Iwahori-Hecke algebra of a Coxeter group

Definition

Let ${\displaystyle G}$ be a Coxeter group with Coxeter presentation:

${\displaystyle G:=⟨s_1,s_2,\dots ,s_n\mid (s_i{s}_j{)}^{m_{ij}}⟩}$

where ${\displaystyle m_{ij}=m_{ji}}$ and ${\displaystyle m_{ii}=2}$. The Iwahori-Hecke algebra of ${\displaystyle G}$ over a ring ${\displaystyle R}$ is defined as the ${\displaystyle R[q]}$-algebra (for an indeterminate ${\displaystyle q}$) generated by ${\displaystyle T_1,T_2,\dots ,T_n}$ with the following relations:

${\displaystyle (T_i-q)(T_i+1)=0}$

and the Artin braid relations:

${\displaystyle T_i{T}_j\dots =T_j{T}_i\dots }$,

where the length of both sides is ${\displaystyle m_{ij}}$. If ${\displaystyle m_{ij}}$ is even, the left side ends with ${\displaystyle T_j}$ and the right side ends with ${\displaystyle T_i}$. Otherwise, the left side ends with ${\displaystyle T_i}$ and the right side ends with ${\displaystyle T_j}$.

For specific choices of ${\displaystyle q\in R}$, we get a ${\displaystyle R}$-algebra. When ${\displaystyle q=1}$, we get the group ring of ${\displaystyle G}$ over ${\displaystyle R}$. To distinguish itself from the algebras obtained by setting particular values of ${\displaystyle q}$, the Iwahori-Hecke algebra is also sometimes termed the generic Hecke algebra.