07-1352/Suggested Topics for Student Lectures: Difference between revisions
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| The Melvin-Morton-Rozansky (ex-)Conjecture. |
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Latest revision as of 10:04, 20 March 2007
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The Choices | |
Karene | |
Siddarth | The Melvin-Morton-Rozansky (ex-)Conjecture. |
Zavosh | Knot Floer homology |
Zsuzsi | Vogel's universal algebra |
Students must choose their lecture topics in coordination with Dror, and the sooner this is done, the better.
- More on Chern-Simons theory, Feynman diagrams and configuration space integrals.
- More on the Milnor Moore Theorem.
- Explicit computations for torus knots, Hopf chains, etc.
- Higher skein modules following Andersen and Turaev, arXiv:math.GT/9812071.
- Homotopy invariants of links.
- Vassiliev invariants for braids.
- Goussarov's "interdependent modifications".
- The Melvin-Morton-Rozansky (ex-)Conjecture.
- Finite type invariants of 3-manifolds.
- The LMO invariant and the Århus integral.
- Hutchings' step by step integration.
- The exceptional Lie algebras and finite type invariants.
- More on the self-linking number.
- BF theories.
- Finite type invariants of other kinds of objects (Legendrian and transverse knots, planar curves, etc.).
- Gropes and grope cobordism.
- The Lie algebra and the Alexander polynomial.
- Gauss diagram formulas.
- Claspers and clovers.
- The Kalfagianni - Lin papers on Seifert surfaces and Vassiliev invariants.
- Rozansky-Witten theory.
- A detailed study of following Kneissler.
- Rozansky's rationality (ex-)conjecture.
- "Detecting Knot Invertibility" following Kuperberg.
- Multiple -numbers and the Drinfel'd associator.
- "Uniqueness" of a well-behaved universal finite type invariant.
- Finite type invariants not coming from Lie algebras, following Vogel and Lieberum.
- The group of knots modulo -equivalence.
- Vogel's "universal Lie Algebra".
- Anything else from VasBib.
- Anything else from anywhere else.