07-1352/Class Notes for January 23

A HOMFLY Braidor

The Algebra

Let ${\displaystyle A_{n}^{0}=\langle S_{n},x,t_{1},\ldots t_{n}\rangle }$ be the free associative (but non-commutative) algebra generated by the elements of the symmetric group ${\displaystyle S_{n}}$ on ${\displaystyle \{1,\ldots ,n\}}$ and by formal variables ${\displaystyle x}$ and ${\displaystyle t_{1}\ldots t_{n}}$, and let ${\displaystyle A_{n}^{1}}$ be the quotient of ${\displaystyle A_{n}^{0}}$ by the following "HOMFLY" relations:

1. ${\displaystyle x}$ commutes with everything else.
2. The product of permutations is as in the symmetric group ${\displaystyle S_{n}}$.
3. If ${\displaystyle \sigma }$ is a permutation then ${\displaystyle t_{i}\sigma =\sigma t_{\sigma i}}$.
4. ${\displaystyle [t_{i},t_{j}]=x\sigma _{ij}(t_{j}-t_{i})}$, where ${\displaystyle \sigma _{ij}}$ is the transposition of ${\displaystyle i}$ and ${\displaystyle j}$.

Finally, declare that ${\displaystyle \deg x=\deg t_{i}=1}$ while ${\displaystyle \deg \sigma =0}$ for every ${\displaystyle 1\leq i\leq n}$ and every ${\displaystyle \sigma \in S_{n}}$, and let ${\displaystyle A_{n}}$ be the graded completion of ${\displaystyle A_{n}^{1}}$.

We say that an element of ${\displaystyle A_{n}}$ is "sorted" if it is written in the form ${\displaystyle x^{k}t_{1}^{k_{1}}t_{2}^{k_{2}}\cdots t_{n}^{k_{n}}\cdot \sigma }$ where ${\displaystyle \sigma }$ is a permutation and ${\displaystyle k}$ and the ${\displaystyle k_{i}}$'s are all non-negative integer. The HOMFLY relations imply that every element of ${\displaystyle A_{n}}$ is a linear combinations of sorted elements. Thus as a vector space, ${\displaystyle A_{n}}$ can be identified with the ring ${\displaystyle B_{n}}$ of power series in the variables ${\displaystyle x,t_{1},\ldots ,t_{n}}$ tensored with the group ring of ${\displaystyle S_{n}}$. The product of ${\displaystyle A_{n}}$ is of course very different than that of ${\displaystyle B_{n}}$.

The Equations

The Equations in Functional Form

A Solution