Examples of affine braid groups

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

Last update: 18 September 2012

Type $B_{n}$

The lattices are

P^{\lor} = \sum_{i = 1}^{n} ℤ ε_{i}^{\lor}, and Q^{\lor} = {λ_{1} ε_{1}^{\lor} + \dots + λ_{n} ε_{n}^{\lor} ∣ λ_{1} + \dots + λ_{n} = 0 mod 2} .

and

\begin{matrix} α_{i} & = & ε_{i} - ε_{i + 1}, \\ α_{n} & = & ε_{n}, \end{matrix} \begin{matrix} α_{i}^{\lor} & = & ε_{i}^{\lor} - ε_{i + 1}^{\lor}, \\ α_{n}^{\lor} & = & 2 ε_{n}^{\lor}, \end{matrix} \begin{matrix} ω_{i}^{\lor} & = & ε_{i}^{\lor} + \dots + ε_{n}^{\lor}, \\ ω_{n}^{\lor} & = & ε_{1}^{\lor} + \dots + ε_{n}^{\lor}, \end{matrix}

The walls of the fundamental alcove are

𝔥^{α_{0}} = 𝔥^{- (ε_{1} + ε_{2}) + δ}, 𝔥^{α_{i}} = 𝔥^{ε_{i} - ε_{i + 1}}, 𝔥^{α_{n}} = 𝔥^{ε_{n}},

for $i = 1, \dots, n - 1 .$ Since

s_{ε_{1} + ε_{2}} = s_{ε_{1}} s_{ε_{2}} s_{ε_{1} - ε_{2}} = s_{2} s_{3} \dots s_{n - 1} s_{n} s_{n - 1} \dots s_{2} s_{1} s_{2} \dots s_{n - 1} s_{n} s_{n - 1} \dots s_{2},

and

ω_{1}^{\lor} = ε_{1}^{\lor}, w_{1} = s_{ε_{2}} \dots s_{ε_{n}}, and w_{0} = s_{ε_{1}} \dots s_{ε_{n}},

so that

w_{0} w_{1} = s_{ε_{1}} = s_{1} s_{2} \dots s_{n - 1} s_{n} s_{n - 1} \dots s_{1}

it follows (from formulas ???) that

Y^{ε_{1}^{\lor} + ε_{2}^{\lor}} = R_{0} T_{s_{ε_{1} + ε_{2}}} = R_{0} T_{2} \dots T_{n - 1} T_{n} T_{n - 1} \dots T_{2} T_{1} T_{2} \dots T_{n - 1} T_{n} T_{n - 1} \dots T_{2},

and

Y^{ε_{1}^{\lor}} = γ T_{s_{ε_{1}}} = γ T_{1} T_{2} \dots T_{n - 1} T_{n} T_{n - 1} \dots T_{2} T_{1},

and

with $Ω = {1, γ}$ with

γ^{2} = 1, γ R_{0} γ^{- 1} = T_{1}, and γ T_{i} γ^{- 1} = T_{i}, for i = 2, \dots, n .

Then $Y^{ε_{i}^{\lor}} = T_{i - 1}^{- 1} Y^{ε_{i - 1}^{\lor}} T_{i - 1}^{- 1}$ and so

\begin{matrix} Y^{ε_{i}^{\lor}} & = & T_{i - 1}^{- 1} T_{i - 2}^{- 1} \dots T_{1}^{- 1} g T_{1} T_{2} \dots T_{n - 1} T_{n} T_{n - 1} \dots T_{i} \\ = & g T_{i - 1}^{- 1} T_{i - 2}^{- 1} \dots T_{2}^{- 1} R_{0}^{- 1} T_{1} T_{2} \dots T_{n - 1} T_{n} T_{n - 1} \dots T_{i} . \end{matrix}

Type $C_{n}$

The lattices are

P^{\lor} = {λ_{1} ε_{1}^{\lor} + \dots + λ_{n} ε_{n}^{\lor} ∣ all λ_{i} \in \frac{1}{2} ℤ_{\geq 0} or all λ_{i} \in ℤ_{\geq 0}}, Q^{\lor} = \sum_{i = 1}^{n} ℤ ε_{i}^{\lor} .

