International audienceIt is known that Euler numbers, defined as the Taylor coefficients of the tangent and secant functions, count alternating permutations in the symmetric group. Springer defined a generalization of these numbers for each finite Coxeter group by considering the largest descent class, and computed the value in each case of the classification. We consider here another generalization of Euler numbers for finite Coxeter groups, building on Stanley's result about the number of orbits of maximal chains of set partitions. We present a method to compute these integers and obtain the value in each case of the classification. In the second part of this work, we consider maximal chains of noncrossing partitions, and how this set is ...
The Eulerian polynomial of a finite Coxeter system (W, S) of rank n records, for each k ¿ {1, . . . ...
Abstract. When W is a finite reflection group, the noncrossing partition lattice NC(W) of type W is ...
AbstractWe study in this work properties of a combinatorial expansion of the classical Eulerian poly...
International audienceIt is known that Euler numbers, defined as the Taylor coefficients of the tang...
International audienceIn the combinatorics of finite finite Coxeter groups, there is a simple formul...
This thesis serves two purposes: it is a comprehensive introduction to the ``Catalan combinatorics''...
In this paper we will compute the Mobius number of {NC⁽ᵏ⁾(W)╲mins} ∪ {0^} for a Coxeter group W whic...
Cette thèse porte sur l'étude de la combinatoire énumérative, plus particulièrement autour des parti...
This dissertation consists of three papers in combinatorial Coxeter group theory. A Coxeter group is...
This text presents the Eulerian numbers in the context of modern enumerative, algebraic, and geometr...
Given a finite Coxeter group W and a Coxeter element c, the W-noncrossing partitions are given by [1...
AbstractWe study the polynomials obtained by enumerating a finite Coxeter group by number of descent...
AbstractConsider a set of n positive integers consisting of μ1 1's, μ2 2's,…, μr r's. If the integer...
Dedicated to the memory of Rodica Simion Abstract. The poset of noncrossing partitions can be natura...
The Eulerian numbers count the number of permutations in the symmetric groups with a certain number ...
The Eulerian polynomial of a finite Coxeter system (W, S) of rank n records, for each k ¿ {1, . . . ...
Abstract. When W is a finite reflection group, the noncrossing partition lattice NC(W) of type W is ...
AbstractWe study in this work properties of a combinatorial expansion of the classical Eulerian poly...
International audienceIt is known that Euler numbers, defined as the Taylor coefficients of the tang...
International audienceIn the combinatorics of finite finite Coxeter groups, there is a simple formul...
This thesis serves two purposes: it is a comprehensive introduction to the ``Catalan combinatorics''...
In this paper we will compute the Mobius number of {NC⁽ᵏ⁾(W)╲mins} ∪ {0^} for a Coxeter group W whic...
Cette thèse porte sur l'étude de la combinatoire énumérative, plus particulièrement autour des parti...
This dissertation consists of three papers in combinatorial Coxeter group theory. A Coxeter group is...
This text presents the Eulerian numbers in the context of modern enumerative, algebraic, and geometr...
Given a finite Coxeter group W and a Coxeter element c, the W-noncrossing partitions are given by [1...
AbstractWe study the polynomials obtained by enumerating a finite Coxeter group by number of descent...
AbstractConsider a set of n positive integers consisting of μ1 1's, μ2 2's,…, μr r's. If the integer...
Dedicated to the memory of Rodica Simion Abstract. The poset of noncrossing partitions can be natura...
The Eulerian numbers count the number of permutations in the symmetric groups with a certain number ...
The Eulerian polynomial of a finite Coxeter system (W, S) of rank n records, for each k ¿ {1, . . . ...
Abstract. When W is a finite reflection group, the noncrossing partition lattice NC(W) of type W is ...
AbstractWe study in this work properties of a combinatorial expansion of the classical Eulerian poly...