Mathematics Stack Exchange
Mathematics Stack Exchange

Questions tagged [coxeter-groups]

For questions about Coxeter groups, an abstract group that admits a formal description in terms of reflections.

In mathematics, a Coxeter group, named after H.S.M. Coxeter, is an abstract group that admits a formal description in terms of reflections. Indeed, the finite Coxeter groups are precisely the finite Euclidean reflection groups; the symmetry groups of regular polyhedra are an example. However, not all Coxeter groups are finite, and not all can be described in terms of symmetries and Euclidean reflections. Coxeter groups were introduced (Coxeter 1934) as abstractions of reflection groups, and finite Coxeter groups were classified in 1935 (Coxeter 1935).

Coxeter groups find applications in many areas of mathematics. Examples of finite Coxeter groups include the symmetry groups of regular polytopes, and the Weyl groups of simple Lie algebras. Examples of infinite Coxeter groups include the triangle groups corresponding to regular tessellations of the Euclidean plane and the hyperbolic plane, and the Weyl groups of infinite-dimensional Kac–Moody algebras.

263 questions
4
votes
1 answer

Exercise 3 in Chapter IV, Section 1 on Bourbaki, *Lie Groups and Lie Algebras*

This is exercise 3 in Bourbaki, Lie Groups and Lie Algebras. The application I'm interested in is the fact that for any $\theta \subseteq \Delta$ in a reduced root system, there exists a unique left coset representative of each left coset…
D_S
  • 33,891
3
votes
1 answer

Do mutually commuting reflections have this property in the Bruhat order?

Suppose $(W,S)$ is a Coxeter system and let $<$ denote the (strong) Bruhat Order of $W$; that is $u < b$, there exists some sequence of $t_1,\ldots,t_k \in S^W$ such that $v = ut_1\ldots t_k$ and $l(v) = l(u) + k$ (for the usual length function $l$…
Rob Nicolaides
  • 317
3
votes
1 answer

What's the classification of Coxeter Groups for which every proper parabolic subgroup is finite?

Let $(W,S)$ be a Coxeter Group. I want to know exactly which Coxeter Groups have the property $\forall J \subsetneqq S $, $W_J$ is finite. I can think of the finite Coxeter Groups, the Affine Coxeter Groups. A few more quickly come to mind. Here's…
Rob Nicolaides
  • 317
3
votes
1 answer

Why is this map diagonalisable?

In some lecture notes about Reflection Groups, the writer constructs a vector space based on a Coxeter-system. For every $s \in S$ where $(W|S)$ is a Coxeter-system, he calls the related basis vector $\alpha_s$. He constructs the vector space $V$ as…
Huy
  • 6,674
2
votes
1 answer

The Tits Cone - Geometric Understanding

I know that the definition of the Tits cone is $Y=\bigcup_{w\in W}{wC}$ with W the Coxeter Groups and C the fundamental chamber. One theorem says that Y is the whole space if W is finite. But how can i understand this geometrically and how can i…
Weyl155
  • 21
2
votes
1 answer

A question on Coxeter groups

Let $W$ be a Coxeter group, and $S$ be its set of simple reflections. For any $w \in W$, define $\mathcal L(w)$ $\mathcal L(w) = \{s \in S| sw
sunkist
  • 1,133
1
vote
0 answers

reflection representation of an arbitrary Coxeter group

A reflection group has a reflection representation in the natural sense. But what is the reflection representation for a Coxeter group if its simple roots cannot be regarded as reflections in the Euclidean space? In this paper, the author says that…
sunkist
  • 1,133
1
vote
0 answers

The coefficient of a root in a root system must be 0 or at least 1

Let W be a Coxeter group (not necessarily finite), and let Π and Φ be the corresponding root basis and root system. Suppose that x ∈ Φ + and a ∈ Π such that the coefficient of a in x is not zero. Prove that this coefficient must be greater than or…
Qingzhi Li
  • 21
  • 3
1
vote
2 answers

I don't know what this symbol in root systems means (of coxeter groups)

I'm reading Humphreys, Reflection groups and Coxeter groups. The section "Construction of root systems" and the books uses the symbol $ \mathop {\alpha}\limits^{\sim} $ to denote an special element. But I don't know what it is. I looked for it but…
Miguel
  • 339
0
votes
1 answer

Bruhat Order on Coxeter Groups

I have been studying Coxeter Groups and started reading on Bruhat Order in the same context. I came across the following definition: Consider $(W,S)$ a Coxeter system with the set of reflections: $T = \{(wsw)^{-1} \mid w \in W, s\in S \}$. for any…
FAF
  • 403
0
votes
0 answers

Is a Coxeter group W operating on a finite set X also finite?

Please regard this A COMBINATORIAL CONSTRUCTION FOR SIMPLY–LACED LIE ALGEBRAS on page 7 (it is brief but I hope that page is enought introduction on that topic). Can I argue, and if so how, that the coxeter group $W$ is finite if the set $R(X)$ is…
milkpirate
  • 145