and

\begin{matrix} α_{i} & = & ε_{i} - ε_{i + 1}, \\ α_{n} & = & 2 ε_{n}, \end{matrix} \begin{matrix} α_{i}^{\lor} & = & ε_{i}^{\lor} - ε_{i + 1}^{\lor}, \\ α_{n}^{\lor} & = & ε_{n}^{\lor}, \end{matrix} \begin{matrix} ω_{i}^{\lor} & = & ε_{1} + \dots + ε_{i}, \\ ω_{n}^{\lor} & = & \frac{1}{2} (ε_{1}^{\lor} + \dots + ε_{n}^{\lor}), \end{matrix}

The walls of the fundamental chamber are

𝔥^{α_{0}} = 𝔥^{- ε_{1} + δ}, 𝔥_{α_{i}} = 𝔥^{ε_{i} - ε_{i + 1}}, 𝔥^{α_{n}} = 𝔥^{ε_{n}}

for $i = 1, \dots, n - 1 .$ Then $ℬ$ is generated by $T_{0}, \dots, T_{n}$ and $Ω = {1, σ}$ with $σ^{2} = 1$ and

with σ T_{i} σ^{- 1} = T_{n - i},

for $i = 0, \dots, n .$ The abelian subgroup $Y = {Y^{λ^{\lor}} ∣ λ^{\lor} \in P^{\lor}}$ is given by

Y^{ε_{1}^{\lor}} = T_{0} T_{1} T_{2} \dots T_{n - 1} T_{n} T_{n - 1} \dots T_{1},

and

Y^{\frac{1}{2} (ε_{1}^{\lor} + \dots + ε_{n}^{\lor})} = g (T_{n} T_{n - 1} \dots T_{1}) (T_{n} T_{n - 1} \dots T_{2}) (T_{n} T_{n - 1} \dots T_{3}) \dots (T_{n} T_{n - 1}) T_{n} .

Since $Y^{ε_{i}^{\lor}} = T_{i - 1}^{- 1} Y^{ε_{i - 1}^{\lor}} T_{i - 1}^{- 1},$

Y^{ε_{i}^{\lor}} = T_{i - 1}^{- 1} T_{i - 1}^{- 2} \dots T_{1}^{- 1} T_{0} T_{1} T_{2} \dots T_{n - 1} T_{n} T_{n - 1} \dots T_{i} .

The formulas (???) and (???) follow from

s_{ε_{1}} = s_{1} s_{2} \dots s_{n - 1} s_{n} s_{n - 1} \dots s_{1},

ω_{1}^{\lor} = \frac{1}{2} (ε_{1}^{\lor} + \dots + ε_{n}^{\lor}) and w_{0} = s_{ε_{1}} \dots s_{ε_{n}}

and

w_{1} = s_{ε_{1} - ε_{n}} s_{ε_{2} - ε_{n - 1}} s_{ε_{3} - ε_{n - 2}} \dots,

so that

w_{0} w_{1} = (s_{n} s_{n - 1} \dots s_{1}) (s_{n} s_{n - 1} \dots s_{2}) (s_{n} s_{n - 1} \dots s_{3}) (s_{n} s_{n - 1}) s_{n} .

A pictorial representation of $ℬ$ is

\begin{matrix} T_{0} = \\ T_{n} = & and \\ T_{i} = \\ σ = \end{matrix}

It may be helpful to as $\tilde{ℬ}$ the full twist

\begin{matrix} σ = & so that σ T_{0} σ^{- 1} = T_{n}, and σ g_{i} σ^{- 1} = g_{n - i}, \end{matrix}

produces the automorphism of the Dynkin diagram.

