Top Global Course Special Lectures by Prof. Boris Feigin
Top Global Course Special Lectures by Prof. Boris Feigin (Kyoto University / Landau Institute for Theoretical Physics) will take place as follows:
 Course Title
 Top Global Course Special Lectures 4
 Date & Time
 14:4517:15 on Monday, July 10 to Friday, July 14, 2017
 Venue
 127 Conference room, Faculty of Science Bldg. #3, Kyoto University
 Title
 Walgebras  introduction, screenings and quantum groups
 Abstract
 Sometimes people use the words vertex operator algebra and Walgebra as synonyms. This is partly correct, but not entirely. Theory of Walgebras is a collection of extremely interesting examples of new algebraic objects and theory of vertex algebra is an attempt to understand and find some order in this zoo.

Our lectures are the introduction  so we concentrate on examples and simplest methods of constructing the Walgebras. Note that Walgebras are deeply connected with 2dimensional conformal field theory. So it is not possible to talk about Walgebras and do not mention some facts from the algebraic geometry of the curves.

This short course consists of an introduction to random dynamical systems, from a predominantly geometric point of view. The aim is to introduce basic concepts in the context of simple examples. We will discuss some elementary results and highlight open questions.

 1. Clifford algebra, Lattice vertex operator algebras.
 2. Coinvariants and vertex operators.
 3. Subalgebras in lattice vertex algebras. Screenings. Quantum groups and screenings.
 4. Fermionic screenings. Algebra $\widehat{\mathfrak{sl}}(2)$ on a critical level.
 5. Deformation of universal enveloping of the Lie algebra of differential operators on the circle.
 6. Plane partitions and Walgebras. (something about recent progress)
 No particular knowledge on representation theory is required.
 Language
 English
 Note
 This series of lectures will be videorecorded and made available online.
Please note that anyone in the front rows of the room can be captured by a video camera.