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This paper provides a unified combinatorial framework to study orbits in certain affine flag varieties via the associated Bruhat-Tits buildings. We first formulate, for arbitrary affine buildings, the notion of a chimney retraction. This…

Representation Theory · Mathematics 2022-04-08 Elizabeth Milićević , Yusra Naqvi , Petra Schwer , Anne Thomas

We introduce the notion of 321-avoiding permutations in the affine Weyl group $W$ of type $A_{n-1}$ by considering the group as a George group (in the sense of Eriksson and Eriksson). This enables us to generalize a result of Billey,…

Combinatorics · Mathematics 2007-05-23 R. M. Green

We define the notion of a separable element in a finite Weyl group, generalizing the well-studied class of separable permutations. We prove that the upper and lower order ideals in weak Bruhat order generated by a separable element are…

Combinatorics · Mathematics 2020-01-07 Christian Gaetz , Yibo Gao

We extend the weak Bruhat order of a finite Coxeter group to the set of its coclasses, modulo parabolic standard subgroups. We use this order to describe associative algebra structures on the vector spaces spanned by the faces of…

Combinatorics · Mathematics 2007-05-23 Patricia Palacios , Maria Ronco

Let $B$ be a ring, not necessarily commutative, having an involution $*$ and let ${\mathrm U}_{2m}(B)$ be the unitary group of rank $2m$ associated to a hermitian or skew hermitian form relative to $*$. When $B$ is finite, we construct a…

Representation Theory · Mathematics 2019-06-11 James Cruickshank , Luis Gutiérrez Frez , Fernando Szechtman

In the seminal paper of Borel and Tits about reductive groups, they show some fundamental results about Bruhat cells with respect to a minimal parabolic subgroup, e.g., relative Bruhat decomposition and its geometrization, relative Bruhat…

Algebraic Geometry · Mathematics 2026-01-21 Fei Chen , Shang Li

Given an affine Coxeter group $W$, the corresponding Shi arrangement is a refinement of the corresponding Coxeter hyperplane arrangements that was introduced by Shi to study Kazhdan-Lusztig cells for $W$. In particular, Shi showed that each…

Combinatorics · Mathematics 2024-12-13 Nathan Chapelier-Laget , Christophe Hohlweg

The decomposition of representations of compact classical Lie groups into representations of finite subgroups is discussed. A Mathematica package is presented that can be used to compute these branching rules using the Weyl character…

High Energy Physics - Theory · Physics 2015-07-16 Maximilian Fallbacher

We prove the conjecture of A. Postnikov that (A) the number of regions in the inversion hyperplane arrangement associated with a permutation $w\in \Sn$ is at most the number of elements below $w$ in the Bruhat order, and (B) that equality…

Combinatorics · Mathematics 2007-10-08 Axel Hultman , Svante Linusson , John Shareshian , Jonas Sjöstrand

The Bruhat-Tits theory is a key ingredient in the construction of irreducible smooth representations of $p$-adic reductive groups. We describe generalizations to arbitrary such representations of several results recently obtained in the…

Representation Theory · Mathematics 2023-06-13 Anne-Marie Aubert

We characterise the permutations pi such that the elements in the closed lower Bruhat interval [id,pi] of the symmetric group correspond to non-taking rook configurations on a skew Ferrers board. It turns out that these are exactly the…

Combinatorics · Mathematics 2007-05-23 Jonas Sjostrand

We give a new description of the Pieri rule for k-Schur functions using the Bruhat order on the affine type-A Weyl group. In doing so, we prove a new combinatorial formula for representatives of the Schubert classes for the cohomology of…

Combinatorics · Mathematics 2016-05-19 Avinash J. Dalal , Jennifer Morse

Let $(W,S)$ be a Coxeter system of type $A$, so that $W$ can be identified with the symmetric group $\mathrm{Sym}(n)$ for some positive integer $n$ and $S$ with the set of simple transpositions $\{\,(i,i+1)\mid 1\leqslant i\leqslant…

Group Theory · Mathematics 2015-03-05 Van Minh Nguyen

For a dominant integral weight $\Lambda$ in a Lie algebra of affine type A and rank $e$, and an interval $I_0$ in the residue set $I$, we define the face for the interval $I_0$ to be the subgraph of the block-reduced crystal $\widehat…

Representation Theory · Mathematics 2023-04-21 Ola Amara-Omari , Ronit Mansour , Mary Schaps

We show that parabolic Kazhdan-Lusztig polynomials of type $A$ compute the decomposition numbers in certain Harish-Chandra series of unipotent characters of finite groups of Lie types $B$, $C$ and $D$ over a field of non-defining…

Representation Theory · Mathematics 2023-11-29 Olivier Dudas , Emily Norton

We study the question of finding big Bruhat intervals that are poset hypercubes in the symmetric group $S_n$. Using permutations suggested by AlphaEvolve (an evolutionary coding agent developed by Google DeepMind), we were led to an unusual…

Combinatorics · Mathematics 2026-01-06 Jordan Ellenberg , Nicolas Libedinsky , David Plaza , José Simental , Geordie Williamson

In this paper we show that the lowest two-sided ideal of an affine Hecke algebra is affine cellular for all choices of parameters. We explicitely describe the cellular basis and we show that the basis elements have a nice decomposition when…

Representation Theory · Mathematics 2013-10-14 Jeremie Guilhot

Suppose that $W$ is a finite Coxeter group and $W_J$ a standard parabolic subgroup of $W$. The main result proved here is that for any for any $w \in W$ and reduced expression of $w$ there is an Elnitsky tiling of a $2m$-polygon, where $m =…

Group Theory · Mathematics 2024-07-23 Robert Nicolaides , Peter Rowley

In well-known work, Kazhdan and Lusztig (1979) defined a new set of Hecke algebra basis elements (actually two such sets) associated to elements in any Coxeter group. Often these basis elements are computed by a standard recursive algorithm…

Representation Theory · Mathematics 2015-05-15 Leonard Scott , Timothy Sprowl

Double Bruhat cells in a semisimple group are intersections of cells in two Bruhat decompositions corresponding to two opposite Borel subgroups. They form a geometric framework for the study of total positivity in semisimple groups; they…

Algebraic Geometry · Mathematics 2007-05-23 Andrei Zelevinsky
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