Type $D_{2 n + 1}$

Let

P^{\lor} = {λ_{1} ε_{1}^{\lor} + \dots + λ_{n} ε_{n}^{\lor} ∣ all λ_{i} \in \frac{1}{2} ℤ_{\geq 0} or all λ_{i} \in ℤ_{\geq 0}}, Q^{\lor} = {λ_{1} ε_{1}^{\lor} + \dots + λ_{n} ε_{n}^{\lor} ∣ λ_{1} + \dots + λ_{n} \in 2 ℤ} .

and

\begin{matrix} α_{i} & = & ε_{i} - ε_{i + 1}, \\ α_{n - 1} & = & ε_{n - 1} - ε_{n}, \\ α_{n} & = & ε_{n - 1} + ε_{n}, \end{matrix} \begin{matrix} α_{i}^{\lor} & = & ε_{i}^{\lor} - ε_{i + 1}^{\lor}, \\ α_{n - 1}^{\lor} & = & ε_{n - 1} - ε_{n}^{\lor}, \\ α_{n}^{\lor} & = & ε_{n - 1} + ε_{n}^{\lor}, \end{matrix} \begin{matrix} ω_{i}^{\lor} & = & ε_{1} + \dots + ε_{i}, \\ ω_{n - 1}^{\lor} & = & \frac{1}{2} (ε_{1}^{\lor} + \dots + ε_{n - 1}^{\lor} - ε_{n}^{\lor}), \\ ω_{n}^{\lor} & = & \frac{1}{2} (ε_{1}^{\lor} + \dots + ε_{n - 1}^{\lor} + ε_{n}^{\lor}), \end{matrix}

The walls of the fundamental chamber are

𝔥^{α_{0}} = 𝔥^{- (ε_{1} + ε_{2}) + δ}, 𝔥_{α_{i}} = 𝔥^{ε_{i} - ε_{i + 1}}, 𝔥^{α_{n}} = 𝔥^{ε_{n - 1} + ε_{n}}

for $i = 1, \dots, n - 1 .$ Then $ℬ$ is generated by $T_{0}, \dots, T_{n}$ and $Ω = {1, g_{1}, g_{n - 1}, g_{n}}$ with $h^{4} = 1$ and

The abelian subgroup $Y = {Y^{λ^{\lor}} ∣ λ^{\lor} \in P^{\lor}}$ is given by

\begin{matrix} Y^{ε_{1}^{\lor}} & = & g_{1} T_{w_{0} w_{1}}, \\ Y^{\frac{1}{2} (ε_{1}^{\lor} + \dots + ε_{n - 1}^{\lor} - ε_{n}^{\lor})} & = & g_{n - 1} T_{w_{0} w_{n - 1}}, \\ Y^{\frac{1}{2} (ε_{1}^{\lor} + \dots + ε_{n - 1}^{\lor} + ε_{n}^{\lor})} & = & g_{n} T_{w_{0} w_{n}}, \end{matrix}

where

w_{0} = {\begin{matrix} s_{ε_{1}} \dots s_{ε_{n - 1}}, & if n is odd, \\ s_{ε_{1}} \dots s_{ε_{n}}, & if n is even, \end{matrix}

since, if $n$ is even,

w_{0} (ε_{i} - ε_{j}) = - ε_{i} + ε_{j}, and w_{0} (ε_{i} + ε_{j}) = - ε_{i} - ε_{j},

for $1 \leq i < j \leq n$ and, if $n$ is odd

\begin{matrix} w_{0} (ε_{i} - ε_{n}) = - ε_{i} - ε_{n}, & and & w_{0} (ε_{i} - ε_{j}) = - ε_{i} + ε_{j}, \\ w_{0} (ε_{i} + ε_{n}) = - ε_{i} + ε_{n}, & w_{0} (ε_{i} + ε_{j}) = - ε_{i} - ε_{j}, \end{matrix}

so that $w_{0}$ takes positive roots to negative roots. Then

w_{1} = {\begin{matrix} s_{ε_{2}} \dots s_{ε_{n}}, & if n is odd, \\ s_{ε_{2}} \dots s_{ε_{n - 1}}, & if n is even, \end{matrix}

w_{n} = s_{ε_{1} - ε_{n}} s_{ε_{2} - ε_{n - 1}} \dots and w_{n - 1} = s_{ε_{1}} s_{ε_{n}} w_{n} .

