Add to ORKGWe study the reduced expressions for reflections in Coxeter groups, with particular emphasis on finite Weyl groups. For example, the number of reduced expressions for any reflection can be expressed as the sum of the squares of the number of reduced expressions for certain elements naturally associated to the reflection. In the case of the longest reflection in a Weyl group, we use a theorem of Dale Peterson to provide an explicit formula for the number of reduced expressions. We also show that the reduced expressions for any Weyl group reflection are in bijection with the linear extensions of a natural partial ordering of a subset of the positive roots or co-roots
Let W = (W,S) be a Coxeter group with S the set of its Coxeter genera-tors. Let ≤ be the Bruhat orde...
AbstractThis paper is concerned with commutation classes of reduced words in Weyl groups. It is divi...
AbstractIn the first part of this paper we study normal forms of elements of the imprimitive complex...
We study the reduced expressions for reflections in Coxeter groups, with particular emphasis on fini...
AbstractIn this paper, we present formulas for the number of decompositions of elements of the Weyl ...
Abstract(1) The Poincaré polynomials of the finite irreducible Coxeter groups are derived by an elem...
Let r(w) denote the number of reduced decompositions of the element w of a Coxeter group W. Using th...
The topic of this thesis is the combinatorial structure of the set of reduced expressions in infinit...
In this paper, we investigate the order types of reflection orders on affine Weyl groups. We classif...
Stanley's formula for the number of reduced expressions of a permutation regarded as a Coxeter group...
AbstractWe provide several characterizations of the “λ-minuscule” elements of Weyl groups studied by...
AbstractLet r(w) denote the number of reduced words for an element w in a Coxeter group W. Stanley p...
Let (W,R) be an arbitrary Coxeter system. We determine the number of elements of W that have a uniqu...
We construct an algorithm for getting a reduced expression for any element in acomplex reflection gr...
AbstractLet R be a root system with fixed basis ϵ and let W be its Weyl group. For every element w ϵ...
Let W = (W,S) be a Coxeter group with S the set of its Coxeter genera-tors. Let ≤ be the Bruhat orde...
AbstractThis paper is concerned with commutation classes of reduced words in Weyl groups. It is divi...
AbstractIn the first part of this paper we study normal forms of elements of the imprimitive complex...
We study the reduced expressions for reflections in Coxeter groups, with particular emphasis on fini...
AbstractIn this paper, we present formulas for the number of decompositions of elements of the Weyl ...
Abstract(1) The Poincaré polynomials of the finite irreducible Coxeter groups are derived by an elem...
Let r(w) denote the number of reduced decompositions of the element w of a Coxeter group W. Using th...
The topic of this thesis is the combinatorial structure of the set of reduced expressions in infinit...
In this paper, we investigate the order types of reflection orders on affine Weyl groups. We classif...
Stanley's formula for the number of reduced expressions of a permutation regarded as a Coxeter group...
AbstractWe provide several characterizations of the “λ-minuscule” elements of Weyl groups studied by...
AbstractLet r(w) denote the number of reduced words for an element w in a Coxeter group W. Stanley p...
Let (W,R) be an arbitrary Coxeter system. We determine the number of elements of W that have a uniqu...
We construct an algorithm for getting a reduced expression for any element in acomplex reflection gr...
AbstractLet R be a root system with fixed basis ϵ and let W be its Weyl group. For every element w ϵ...
Let W = (W,S) be a Coxeter group with S the set of its Coxeter genera-tors. Let ≤ be the Bruhat orde...
AbstractThis paper is concerned with commutation classes of reduced words in Weyl groups. It is divi...
AbstractIn the first part of this paper we study normal forms of elements of the imprimitive complex...