Affine root systems of classical type

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

Last update: 26 January 2013

Affine root systems

The notation for affine root systems is $$W_S=\left\{s_a \right| a\in S\}andS=(S_1,S_2),$$ where $$S_1=\{a\in S | \frac{1}{2}a\notin S\}and{S}_2=\{a\in S | 2a\notin S\}.$$

Define $$\begin{array}{rclrcl}{O}_1& =& \{\pm {\epsilon }_i+r | 1\le i\le n,r\in \mathbb{Z}\}& O_2& =& \{\pm 2{\epsilon }_i+2r | 1\le i\le n,r\in \mathbb{Z}\}\\ O_3& =& \{\pm {\epsilon }_i+\frac{1}{2}(2r+1) | 1\le i\le n,r\in \mathbb{Z}\}& O_4& =& \{\pm 2{\epsilon }_i+2r+1 | 1\le i\le n,r\in \mathbb{Z}\}\\ O_5^{-}& =& \{\pm ({\epsilon }_i-{\epsilon }_j)+r | 1\le i<j\le n,r\in \mathbb{Z}\}& O_5^{+}& =& \{\pm ({\epsilon }_i+{\epsilon }_j)+r | 1\le i<j\le n,r\in \mathbb{Z}\}\end{array}$$ and $O_5=O_5^{-}\bigsqcup O_5^{+}$ so that the affine root systems of classical type are missing Note that $${\epsilon }_n\in O_1, 2{\epsilon }_n\in O_2, {\epsilon }_1+\frac{1}{2}\delta \in O_3, 2{\epsilon }_1+\delta \in O_4,$$ and $${\epsilon }_i-{\epsilon }_{i+1}\in O_5, \; for\; i=1,...,n-1.$$

Where the left notation is the notation in [M03, §1.3] and the right notation is that of [BT]. The Weyl groups of these are $$W_S=\{\begin{array}{ll}{W}_{C_n},& for\; types\; C_n,C_n^{\vee },B{C}_n,(B{C}_n,C_n),(C_n^{\vee },B{C}_n),(C_n^{\vee },C_n) ,\\ W_{B_n},& for\; types\; B_n,B_n^{\vee },(B_n,B_n^{\vee }) ,\\ W_{D_n},& for\; type\; D_n\end{array}\phantom{\}}$$ where $$W_{C_n}=W_0⋉{𝔥}_{\mathbb{Z}}\supseteq W_{B_n}=W_0⋉{\stackrel{\_}{𝔥}}_{\mathbb{Z}}\supseteq W_{D_n}=\stackrel{\_}{W_0}⋉{\stackrel{\_}{𝔥}}_{\mathbb{Z}}$$ with $$W_0=G_{2,1,n},\stackrel{\_}{W_0}=G_{2,2,n}$$ and $${𝔥}_{\mathbb{Z}}=\sum _{i=1}^n\mathbb{Z}{\epsilon }_i,and{\stackrel{\_}{𝔥}}_{\mathbb{Z}}=\{{\lambda }_1{\epsilon }_1+\cdots +{\lambda }_n{\epsilon }_n | {\lambda }_1+\cdots +{\lambda }_n=0 \mathrm{mod} 2\},$$ SAY SOMETHING ABOUT $W_S$ orbits on $S.$ HOW DO THESE COMPARE TO KAC AND SAHI-ION???

When $n=2$ define $$\begin{array}{rclrcl}{O}_1& =& \{\pm {\epsilon }_i+r | 1\le i\le 2,r\in \mathbb{Z}\}& O_2& =& \{\pm 2{\epsilon }_i+2r | 1\le i\le 2,r\in \mathbb{Z}\}\\ O_3& =& \{\pm {\epsilon }_i+\frac{1}{2}(2r+1) | 1\le i\le 2,r\in \mathbb{Z}\}& O_4& =& \{\pm 2{\epsilon }_i+2r+1 | 1\le i\le 2,r\in \mathbb{Z}\}\\ O_5^{-}& =& \{\pm ({\epsilon }_1-{\epsilon }_2)+r | r\in \mathbb{Z}\}& O_5^{+}& =& \{\pm ({\epsilon }_1+{\epsilon }_2)+r | r\in \mathbb{Z}\}\end{array}$$ Then the "classical" affine root systems of rank 2 are

When $n=1$ define $$\begin{array}{rclrcl}{O}_1& =& \{\pm {\epsilon }_1+r | r\in \mathbb{Z}\}& O_2& =& \{\pm 2{\epsilon }_1+2r | r\in \mathbb{Z}\}\\ O_3& =& \{\pm {\epsilon }_1+\frac{1}{2}(2r+1) | r\in \mathbb{Z}\}& O_4& =& \{\pm 2{\epsilon }_1+2r+1 | r\in \mathbb{Z}\}\end{array}$$ Then the "classical" affine root systems of rank 1 are

Notes and References

These notes are from a study of Macdonald polynomials of type C in 2008-2009.

References

References?

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