AbstractLet W be a finite Weyl group and A be the corresponding Weyl arrangement. A deformation of A is an affine arrangement which is obtained by adding to each hyperplane H∈A several parallel translations of H by the positive root (and its integer multiples) perpendicular to H. We say that a deformation is W-equivariant if the number of parallel hyperplanes of each hyperplane H∈A depends only on the W-orbit of H. We prove that the conings of the W-equivariant deformations are free arrangements under a Shi–Catalan condition and give a formula for the number of chambers. This generalizes Yoshinaga’s theorem conjectured by Edelman–Reiner
The addition-deletion theorems for hyperplane arrangements, which were originally shown in [T1], pro...
AbstractLet an affine Weyl group Ŵ act as a group of affine transformations on a real vector space ...
We consider the Ehrhart h[superscript ∗]-vector for the hypersimplex. It is well-known that the sum ...
AbstractLet A be an irreducible Coxeter arrangement and W be its Coxeter group. Then W naturally act...
A Weyl arrangement is the arrangement defined by the root system of a finite Weyl group. When a set ...
AbstractWe classify the hyperplane arrangements between the cones of the braid arrangement and the S...
We give the first complete classification of free and non-free multiplicities on an arrangement, ca...
AbstractThe Shi arrangement Ln is the arrangement of affine hyperplanes in Rn of the form xi − xj = ...
This paper explores affine Weyl groups and their associated Hecke algebras, concentrating on the Poi...
The class of Worpitzky-compatible subarrangements of a Weyl arrangement together with an associated ...
We consider various consequences of the existence of exceptional representations of an irreducible W...
AbstractWe define primitive derivations for Coxeter arrangements which may not be irreducible. Using...
0.1. LetW be aWeyl group with standard set of generators S; let ≤ be the Bruhat order on W. In [KL1...
Hyperplane Arrangements of rank $3$ admitting an unbalanced Ziegler restriction are known to fulfill...
AbstractLet W be a finite Coxeter group. For a given w∈W, the following assertion may or may not be ...
The addition-deletion theorems for hyperplane arrangements, which were originally shown in [T1], pro...
AbstractLet an affine Weyl group Ŵ act as a group of affine transformations on a real vector space ...
We consider the Ehrhart h[superscript ∗]-vector for the hypersimplex. It is well-known that the sum ...
AbstractLet A be an irreducible Coxeter arrangement and W be its Coxeter group. Then W naturally act...
A Weyl arrangement is the arrangement defined by the root system of a finite Weyl group. When a set ...
AbstractWe classify the hyperplane arrangements between the cones of the braid arrangement and the S...
We give the first complete classification of free and non-free multiplicities on an arrangement, ca...
AbstractThe Shi arrangement Ln is the arrangement of affine hyperplanes in Rn of the form xi − xj = ...
This paper explores affine Weyl groups and their associated Hecke algebras, concentrating on the Poi...
The class of Worpitzky-compatible subarrangements of a Weyl arrangement together with an associated ...
We consider various consequences of the existence of exceptional representations of an irreducible W...
AbstractWe define primitive derivations for Coxeter arrangements which may not be irreducible. Using...
0.1. LetW be aWeyl group with standard set of generators S; let ≤ be the Bruhat order on W. In [KL1...
Hyperplane Arrangements of rank $3$ admitting an unbalanced Ziegler restriction are known to fulfill...
AbstractLet W be a finite Coxeter group. For a given w∈W, the following assertion may or may not be ...
The addition-deletion theorems for hyperplane arrangements, which were originally shown in [T1], pro...
AbstractLet an affine Weyl group Ŵ act as a group of affine transformations on a real vector space ...
We consider the Ehrhart h[superscript ∗]-vector for the hypersimplex. It is well-known that the sum ...