Notes on Affine Hecke Algebras I.
(Degenerated Hecke Algebras and Yangians in Mathematical Physics)

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

Last update: 23 April 2014

Notes and References

This is an excerpt of the paper Notes on Affine Hecke Algebras I. (Degenerated Hecke Algebras and Yangians in Mathematical Physics) by Ivan Cherednik.

Yang-Baxter identities

Let us describe a sequence of $n$ particles at the moment $t=t_0$ with the $x\text{-coordinates}$ $x_1<x_2<\dots <x_n$ (see fig. 2) by the symbol $A_J\left(\mathrm{\Theta }\right)=A_{j_1}\left({\theta }_1\right)\cdots A_{j_n}\left({\theta }_n\right),$ where $\mathrm{\Theta }=({\theta }_1,\dots ,{\theta }_n)$ and $J=(j_1,\dots ,j_n)$ are the corresponding sets of the angles and the colours $(-\pi /2<{\theta }_k<\pi /2,1\le j_k\le N)\text{.}$ Owing to property (c) the previous or subsequent changes of a set of particles depend only on its symbol $A_J\left(\mathrm{\Theta }\right)$ (on the colours, angles and on the order of $x\text{-coordinates}$ only). Given $A_I\left(\mathrm{\Theta }\prime \right)$ one has $$\begin{array}{cc}{A}_I{\left(\mathrm{\Theta }\prime \right)}_{\text{in}}=\sum _J{S}_I^J(\mathrm{\Theta },\mathrm{\Theta }\prime )A_J{\left(\mathrm{\Theta }\right)}_{\text{out}}& \text{(1)}\end{array}$$ for some $I=(i_1,\cdots ,i_n),$ $\mathrm{\Theta }\prime =({\theta }_1^{\prime },\cdots ,{\theta }_n^{\prime })$ describing the set of particles $t=t_0^{\prime }<t_0\text{.}$ We have expressed $A_I\left(\mathrm{\Theta }\prime \right)$ considered as an in-state in terms out-states. Every (scalar) coefficient $S_I^J$ is the $S\text{-matrix}$ element (the amplitude) from $A_I\left(\mathrm{\Theta }\prime \right)$ to $A_J\left(\mathrm{\Theta }\right)$ (by definition). Here $I$ and $J$ can be arbitrary $(1\le i_k,j_k\le N)$ but not the set $\mathrm{\Theta }\prime \text{.}$ The $S\text{-matrix}$ is nontrivial only if $$\begin{array}{cc}\mathrm{\Theta }\prime =w\left(\mathrm{\Theta }\right)=({\theta }_{w^{-1}\left(1\right)},{\theta }_{w^{-1}\left(2\right)},\cdots {\theta }_{w^{-1}\left(n\right)})& \text{(2)}\end{array}$$ for an appropriate permutation $w$ from the symmeric group $S_n\text{.}$

In this formula some misunderstanding is possible. I will comment on it. Any permutation $w:(1,2,\dots ,n)\to (1\prime ,2\prime ,\cdots ,n\prime )$ acts on an ordered set $s=(x,y,z,\cdots ,)$ of some elements (e.g. coordinates) by the substitution the element at place No. $i$ for the element at place No. $i\prime \text{.}$ For example, the transposition $w=\left(12\right):(1,2,3,\cdots ,n)\to 21$ interchanges the content of the first and second places. This definition results in the natural formula $v\left(w\left(s\right)\right)=(v·w)\left(s\right),$ $w,v\in S_n\text{.}$ We see that $w^{-1}$ is necessary in the second equality of (2). In fig. 4 the corresponding $w$ is equal to $(4,5,1,3,2)$ in the one-line notations or $\genfrac{}{}{0ex}{}{1\hspace{0.17em}2\hspace{0.17em}3\hspace{0.17em}4\hspace{0.17em}5}{4\hspace{0.17em}5\hspace{0.17em}1\hspace{0.17em}3\hspace{0.17em}2}$ in the two-line notation, i.e. takes $\left(1\hspace{0.17em}2\hspace{0.17em}3\hspace{0.17em}4\hspace{0.17em}5\right)$ to $\left(3\hspace{0.17em}5\hspace{0.17em}4\hspace{0.17em}1\hspace{0.17em}2\right)\text{;}$ $w^{-1}=\left(\genfrac{}{}{0ex}{}{1\hspace{0.17em}2\hspace{0.17em}3\hspace{0.17em}4\hspace{0.17em}5}{3\hspace{0.17em}5\hspace{0.17em}4\hspace{0.17em}1\hspace{0.17em}2}\right)=(3,5,4,1,2)\text{.}$