If $n$ is even then $g_{n}^{2} = g_{1}$ and $g_{n}^{3} = g_{n - 1}$ and $Ω ≅ ℤ / 4 ℤ .$ If $n$ is odd then $g_{n}^{2} = 1,$ $g_{1}^{2} = 1,$ $g_{n - 1}^{2} = 1$ and $g_{n} g_{1} = g_{1} g_{n} = g_{n - 1}$ so that $Ω ≅ ℤ / 2 ℤ \times ℤ / 2 ℤ .$ The lattices are

P^{\lor} \supseteq 𝔥_{ℤ} \supseteq Q^{\lor} if n is odd,

and

\begin{matrix} Q^{\lor} + ℤ ω_{n}^{\lor} \\ P^{\lor} & 𝔥_{ℤ} & Q^{\lor} \\ Q^{\lor} + ℤ ω_{n - 1}^{\lor} \end{matrix}

with $𝔥_{ℤ} = Q^{\lor} + ℤ ω_{1}^{\lor} .$

Then

w_{0} w_{n} = s_{ε_{1}} s_{ε_{n}} = s_{1} s_{2} \dots s_{n - 2} s_{n - 1} s_{n} s_{n - 2} \dots s_{1} .

If $n$ is odd then

\begin{matrix} w_{0} w_{n} & = & (s_{ε_{2}} \dots s_{ε_{n}}) (s_{ε_{1} - ε_{n}} s_{ε_{2} - ε_{n - 2}} \dots) \\ = & (s_{n} s_{n - 2} \dots s_{1}) (s_{n - 1} \dots s_{2}) (s_{n} s_{n - 2} \dots s_{3}) (s_{n - 1} \dots s_{4}) \dots (s_{n} s_{n - 2}) s_{n - 1} \end{matrix}

and

\begin{matrix} w_{0} w_{n - 1} & = & (s_{ε_{1}} \dots s_{ε_{n - 1}}) (s_{ε_{1} - ε_{n}} s_{ε_{2} - ε_{n - 2}} \dots) \\ = & (s_{n - 1} \dots s_{1}) (s_{n} s_{n - 2} \dots s_{2}) (s_{n - 1} \dots s_{3}) (s_{n} s_{n - 2} \dots s_{4}) \dots (s_{n - 1} s_{n - 2}) s_{n} . \end{matrix}

If $n$ is even then

\begin{matrix} w_{0} w_{n} & = & (s_{ε_{1}} \dots s_{ε_{n}}) (s_{ε_{1} - ε_{n}} s_{ε_{2} - ε_{n - 2}} \dots) \\ = & (s_{n} s_{n - 2} \dots s_{1}) (s_{n - 1} \dots s_{2}) (s_{n} s_{n - 2} \dots s_{3}) (s_{n - 1} \dots s_{4}) \dots (s_{n - 1} s_{n - 2}) s_{n} \end{matrix}

and

\begin{matrix} w_{0} w_{n - 1} & = & (s_{ε_{2}} \dots s_{ε_{n - 2}}) (s_{ε_{1} - ε_{n}} s_{ε_{2} - ε_{n - 2}} \dots) \\ = & (s_{n - 1} \dots s_{1}) (s_{n} s_{n - 2} \dots s_{2}) (s_{n - 1} \dots s_{3}) (s_{n} s_{n - 2} \dots s_{4}) \dots (s_{n} s_{n - 2}) s_{n - 1} . \end{matrix}

Finally

s_{ε_{1} + ε_{2}} = s_{ε_{1}} s_{ε_{2}} s_{ε_{1} - ε_{2}} = s_{n} s_{n - 2} \dots s_{1} s_{2} \dots s_{n - 2} s_{n} s_{n - 2} \dots s_{2}

and $T_{0} = g_{1} T_{1} g_{1}^{- 1} = Y^{ε_{1}^{\lor} + ε_{2}^{\lor}} T_{s_{ε_{1} + ε_{2}}} .$

Type $A_{1}$

The Weyl group $W_{0} = ⟨ s_{1} ∣ s_{1}^{2} = 1 ⟩$ has order two and acts on the lattices

\begin{matrix} 𝔥_{ℤ} = ℤ ω^{\lor} and 𝔥_{ℤ}^{*} = ℤ ω by s_{1} ω^{\lor} = - ω^{\lor} and s_{1} ω = - ω, & (5.1) \end{matrix}

and REARRANGE??

\begin{matrix} α^{\lor} = 2 ω^{\lor}, α = 2 ω, and ⟨ ω^{\lor}, α ⟩ = 1 . & (5.2) \end{matrix}

