“Bulletin Board”

 School of Mathematics - July 10, 2006

Short Course

Introduction to Cyclic Cohomology
Masoud Khalkhali
University of Western Ontario
London, Ontario, Canada

 
 

Introduction to Cyclic Cohomology
Masoud Khalkhali
University of Western Ontario
London, Ontario, Canada



Abstract
Cyclic cohomology was discovered by Alain Connes in early 1980's. It is the right noncommutative analogue of de Rham homology of currents on smooth manifolds. Since its inception, cyclic cohomology (and homology) have proved to be an indispensable tool in noncommutative geometry and its applications. In this series of 12 lectures, we plan to cover most of what is known about cyclic cohomology and some of its applications. The lectures will be self contained and will start at a fairly basic level. Some familiarity with graduate level algebraic topology, functional analysis, and differential geometry will be useful. Topics will include:
1. Quantization of differential and integral calculus; cyclic cocycles
2. Hochschild cohomology and homology; applications to deformation theory
3. From cyclic cocycles to cyclic cohomology and homology
4. Where cyclic cocycles come from?
5. Chern-Connes character and pairing with K-theory
6. Examples of computations of cyclic cohomology: smooth manifolds, group algebras,
noncommutative tori,
7. Applications

Time:Aug. 12-17, 10:00-12:00
Place:Lecture Hall, Niavaran Bldg., Niavaran Sqr., Tehran, Iran
 
 
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