 ◽

2007 ◽

Vol DMTCS Proceedings vol. AH,... (Proceedings) ◽

Author(s):

Frédérique Bassino ◽

Julien Clément ◽

J. Fayolle ◽

P. Nicodème

Keyword(s):

Generating Function ◽

Exclusion Principle ◽

Complete Proof ◽

Detailed Proof ◽

Finite Set ◽

International Audience ◽

The One ◽

Maple Package

International audience In this paper, we give the multivariate generating function counting texts according to their length and to the number of occurrences of words from a finite set. The application of the inclusion-exclusion principle to word counting due to Goulden and Jackson (1979, 1983) is used to derive the result. Unlike some other techniques which suppose that the set of words is reduced (<i>i..e.</i>, where no two words are factor of one another), the finite set can be chosen arbitrarily. Noonan and Zeilberger (1999) already provided a MAPLE package treating the non-reduced case, without giving an expression of the generating function or a detailed proof. We give a complete proof validating the use of the inclusion-exclusion principle and compare the complexity of the method proposed here with the one using automata for solving the problem.

Operations on partially ordered sets and rational identities of type A

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.595 ◽

2013 ◽

Vol Vol. 15 no. 2 (Combinatorics) ◽

Author(s):

Adrien Boussicault

Keyword(s):

Partially Ordered Sets ◽

Rational Functions ◽

Hasse Diagram ◽

Linear Extensions ◽

Ordered Sets ◽

Closed Expression ◽

Schubert Polynomials ◽

Special Cases ◽

The Family ◽

International Audience

Combinatorics International audience We consider the family of rational functions ψw= ∏( xwi - xwi+1 )-1 indexed by words with no repetition. We study the combinatorics of the sums ΨP of the functions ψw when w describes the linear extensions of a given poset P. In particular, we point out the connexions between some transformations on posets and elementary operations on the fraction ΨP. We prove that the denominator of ΨP has a closed expression in terms of the Hasse diagram of P, and we compute its numerator in some special cases. We show that the computation of ΨP can be reduced to the case of bipartite posets. Finally, we compute the numerators associated to some special bipartite graphs as Schubert polynomials.

Statistics on Lattice Walks and q-Lassalle Numbers

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.2528 ◽

2015 ◽

Vol DMTCS Proceedings, 27th... (Proceedings) ◽

Author(s):

Lenny Tevlin

Keyword(s):

Positive Integer ◽

Generating Function ◽

Catalan Numbers ◽

Binomial Coefficients ◽

Integer Coefficients ◽

Major Index ◽

Lattice Walks ◽

International Audience ◽

The Difference ◽

Positive Integers

International audience This paper contains two results. First, I propose a $q$-generalization of a certain sequence of positive integers, related to Catalan numbers, introduced by Zeilberger, see Lassalle (2010). These $q$-integers are palindromic polynomials in $q$ with positive integer coefficients. The positivity depends on the positivity of a certain difference of products of $q$-binomial coefficients.To this end, I introduce a new inversion/major statistics on lattice walks. The difference in $q$-binomial coefficients is then seen as a generating function of weighted walks that remain in the upper half-plan. Cet document contient deux résultats. Tout d’abord, je vous propose un $q$-generalization d’une certaine séquence de nombres entiers positifs, liés à nombres de Catalan, introduites par Zeilberger (Lassalle, 2010). Ces $q$-integers sont des polynômes palindromiques à $q$ à coefficients entiers positifs. La positivité dépend de la positivité d’une certaine différence de produits de $q$-coefficients binomial.Pour ce faire, je vous présente une nouvelle inversion/major index sur les chemins du réseau. La différence de $q$-binomial coefficients est alors considérée comme une fonction de génération de trajets pondérés qui restent dans le demi-plan supérieur.

On a New Family of Generalized Stirling and Bell Numbers

The Electronic Journal of Combinatorics ◽

10.37236/564 ◽

2011 ◽

Vol 18 (1) ◽

Cited By ~ 13

Author(s):

Toufik Mansour ◽

Matthias Schork ◽

Mark Shattuck

Keyword(s):

Closed Form ◽

Generating Function ◽

Recursion Relation ◽

Stirling Numbers ◽

Combinatorial Interpretation ◽

Bell Numbers ◽

New Family ◽

Exponential Generating Function ◽

Rook Numbers ◽

Generalized Stirling Numbers

A new family of generalized Stirling and Bell numbers is introduced by considering powers $(VU)^n$ of the noncommuting variables $U,V$ satisfying $UV=VU+hV^s$. The case $s=0$ (and $h=1$) corresponds to the conventional Stirling numbers of second kind and Bell numbers. For these generalized Stirling numbers, the recursion relation is given and explicit expressions are derived. Furthermore, they are shown to be connection coefficients and a combinatorial interpretation in terms of statistics is given. It is also shown that these Stirling numbers can be interpreted as $s$-rook numbers introduced by Goldman and Haglund. For the associated generalized Bell numbers, the recursion relation as well as a closed form for the exponential generating function is derived. Furthermore, an analogue of Dobinski's formula is given for these Bell numbers.