The double affine braid group is generated by $q^{\frac{1}{2}}, g, T_{0}, T_{1}, g^{\lor}, T_{0}^{\lor}$ with relations

\begin{matrix} \begin{matrix} g^{2} = 1, T_{0} = g T_{1} g^{- 1}, {(g^{\lor})}^{2} = 1, T_{0}^{\lor} = g^{\lor} T_{1} {(g^{\lor})}^{- 1}, \\ and T_{1} g^{\lor} g = q^{- \frac{1}{2}} g g^{\lor} T_{1}^{- 1} . \end{matrix} & (5.3) \end{matrix}

Define $Y^{ω^{\lor}}$ and $X^{ω}$ by

\begin{matrix} Y^{ω^{\lor}} = g T_{1} and X^{ω} = g^{\lor} T_{1}^{- 1}, & (5.4) \end{matrix}

and note that

\begin{matrix} T_{0} T_{1} = Y^{2 ω^{\lor}}, and {(T_{0}^{\lor})}^{- 1} T_{1}^{- 1} = X^{2 ω} . & (5.5) \end{matrix}

(Duality).

The double affine braid group $\tilde{ℬ}$ is generated by $T_{0}, T_{1}, g, X^{ω},$ and $q^{\frac{1}{2}},$ with relations
$\begin{matrix} \begin{matrix} g^{2} = 1, T_{0} = g T_{1} g^{- 1}, \\ g X^{ω} = q^{\frac{1}{2}} X^{- ω} g, T_{1} X^{ω} T_{1} = X^{- ω}, and T_{0} X^{- ω} T_{0} = q^{- 1} X^{ω} . \end{matrix} & (5.6) \end{matrix}$
The double affine braid group $\tilde{ℬ}$ is generated by $T_{0}^{\lor}, T_{1}, g^{\lor}, Y^{ω^{\lor}}$ and $q^{\frac{1}{2}}$ with relations
$\begin{matrix} \begin{matrix} {(g^{\lor})}^{2} = 1, T_{0}^{\lor} = g^{\lor} T_{1} {(g^{\lor})}^{- 1}, \\ g^{\lor} Y^{ω^{\lor}} = q^{- \frac{1}{2}} Y^{- ω^{\lor}} g^{\lor}, T_{1}^{- 1} Y^{ω^{\lor}} T_{1}^{- 1}, and {(T_{0}^{\lor})}^{- 1} Y^{- ω^{\lor}} {(T_{0}^{\lor})}^{- 1} = q Y^{ω^{\lor}} . \end{matrix} & (5.7) \end{matrix}$

Proof.

We prove that the presentation in (5.7) is equivalent to the presentation in (5.3). The proof that the presentation in (5.6) is equivalent to the presentation in (5.3) is similar.

(5.3) $\Rightarrow$ (5.7): Use (5.4) to define $Y^{ω}$ in terms of $g$ and $T_{1} .$ The first and second relations in (5.7) are the third and fourth relations (5.3). The proof of the third, fourth and fifth relations in (5.7) are

\begin{matrix} g^{\lor} Y^{ω^{\lor}} = g^{\lor} g T_{1} = q^{- \frac{1}{2}} T_{1}^{- 1} g g^{\lor} = q^{- \frac{1}{2}} Y^{- ω^{\lor}} g^{\lor}, \\ T_{1}^{- 1} Y^{ω^{\lor}} T_{1}^{- 1} = T_{1}^{- 1} g T_{1} T_{1}^{- 1} = T_{1}^{- 1} g = Y^{- ω^{\lor}}, \end{matrix}

and

{(T_{0}^{\lor})}^{- 1} Y^{- ω^{\lor}} {(T_{0}^{\lor})}^{- 1} = g^{\lor} T_{1}^{- 1} g^{\lor} Y^{- ω^{\lor}} g^{\lor} T_{1}^{- 1} g^{\lor} = q^{\frac{1}{2}} g^{\lor} T_{1}^{- 1} Y^{ω^{\lor}} T_{1}^{- 1} g^{\lor} = q^{\frac{1}{2}} g^{\lor} Y^{- ω^{\lor}} g^{\lor} = q Y^{ω^{\lor}},

respectively.