Let us discuss examples. We will omit the indications "in" and "out". One has for $n=2$ and ${\theta }_1<{\theta }_2,$ ${\theta }_1^{\prime }={\theta }_2,$ ${\theta }_2^{\prime }={\theta }_1\text{:}$ $$\begin{array}{cc}{A}_{i_1}\left({\theta }_2\right)A_{i_2}\left({\theta }_1\right)=\sum _{i_1,i_2}{S}_{i_1{i}_2}^{j_1{j}_2}\left({\theta }_{12}\right)A_{j_1}\left({\theta }_1\right)A_{j_2}\left({\theta }_2\right),& \text{(3)}\end{array}$$ where ${\theta }_{ij}={\theta }_i-{\theta }_j$ by definition. Given $I=(i_1,i_2,i_3),$ $J=(j_1,j_2,j_3)$ in the case of fig. 3a we obtain the following relations: $$\begin{array}{ccc}{A}_{i_1}\left({\theta }_3\right)A_{i_2}\left({\theta }_2\right)A_{i_3}\left({\theta }_1\right)& =& \sum S_{i_2{i}_3}^{k_2{k}_3}\left({\theta }_{12}\right)A_{i_1}\left({\theta }_3\right)A_{k_2}\left({\theta }_1\right)A_{k_3}\left({\theta }_2\right)\\ & =& \sum S_{i_2{i}_3}^{k_2{k}_3}\left({\theta }_{12}\right)S_{i_1{k}_2}^{j_1{\ell }_2}\left({\theta }_{13}\right)A_{j_1}\left({\theta }_1\right)A_{{\ell }_2}\left({\theta }_3\right)A_{k_3}\left({\theta }_2\right)\\ & =& \sum S_{i_2{i}_3}^{k_2{k}_3}\left({\theta }_{12}\right)S_{i_1{k}_2}^{j_1{l}_2}\left({\theta }_{13}\right)S_{l_2{k}_3}^{j_2{j}_3}\left({\theta }_{23}\right)A_J\left(\mathrm{\Theta }\right),\end{array}$$ where the sum is over all free indices $(j_1,j_2,j_3,k_2,k_3,l_2)\text{.}$ The analogical calculation for fig. 3b should give the same result. We arrive at the identity: $$\begin{array}{cc}\sum _{k_2,k_3,{\ell }_2}{S}_{i_2{i}_3}^{k_2{k}_3}\left({\theta }_{12}\right)S_{i_1{k}_2}^{j_1{l}_2}\left({\theta }_{13}\right)S_{l_2{k}_3}^{j_2{j}_3}\left({\theta }_{23}\right)=\sum _{k_1,k_2,l_2}{S}_{i_1{i}_2}^{k_1{k}_2}\left({\theta }_{23}\right)S_{k_2{i}_3}^{l_2{j}_3}\left({\theta }_{13}\right)S_{k_1{l}_2}^{j_1{j}_2}\left({\theta }_{12}\right)& \text{(4)}\end{array}$$

Let us rewrite (4) in a tensor form. We will keep the following notations. Let us consider "multi-matrices" $T=\left(T_{i_1\hspace{0.17em}{i}_2\hspace{0.17em}\cdots \hspace{0.17em}{i}_n}^{j_1\hspace{0.17em}{j}_2\hspace{0.17em}\cdots \hspace{0.17em}{j}_n}\right)$ with the multi-indices $I=(i_1,\cdots ,i_n),$ $J=(j_1,\cdots ,j_n),$ respectively, of rows and columns $\text{(}1\le i_k,j_k\le N$ for $1\le k\le n\text{).}$ These $T$ act on "multi-vectors" $x=\left(x_{i_1{i}_2\cdots i_n}\right)$ by the natural formula $Tx=\left({\sum }_J{T}_I^J{x}_J\right)\text{.}$ If multi-indices are assumed to be (lexicographically) ordered then $x$ and $T$ are usual vectors and matrices for ${ℂ}^{N^n}$ in place of ${ℂ}^N\text{.}$ Given two $N\times N\text{-matrices}$ $X=\left(X_i^j\right),$ $Y=\left(Y_i^j\right)$ (from the matrix algebra $M_N\text{)}$ one can define the tensor product $T=X\otimes Y:$ $T=\left(T_{i_1\hspace{0.17em}{i}_2}^{j_1\hspace{0.17em}{j}_2}\right),$ $T_{i_1\hspace{0.17em}{i}_2}^{j_1\hspace{0.17em}{j}_2}=X_{i_1}^{j_1}{Y}_{i_2}^{j_2}\text{.}$ The definition of $X\otimes Y\otimes Z\otimes \cdots$ is quite analogous.