Minimal factorizations of a cycle: a multivariate generating function

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.6318 ◽

2020 ◽

Vol DMTCS Proceedings, 28th... ◽

Author(s):

Philippe Biane ◽

Matthieu Josuat-Vergès

Keyword(s):

Symmetric Group ◽

Generating Function ◽

Simple Formula ◽

Hook Length ◽

Noncrossing Partitions ◽

Long Cycle ◽

Number Of Factors ◽

Multivariate Generalization ◽

International Audience

International audience It is known that the number of minimal factorizations of the long cycle in the symmetric group into a product of k cycles of given lengths has a very simple formula: it is nk−1 where n is the rank of the underlying symmetric group and k is the number of factors. In particular, this is nn−2 for transposition factorizations. The goal of this work is to prove a multivariate generalization of this result. As a byproduct, we get a multivariate analog of Postnikov's hook length formula for trees, and a refined enumeration of final chains of noncrossing partitions.

Mixed volumes of hypersimplices

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.2488 ◽

2015 ◽

Vol DMTCS Proceedings, 27th... (Proceedings) ◽

Author(s):

Gaku Liu

Keyword(s):

Catalan Numbers ◽

Binomial Coefficients ◽

Type B ◽

Combinatorial Interpretation ◽

Mixed Volumes ◽

Eulerian Numbers ◽

Eulerian Number ◽

Nous Montrons ◽

Set Of Permutations ◽

International Audience

International audience In this extended abstract we consider mixed volumes of combinations of hypersimplices. These numbers, called mixed Eulerian numbers, were first considered by A. Postnikov and were shown to satisfy many properties related to Eulerian numbers, Catalan numbers, binomial coefficients, etc. We give a general combinatorial interpretation for mixed Eulerian numbers and prove the above properties combinatorially. In particular, we show that each mixed Eulerian number enumerates a certain set of permutations in $S_n$. We also prove several new properties of mixed Eulerian numbers using our methods. Finally, we consider a type $B$ analogue of mixed Eulerian numbers and give an analogous combinatorial interpretation for these numbers. Dans ce résumé étendu nous considérons les volumes mixtes de combinaisons d’hyper-simplexes. Ces nombres, appelés les nombres Eulériens mixtes, ont été pour la première fois étudiés par A. Postnikov, et il a été montré qu’ils satisfont à de nombreuses propriétés reliées aux nombres Eulériens, au nombres de Catalan, aux coefficients binomiaux, etc. Nous donnons une interprétation combinatoire générale des nombres Eulériens mixtes, et nous prouvons combinatoirement les propriétés mentionnées ci-dessus. En particulier, nous montrons que chaque nombre Eulérien mixte compte les éléments d’un certain sous-ensemble de l’ensemble des permutations $S_n$. Nous établissons également plusieurs nouvelles propriétés des nombres Eulériens mixtes grâce à notre méthode. Pour finir, nous introduisons une généralisation en type $B$ des nombres Eulériens mixtes, et nous en donnons une interprétation combinatoire analogue.

Formal Group Laws and Chromatic Symmetric Functions of Hypergraphs

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.2499 ◽

2015 ◽

Vol DMTCS Proceedings, 27th... (Proceedings) ◽

Author(s):

Jair Taylor

Keyword(s):

Power Series ◽

Symmetric Functions ◽

Formal Group ◽

Combinatorial Interpretation ◽

Recursive Structure ◽

Combinatorial Objects ◽

Formal Group Law ◽

International Audience ◽

Formal Group Laws ◽

Group Law

International audience If $f(x)$ is an invertible power series we may form the symmetric function $f(f^{-1}(x_1)+f^{-1}(x_2)+...)$ which is called a formal group law. We give a number of examples of power series $f(x)$ that are ordinary generating functions for combinatorial objects with a recursive structure, each of which is associated with a certain hypergraph. In each case, we show that the corresponding formal group law is the sum of the chromatic symmetric functions of these hypergraphs by finding a combinatorial interpretation for $f^{-1}(x)$. We conjecture that the chromatic symmetric functions arising in this way are Schur-positive. Si $f(x)$ est une série entière inversible, nous pouvons former la fonction symétrique $f(f^{-1}(x_1)+f^{-1}(x_2)+...)$ que nous appelons une loi de groupe formel. Nous donnons plusieurs exemples de séries entières $f(x)$ qui sont séries génératrices ordinaires pour des objets combinatoires avec une structure récursive, chacune desquelles est associée à un certain hypergraphe. Dans chaque cas, nous donnons une interprétation combinatoire à $f^{-1}(x)$, ce qui nous permet de montrer que la loi de groupe formel correspondante est la somme des fonctions symétriques chromatiques de ces hypergraphes. Nous conjecturons que les fonctions symétriques chromatiques apparaissant de cette manière sont Schur-positives.