(5.7) $\Rightarrow$ (5.3): Define $g = Y^{ω^{\lor}} T_{1}^{- 1}$ and $T_{0} = Y^{2 ω^{\lor}} T_{1}^{- 1} .$ The third and fourth relations of (5.3) are exactly the first and second relations of (5.7). The proof of the first, second and fifth relations in (5.3) are

\begin{matrix} g^{2} = Y^{ω^{\lor}} T_{1}^{- 1} Y^{ω^{\lor}} T_{1}^{- 1} = Y^{ω^{\lor}} Y^{- ω^{\lor}} = 1, \\ g T_{1} g^{- 1} = Y^{ω^{\lor}} T_{1}^{- 1} T_{1} T_{1} Y^{- ω^{\lor}} = Y^{ω^{\lor}} T_{1} Y^{- ω^{\lor}} = Y^{ω^{\lor}} T_{1} Y^{- ω^{\lor}} T_{1} T_{1}^{- 1} = Y^{2 ω^{\lor}}, \end{matrix}

and

T_{1} g^{\lor} g = T_{1} g^{\lor} Y^{ω^{\lor}} T_{1}^{- 1} = q^{- \frac{1}{2}} T_{1} Y^{- ω^{\lor}} g^{\lor} T_{1}^{- 1} = q^{- \frac{1}{2}} g g^{\lor} T_{1}^{- 1},

respectively.

$□$

The Haiman relations do not occur in Type $A_{1}$ since there are no short roots (or even elements of the lattice) $α$ with $⟨ α, φ^{\lor} ⟩$ equal to 0 or 1.

The double affine Hecke algebra $\tilde{H}$ is $ℂ \tilde{ℬ}$ with the additional relations

\begin{matrix} T_{i}^{2} = (t^{1 / 2} - t^{- 1 / 2}) T_{i} + 1, for i = 0, 1, & (5.8) \end{matrix}

Using (5.8), the relations in Proposition (4.1) give

\begin{matrix} g^{\lor} Y^{ω^{\lor}} = q^{- 1 / 2} Y^{- ω^{\lor}} g^{\lor}, T_{1} Y^{ω^{\lor}} = Y^{- ω^{\lor}} T_{1} + (t^{1 / 2} - t^{- 1 / 2}) \frac{Y^{ω^{\lor}} - Y^{- ω^{\lor}}}{1 - Y^{- α^{\lor}}}, and \\ T_{0}^{\lor} Y^{ω^{\lor}} = q^{- 1} Y^{- ω^{\lor}} T_{0}^{\lor} + (t^{1 / 2} - t^{- 1 / 2}) (\frac{Y^{ω^{\lor}} - q^{- 1} Y^{- ω^{\lor}}}{1 - q Y^{ω^{\lor}}}) . \end{matrix}

With $Y^{α_{0}} = q Y^{α}$ and $Y^{α_{1}} = Y^{α},$ then

τ_{g}^{\lor} = g^{\lor}, and τ_{i}^{\lor} = T_{i}^{\lor} - (t^{1 / 2} - t^{- 1 / 2}) (\frac{1}{1 - Y^{- α_{i}^{\lor}}}), for i = 0, 1 .

To illustrate Theorem 2.2, note that $X^{- 2 ω} s_{1}^{\lor} s_{0}^{\lor}$ is a reduced word and

