|
|
|
MATH 731: Seminar
in Noncommutative Algebra and Geometry II (Fall 2004)
Instructor:
Yuri Berest
Meeting
Time & Room
NOTE: The first lecture will be on Wednesday, September 1.
This is a continuation of our seminar on noncommutative algebra and geometry
started in Fall 2003. The purpose of the seminar to study a variety of
topics from homological algebra and algebraic geometry which find applications
in modern mathematical physics. In particular, we plan to give a (more
or less) faithful introduction to A_{\infinity}-structures (including
A_{\infinity}-categories which are at the heart of a homological approach
to Kontsevich's mirror symmetry conjecture) as well as to the theory of
triangulated (derived) categories and derived equivalences.
We will try to make the discussion understandable for graduate students
with various backgrounds and will not assume the knowledge of the material
discussed in the first part of the seminar.
Some references:
1. M.Kontsevich, "Triangulated Categories and Geometry", lecture
notes, IHES, 1998
2. B.Keller, "Introduction to $A$-infinity algebras and modules.
Homology Homotopy Appl. 3(1) (2001), 1-35.
3. V.Ginzburg, "Lectures on Noncommutative Geometry", book in
preparation, Chicago 2002..
Last modified:
August 23, 2004
|
