Symmetric groups, Iwahori-Hecke algebras and knot invariants
Speaker(s): Christian Kassel
Time: April 7 - April 27, 2011
Venue: Room 1328 at BICMR, Resource Plaza, Peking University
Title: Symmetric groups, Iwahori-Hecke algebras and knot invariants
Lecturer: Christian Kassel
Date: April 7 - 27, 2011
Time: Every Thursday, 9:00 am to 12:00 am
Place: Room 1328 at BICMR, Resource Plaza, Peking University
Abstract: We will underline two aspects of quantum groups, namely a representation-theoretic aspect and a topological aspect, by concentrating on Iwahori-Hecke algebras, which form an important class of finite-dimensional associative algebras. We start the lectures by giving a simple combinatorial construction of representations of the symmetric groups using partitions, Young diagrams and standard tableaux. We next show that these representations can be quantized into representation of Iwahori-Hecke algebras: this involves a parameter q. We finally give a short introduction to knot theory and show how to construct topological invariants of knots with the help of Iwahori-Hecke algebras.
Plan:
1. The combinatorics of partitions and Young diagrams
- - partitions, diagrams, a Heisenberg relation
- - linear algebra on standard tableaux and construction of representations of the symmetric groups
- - (if time permits) proof that these representations are irreducible and we obtain all of them
2. Quantization
- - one-parameter deformation of the previous representations
- - Iwahori-Hecke algebras: definition
3. Introduction to knot theory
- - knots, links and the classification problem
- - braid groups and relation to links and to Iwahori-Hecke algebras
- - a method to construct topological invariants from representation theory
4. Construction of the Jones polynomial, a famous knot invariant
- - basis for Iwahori-Hecke algebras
- - construction of Markov traces
- - the Jones polynomial