Later on, ${\delta }_i^j$ will be the Kronecker symbol. Put $$\begin{array}{ccc}{}^{k}X& =& \left(\prod _{m\ne k}{\delta }_{i_m}^{j_m}\right)X_{i_k}^{j_k},\\ {}^{kl}T& =& \left(\prod _{m\ne k,l}{\delta }_{i_m}^{j_m}\right)T_{i_k{i}_l}^{j_k{j}_l}& \text{(5)}\end{array}$$ for $X=\left(X_i^j\right),$ $T=\left(T_{i_1{i}_2}^{j_1{j}_2}\right),$ $1\le k\ne l\le n,$ $1\le m\le n\text{.}$ These matrices are the natural images of $X,T$ in the $M_N^{\text{<mo>⊗</mo><mi>n</mi>}}=M_{N^n}$ with respect to the indices $k$ and $(k,l)\text{.}$ Note that ${}^{kl}(X\otimes Y)={}^k{X}^{l}Y$ and ${}^{k}X$ commutes with ${}^{l}Y$ for any $X,Y\in M_N,$ $k\ne l\text{.}$

Let us introduce $S\left(\theta \right)$ as the following matrix (depending on $\theta ={\theta }_{12}\text{)}$ from $M_N^{\otimes 2}:S=\left(S_{i_1\hspace{0.17em}{i}_2}^{j_1\hspace{0.17em}{j}_2}\left(\theta \right)\right)\text{.}$ Now one can represent (4) in the elegant form: $$\begin{array}{cc}{}^{23}S\left({\theta }_{12}\right){}^{12}S\left({\theta }_{13}\right){}^{23}S\left({\theta }_{23}\right)={}^{12}S\left({\theta }_{23}\right){}^{23}S\left({\theta }_{13}\right){}^{12}S\left({\theta }_{12}\right)\text{.}& \text{(6)}\end{array}$$ If we put $S\left(\theta \right)=PR\left(\theta \right)$ for $$\begin{array}{cc}P=\left(P_{i_1\hspace{0.17em}{i}_2}^{j_1\hspace{0.17em}{j}_2}\right),P_{i_1\hspace{0.17em}{i}_2}^{j_1\hspace{0.17em}{j}_2}={\delta }_{i_1}^{j_2}{\delta }_{i_2}^{j_1}& \text{(7)}\end{array}$$ we get the Yang-Baxter equation $$\begin{array}{cc}$ {}^{12}$R\left({\theta }_{12}\right)$ {}^{13}$R\left({\theta }_{13}\right)$ {}^{23}$R\left({\theta }_{23}\right)=$ {}^{23}$R\left({\theta }_{23}\right)$ {}^{13}$R\left({\theta }_{13}\right)$ {}^{12}$R\left({\theta }_{12}\right)\text{.}& \text{(8)}\end{array}$$ To check it (to deduce it from (6)) one should carry all the ${}^{12}P,{}^{23}P$ across the other terms in (6) after the substitution $S=PR\text{.}$ Here we have to use the following properties of $P\text{:}$ $$\begin{array}{cc}{}^{23}P{}^{12}P{}^{23}P={}^{12}P{}^{23}P{}^{12}P,& \text{(9a)}\\ {}^{12}P{}^{1}X={}^{2}X{}^{12}P\text{for}X\in M_N\text{.}& \text{(9b)}\end{array}$$ It is easy either to prove (9) directly or verify them without matrix calculations using the following natural interpretation of ${}^{ij}P\text{.}$

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