June 8 (Sat), 2019 11:30--12:30, 15:20--16:20 Lecture Hall (Room No. 420) Research Institute for Mathematical Sciences Kyoto University, Kyoto, Japan |
Abstract
Infinite-dimensional Lie algebras (such as Kac-Moody, Virasoro etc.)
govern, in many ways, various moduli spaces associated to algebraic curves.
To pass from curves to higher-dimensional varieties, it is necessary to work
in the setup of derived geometry. This is because many feature of the classical
theory seem to disappear in higher dimensions but can be recovered in the
derived (cohomological) framework.
The lectures will consist of 3 parts:
(1) Review of derived geometry and of the phenomenon of "recovery of missing features".
(2) The derived analog of the field of Laurent series in n variables ("with poles at
a single point"). The corresponding higher current algebras and their relation
to derived moduli spaces of G-bundles (based on joint work with G. Faonte and B. Hennion).
(3) Derived Lie algebras of vector fields, their central extensions and cohomology.
Role of factorization algebras in studying such cohomology (based on joint work
with B. Hennion).