AKT-09/HW1

DBN: Classes: 2009-10: AKT-09/Navigation # Week of... Videos, Notes, and Links 1 Sep 7 About This Class  090910-1: 3-colourings, Reidemeister's theorem, invariance, the Kauffman bracket.  090910-2: R23 invariance of the bracket, R1, the writhe, the Jones polynomial, programming the Jones polynomial. Tricolourability 2 Sep 14  090915: More on Jones, some pathologies and more on Reidemeister, our overall agenda.  090917-1: The definition of finite type, weight systems, Jones is a finite type series.  090917-2: The skein relation for Jones; HOMFLY-PT and Conway; the weight system of Jones. 3 Sep 21  090922: FI, 4T, HOMFLY and FI and 4T, statement of the Fundamental Theorem, framed knots.  090924-1: Some dimensions of ${\displaystyle {\mathcal {A}}_{n}}$, ${\displaystyle {\mathcal {A}}}$ is a commutative algebra, ${\displaystyle {\mathcal {A}}(\bigcirc )\equiv {\mathcal {A}}(\uparrow )}$. Class Photo  090924-2: ${\displaystyle {\mathcal {A}}}$ is a co-commutative algebra, the relation with products of invariants, ${\displaystyle {\mathcal {A}}}$ is a bi-algebra. 4 Sep 28 Homework Assignment 1 Homework Assignment 1 Solutions  090929: The Milnor-Moore theorem, primitives, the map ${\displaystyle {\mathcal {A}}^{r}\to {\mathcal {A}}}$.  091001-1: Jacobi diagrams, AS, IHX, STU, and the equivalence of all that with 4T.  091001-2: The very basics on Lie algebras. 5 Oct 5  091006: Lie algebraic weight systems, ${\displaystyle gl_{N}}$.  091008-1: More on ${\displaystyle gl_{N}}$, Lie algebras and the four colour theorem.  091008-2: The "abstract tenssor" approach to weight systems, ${\displaystyle {\mathcal {U}}({\mathfrak {g}})}$ and PBW, the map ${\displaystyle {\mathcal {T}}_{\mathfrak {g}}}$. 6 Oct 12  091013: Algebraic properties of ${\displaystyle {\mathcal {U}}({\mathfrak {g}})}$ vs. algebraic properties of ${\displaystyle {\mathcal {A}}}$. Thursday's class canceled. 7 Oct 19  091020: Universal finite type invariants, filtered and graded spaces, expansions. Homework Assignment 2 The Stonehenge Story  091022-1: The Stonehenge Story to IHX and STU.  091022-2: The Stonhenge Story: anomalies, framings, relation with physics. 8 Oct 26  091027: Knotted trivalent graphs and their chord diagrams.  091029-1: Zsuzsi Dancso on the Kontsevich Integral (1).  091029-2: Zsuzsi Dancso on the Kontsevich Integral (2). 9 Nov 2  091103: The details of ${\displaystyle {\mathcal {A}}^{TG}}$.  091105-1: Three basic problems: genus, unknotting numbers, ribbon knots.  091105-2: The three basic problems and algebraic knot theory. 10 Nov 9  091110: Tangles and planar algebras, shielding and the generators of KTG. Homework Assignment 3 No Thursday class. 11 Nov 16 Local Khovanov Homology  091119-1: Local Khovanov homology, I.  091119-2: Local Khovanov homology, II. 12 Nov 23  091124: Emulation of one structure inside another, deriving the pentagon.  091126-1: Peter Lee on braided monoidal categories, I.  091126-2: Peter Lee on braided monoidal categories, II. 13 Nov 30  091201: The relations in KTG.  091203-1: The Existence of the Exponential Function.  091203-2: The Final Exam, Dror's failures. F Dec 7 The Final Exam on Thu Dec 10, 9-11, Bahen 6183. Register of Good Deeds / To Do List Add your name / see who's in!

Solve the following problems and submit them in class by October 13, 2006:

Problem 1. If ${\displaystyle f\in {\mathcal {V}}_{n}}$ and ${\displaystyle g\in {\mathcal {V}}_{m}}$ then ${\displaystyle f\cdot g\in {\mathcal {V}}_{n+m}}$ (as what one would expect by looking at degrees of polynomials) and ${\displaystyle W_{f\cdot g}=m_{\mathbb {Q} }\circ (W_{f}\otimes W_{g})\circ \Delta }$ where ${\displaystyle (W_{f}\otimes W_{g})\circ \Delta :{\mathcal {A}}\rightarrow \mathbb {Q} \otimes \mathbb {Q} }$ and ${\displaystyle m_{\mathbb {Q} }}$ is the multiplication of rationals. (See 090924-2, minute 36:01).