\begin{matrix} τ_{1}^{\lor} τ_{0}^{\lor} & = & (T_{1}^{\lor} + \frac{t^{- 1 / 2} (1 - t)}{1 - Y^{- α_{1}^{\lor}}}) τ_{0}^{\lor} \\ = & T_{1}^{\lor} T_{0}^{\lor} + T_{1}^{\lor} \frac{t^{- 1 / 2} (1 - t)}{1 - Y^{- α_{0}^{\lor}}} + {(T_{0}^{\lor})}^{- 1} \frac{t^{- 1 / 2} (1 - t)}{1 - Y^{- s_{0} α_{1}^{\lor}}} + (\frac{t^{- 1 / 2} (1 - t)}{1 - Y^{- s_{0} α_{1}^{\lor}}}) (\frac{t^{- 1 / 2} (1 - t) Y^{- α_{0}^{\lor}}}{1 - Y^{- α_{0}^{\lor}}}) \\ = & X^{- 2 ω} + T_{1}^{\lor} \frac{t^{- 1 / 2} (1 - t)}{1 - Y^{- α_{0}^{\lor}}} + X^{2 ω} T_{1}^{\lor} \frac{t^{- 1 / 2} (1 - t)}{1 - Y^{- s_{0} α_{1}^{\lor}}} + (\frac{t^{- 1 / 2} (1 - t)}{1 - Y^{- s_{0} α_{1}^{\lor}}}) (\frac{t^{- 1 / 2} (1 - t) Y^{- α_{0}^{\lor}}}{1 - Y^{- α_{0}^{\lor}}}) \end{matrix}

The corresponding paths in $ℬ (1, \vec{- 2 ω}) = B (\vec{- 2 ω})$ are

\begin{matrix} X^{- 2 ω} & T_{1}^{\lor} \frac{t^{- 1 / 2} (1 - t)}{1 - Y^{- α_{0}^{\lor}}} & X^{2 ω} T_{1}^{\lor} \frac{t^{- 1 / 2} (1 - t)}{1 - Y^{- s_{0} α_{1}^{\lor}}} & \frac{t^{- 1 / 2} (1 - t)}{1 - Y^{- s_{0} α_{1}^{\lor}}} \frac{t^{- 1 / 2} (1 - t) Y^{- α_{0}^{\lor}}}{1 - Y^{- α_{0}^{\lor}}} \end{matrix}

The polynomial representations is defined by

g 1 = 1, T_{0} 1 = t^{\frac{1}{2}} 1, and T_{1} 1 = t^{\frac{1}{2}} 1 .

In this case

\begin{matrix} ρ_{c} = \frac{1}{2} c α and W^{0} = {X^{- ℓ w} ∣ ℓ \in ℤ_{\geq 0}} \cup {X^{ℓ ω} s_{1}^{\lor} ∣ ℓ \in ℤ_{> 0}}, & (5.9) \end{matrix}

is the set of minimal length coset representation of $W^{\lor} / W_{0} .$

Applying the expansion of $τ_{1}^{\lor} τ_{0}^{\lor}$ to $1$ and using

Y^{- α_{0}^{\lor}} 1 = q Y^{α^{\lor}} 1 = q q^{c} 1 = q t 1, and Y^{- s_{0} α_{1}^{\lor}} 1 = Y^{α^{\lor} + 2 d} 1 = q^{2} Y^{α^{\lor}} 1 = q^{2} t,

gives

\begin{matrix} E_{- 2 ω} & = & τ_{1}^{\lor} τ_{0}^{\lor} 1 \\ = & X^{- 2 ω} + t^{1 / 2} \frac{t^{- 1 / 2} (1 - t)}{1 - q t} + X^{2 ω} t^{1 / 2} \frac{t^{- 1 / 2} (1 - t)}{1 - q^{2} t} + (\frac{t^{- 1 / 2} (1 - t)}{1 - q^{2} t}) (\frac{t^{- 1 / 2} (1 - t) q t}{1 - q t}) \\ = & X^{- 2 ω} + \frac{1 - t}{1 - q t} + X^{2 ω} \frac{1 - t}{1 - q^{2} t} + (\frac{1 - t}{1 - q^{2} t}) (\frac{(1 - t) q}{1 - q t}) . \end{matrix}

Since $1_{0} = T_{1}^{\lor} + t^{- 1 / 2}$ the symmetric Macdonald polynomial $P_{2 ω} = 1_{0} E_{2 ω} = 1_{0} τ_{0}^{\lor} 1$ is

