Reflection groups

Arun Ram
Department of Mathematics and Statistics
University of Melbourne
Parkville, VIC 3010 Australia
aram@unimelb.edu.au

Last updates: 21 February 2012

Reflection groups

Let $𝔬$ be a commutative ring, $𝔽$ the field of fractions of $𝔬$ and $\overline{𝔽}$ the algebraic closure if $𝔽$ .

A $𝔬$ -reflection group is a pair $(𝔥_{𝔬}, W_{0})$ such that

$𝔥_{𝔬}$ is a free $𝔬$ -module,
$W_{0}$ is a finite subgroup of $GL (𝔥_{𝔬})$ generated by reflections,

where, letting

𝔥_{\overline{𝔽}} = \overline{𝔽} \otimes_{𝔬} 𝔥_{𝔬}

, a reflection is

s \in GL (𝔥_{\overline{𝔽}})

which is conjugate (in

GL (𝔥_{\overline{𝔽}})

) to

diag (ξ, 1, \dots, 1)

with

ξ \neq 1

The group $W_{0}$ acts on $𝔥_{𝔬}^{*} = {Hom}_{𝔬} (𝔥_{𝔬}, 𝔬)$ by $⟨ w μ, λ^{\lor} ⟩ = ⟨ μ, w^{- 1} λ^{\lor} ⟩, where ⟨ μ, λ^{\lor} ⟩ = μ (λ^{\lor}),$ for $w \in W_{0}$ , $μ \in 𝔥_{𝔬}^{*}$ , and $λ^{\lor} \in 𝔥_{𝔬}$ . Let $R^{+} = {s \in W_{0} | s is a reflection} .$

If $s$ is a reflection in $W_{0}$ let $α \in 𝔥_{\overline{𝔽}}^{*}$ and $α^{\lor} \in 𝔥_{\overline{𝔽}}$ be chosen such that

s μ = μ - ⟨ μ, α^{\lor} ⟩ α, and s^{- 1} λ^{\lor} = λ^{\lor} - ⟨ λ^{\lor}, α ⟩ α^{\lor},

(rff)

so that the reflecting hyperplanes for

s

are

𝔥^{s} = {λ^{\lor} \in 𝔥 | ⟨ λ^{\lor}, α ⟩ = 0} and {(𝔥^{*})}^{s} = {μ \in 𝔥^{*} | ⟨ μ, α^{\lor} ⟩ = 0} .

Since

s α = (1 - ⟨ α, α^{\lor} ⟩) α = \det_{𝔥^{*}} (s) α,

it follows that if

\tilde{α}, {\tilde{α}}^{\lor}

is another choice in (rff) then there is a constant

γ \in \overline{𝔽}

such that

\tilde{α} = γ α

and

{\tilde{α}}^{\lor} = γ^{- 1} α^{\lor}

Notes and References

These notes are partly based on the definitions in [AG+] (Andersen, Grodal, etc). This paragraph is taken from Section 3 of stephen8.9.06.pdf.

References

[AG+] ?. Andersen, J. Grodal, ??????, Clasification of $p$ -compact groups for $p$ odd, Ann. Math. ???

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