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==Algebraic Knot Theory== |
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===Department of Mathematics, University of Toronto, Fall 2009=== |
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{{AKT-09/Crucial Information}} |
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===Further Resources=== |
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* [http://www.math.toronto.edu/graduate/ Graduate Studies] at the [http://www.math.toronto.edu/ UofT Math Department]. In particular, [http://www.math.toronto.edu/graduate/courses/descriptions.html Graduate Course Descriptions]. |
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* Past Knot Theory classes I have taught: |
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** [[07-1352|Math 1352S - Knot Theory]] in Spring 2007. |
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** [[06-1350|Math 1350F - Knot Theory]] in Fall 2006. |
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** {{Home Link|classes/0304/KnotTheory|Math 1350F - Knot Theory}} in Fall 2003. |
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** {{Home Link|classes/0102/KnotTheory|Seminar on Knot Theory}} in Spring 2002. |
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** {{Home Link|classes/0102/FeynmanDiagrams|Knots and Feynman Diagrams}} in Fall 2001. |
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** {{Home Link|classes/0001/KnotTheory|Knot Theory}} in Spring 2001. |
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[[Image:AKTLogo.png|center|450px]] |
Latest revision as of 18:15, 7 September 2009
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Week of...
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Videos, Notes, and Links
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1
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Sep 7
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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
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Sep 14
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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.
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3
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Sep 21
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090922: FI, 4T, HOMFLY and FI and 4T, statement of the Fundamental Theorem, framed knots. 090924-1: Some dimensions of , is a commutative algebra, . Class Photo 090924-2: is a co-commutative algebra, the relation with products of invariants, is a bi-algebra.
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4
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Sep 28
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Homework Assignment 1 Homework Assignment 1 Solutions 090929: The Milnor-Moore theorem, primitives, the map . 091001-1: Jacobi diagrams, AS, IHX, STU, and the equivalence of all that with 4T. 091001-2: The very basics on Lie algebras.
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5
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Oct 5
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091006: Lie algebraic weight systems, . 091008-1: More on , Lie algebras and the four colour theorem. 091008-2: The "abstract tenssor" approach to weight systems, and PBW, the map .
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Oct 12
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091013: Algebraic properties of vs. algebraic properties of . Thursday's class canceled.
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Oct 19
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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.
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Oct 26
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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).
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Nov 2
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091103: The details of . 091105-1: Three basic problems: genus, unknotting numbers, ribbon knots. 091105-2: The three basic problems and algebraic knot theory.
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10
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Nov 9
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091110: Tangles and planar algebras, shielding and the generators of KTG. Homework Assignment 3 No Thursday class.
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Nov 16
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Local Khovanov Homology 091119-1: Local Khovanov homology, I. 091119-2: Local Khovanov homology, II.
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Nov 23
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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.
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Nov 30
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091201: The relations in KTG. 091203-1: The Existence of the Exponential Function. 091203-2: The Final Exam, Dror's failures.
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F
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Dec 7
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The Final Exam on Thu Dec 10, 9-11, Bahen 6183.
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Register of Good Deeds / To Do List
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Add your name / see who's in!
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Algebraic Knot Theory
Department of Mathematics, University of Toronto, Fall 2009
Agenda: Understand "(u, v, and w knots) x (topology, combinatorics, low algebra, and high algebra)". Understand the promise and the difficulty of the not-yet-existant "Algebraic Knot Theory".
Instructor: Dror Bar-Natan, drorbn@math.toronto.edu, Bahen 6178, 416-946-5438. Office hours: by appointment.
Classes: Tuesdays 10-11 in 215 Huron room 1018 and Thursdays 9-11 in Bahen 6183.
Further Resources