Problem 2. Let ${\displaystyle \Theta :{\mathcal {A}}\to {\mathcal {A}}}$ be the multiplication operator by the 1-chord diagram ${\displaystyle \theta }$, and let ${\displaystyle \partial _{\theta }={\frac {d}{d\theta }}}$ be the adjoint of multiplication by ${\displaystyle W_{\theta }}$ on ${\displaystyle {\mathcal {A}}^{\star }}$, where ${\displaystyle W_{\theta }}$ is the obvious dual of ${\displaystyle \theta }$ in ${\displaystyle {\mathcal {A}}^{\star }}$. Let ${\displaystyle P:{\mathcal {A}}\to {\mathcal {A}}}$ be defined by

${\displaystyle P=\sum _{n=0}^{\infty }{\frac {(-\Theta )^{n}}{n!}}\partial _{\theta }^{n}.}$

Verify the following assertions, but submit only your work on assertions 4,5,7,11:

1. ${\displaystyle \left[\partial _{\theta },\Theta \right]=1}$, where ${\displaystyle 1:{\mathcal {A}}\to {\mathcal {A}}}$ is the identity map and where ${\displaystyle [A,B]:=AB-BA}$ for any two operators.
2. ${\displaystyle P}$ is a degree ${\displaystyle 0}$ operator; that is, ${\displaystyle \deg Pa=\deg a}$ for all ${\displaystyle a\in {\mathcal {A}}}$.
3. ${\displaystyle \partial _{\theta }}$ satisfies Leibnitz' law: ${\displaystyle \partial _{\theta }(ab)=(\partial _{\theta }a)b+a(\partial _{\theta }b)}$ for any ${\displaystyle a,b\in {\mathcal {A}}}$.
4. ${\displaystyle P}$ is an algebra morphism: ${\displaystyle P1=1}$ and ${\displaystyle P(ab)=(Pa)(Pb)}$.
5. ${\displaystyle \Theta }$ satisfies the co-Leibnitz law: ${\displaystyle \Box \circ \Theta =(\Theta \otimes 1+1\otimes \Theta )\circ \Box }$ (why does this deserve the name "the co-Leibnitz law"?).
6. ${\displaystyle P}$ is a co-algebra morphism: ${\displaystyle \eta \circ P=\eta }$ (where ${\displaystyle \eta }$ is the co-unit of ${\displaystyle {\mathcal {A}}}$) and ${\displaystyle \Box \circ P=(P\otimes P)\circ \Box }$.
7. ${\displaystyle P\theta =0}$ and hence ${\displaystyle P\langle \theta \rangle =0}$, where ${\displaystyle \langle \theta \rangle }$ is the ideal generated by ${\displaystyle \theta }$ in the algebra ${\displaystyle {\mathcal {A}}}$.
8. If ${\displaystyle Q:{\mathcal {A}}\to {\mathcal {A}}}$ is defined by ${\displaystyle Q=\sum _{n=0}^{\infty }{\frac {(-\Theta )^{n}}{(n+1)!}}\partial _{\theta }^{(n+1)}}$ then ${\displaystyle a=\theta Qa+Pa}$ for all ${\displaystyle a\in {\mathcal {A}}}$.
9. ${\displaystyle \ker P=\langle \theta \rangle }$.
10. ${\displaystyle P}$ descends to a Hopf algebra morphism ${\displaystyle {\mathcal {A}}^{r}\to {\mathcal {A}}}$, and if ${\displaystyle \pi :{\mathcal {A}}\to {\mathcal {A}}^{r}}$ is the obvious projection, then ${\displaystyle \pi \circ P}$ is the identity of ${\displaystyle {\mathcal {A}}^{r}}$. (Recall that ${\displaystyle {\mathcal {A}}^{r}={\mathcal {A}}/\langle \theta \rangle }$).
11. ${\displaystyle P^{2}=P}$.

Idea for a good deed. Later than October 13, prepare a beautiful TeX writeup (including the motivation and all the details) of the solution of this assignment for publication on the web. For all I know this information in this form is not available elsewhere.

Mandatory but unenforced. Find yourself in the class photo and identify yourself as explained in the photo page.