\begin{matrix} P_{2 ω} & = & 1_{0} E_{2 ω} = (T_{1}^{\lor} + t^{- 1 / 2}) τ_{0}^{\lor} 1 \\ = & (T_{1}^{\lor} T_{0}^{\lor} + T_{1}^{\lor} \frac{t^{- 1 / 2} (1 - t)}{1 - Y^{- α_{0}^{\lor}}} + t^{- 1 / 2} {(T_{0}^{\lor})}^{- 1} + t^{- 1 / 2} \frac{t^{- 1 / 2} (1 - t) Y^{- α_{0}^{\lor}}}{1 - Y^{- α_{0}^{\lor}}}) 1 \\ = & (X^{- 2 ω} + t^{1 / 2} \frac{t^{- 1 / 2} (1 - t)}{1 - q t} + t^{- 1 / 2} X^{2 ω} T_{1}^{\lor} + t^{- 1 / 2} \frac{t^{- 1 / 2} (1 - t) q t}{1 - q t}) 1 \\ = & (X^{- 2 ω} + t^{1 / 2} \frac{1 - t}{1 - q t} + X^{2 ω} + t^{- 1 / 2} \frac{(1 - t) q}{1 - q t}) 1 = (X^{2 ω} + X^{- 2 ω} + t^{1 / 2} + (1 + q) \frac{1 - t}{1 - q t}) 1 . \end{matrix}

The corresponding paths in $𝒫 (\vec{2 ω})$ are

\begin{matrix} X^{- 2 ω} & \frac{1 - t}{1 - t q} & X^{2 ω} & q \frac{(1 - t)}{1 - t q} \end{matrix}

Type $G L_{2}$

From $G L_{n}$ we get $τ T_{1} τ^{- 1} = s_{0},$

\begin{matrix} Y^{ε_{1}^{\lor}} = τ T_{1}, Y^{ε_{2}^{\lor}} = τ S_{0}, Y^{ε_{1}^{\lor} - ε_{2}^{\lor}} = S_{0} T_{1}, \\ X^{ε_{1}} = τ^{\lor} T_{1}^{- 1}, X^{ε_{2}} = τ^{\lor} {(S_{0}^{\lor})}^{- 1}, X^{ε_{1} - ε_{1}} = {(S_{0}^{\lor})}^{- 1} T_{1}^{- 1} . \end{matrix}

Further $ℬ_{G L_{2}} \subseteq ℬ_{2}$ by

τ = T_{0} T_{1} T_{2}, X^{ε_{1} + ε_{2}} = τ^{2} = {(T_{0} T_{1} T_{2})}^{2}, and S_{0} = τ T_{1} τ^{- 1} = T_{0} T_{2}^{- 1} T_{1} T_{2} T_{0}^{- 1} .

To check these we note that

Y^{ε_{1}^{\lor}} = T_{0} T_{1} T_{2} T_{1} and Y^{ε_{2}^{\lor}} = T_{1}^{- 1} T_{0} T_{1} T_{2}

so that

τ T_{1} τ^{- 1} = T_{0} T_{1} T_{2} T_{1} T_{2}^{- 1} T_{1}^{- 1} T_{0}^{- 1} = T_{0} T_{2}^{- 1} T_{1} T_{2} T_{1} T_{1}^{- 1} T_{0}^{- 1} = T_{0} T_{2}^{- 1} T_{1} T_{2} T_{0}^{- 1} .

which should be $T_{0}$ in $G L_{2} .$

Type $B_{2}$

\begin{matrix} with ℬ_{S O_{5}} \subseteq ℬ_{2} via R_{0} = T_{0} T_{1} T_{0} . \end{matrix}

Further,

with γ = T_{0}, ℬ_{{Spin}_{5}} is the quotient of ℬ_{{S p}_{4}} by γ^{2} = 1 .

The conversions come from the formulas

Y^{ε_{1}^{\lor} + ε_{2}^{\lor}} = R_{0} T_{2} T_{1} T_{2}, Y^{ε_{1}^{\lor}} = γ T_{1} T_{2} T_{1},

THIS $γ$ WANTS TO BE $T_{0}$ in $ℬ_{{Spin}_{5}} .$

Type $A_{1} \times A_{1}$

There is an embedding of $ℬ \subseteq ℬ_{2}$ by

a_{2} = T_{2} T_{1} T_{2}, R_{0} = T_{0} T_{1} T_{0} S_{0} = T_{2} T_{0} T_{1} .

Notes and References

This page is taken from a paper entitled Double affine braid groups and Hecke algebras of classical type by Arun Ram, March 5, 2009.

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