November 20, 2019
4:15PM - 5:15PM
Math Tower 154
Add to Calendar
2019-11-20 17:15:00
2019-11-20 18:15:00
Reps Seminar - Matt Rupert
Title: Unrolled Quantum Groups and Vertex Operator Algebras
Speaker: Matt Rupert - University of Alberta
Abstract: It was shown by Kazhdan and Lusztig in the 1990s that there exists a braided equivalence between module categories of affine Lie algebras and corresponding quantum groups. These module categories for affine Lie algebras were later realized as module categories over certain rational vertex operator algebras. In this talk I will discuss a correspondence between modules categories of the unrolled restricted quantum group of sl2 at even root of unity and the singlet vertex operator algebra, and how to use this correspondence to construct braided tensor categories related to the Bp vertex operator algebras.
Seminar Link
Math Tower 154
OSU ASC Drupal 8
ascwebservices@osu.edu
America/New_York
public
Date Range
Add to Calendar
2019-11-20 16:15:00
2019-11-20 17:15:00
Reps Seminar - Matt Rupert
Title: Unrolled Quantum Groups and Vertex Operator Algebras
Speaker: Matt Rupert - University of Alberta
Abstract: It was shown by Kazhdan and Lusztig in the 1990s that there exists a braided equivalence between module categories of affine Lie algebras and corresponding quantum groups. These module categories for affine Lie algebras were later realized as module categories over certain rational vertex operator algebras. In this talk I will discuss a correspondence between modules categories of the unrolled restricted quantum group of sl2 at even root of unity and the singlet vertex operator algebra, and how to use this correspondence to construct braided tensor categories related to the Bp vertex operator algebras.
Seminar Link
Math Tower 154
Department of Mathematics
math@osu.edu
America/New_York
public
Title: Unrolled Quantum Groups and Vertex Operator Algebras
Speaker: Matt Rupert - University of Alberta
Abstract: It was shown by Kazhdan and Lusztig in the 1990s that there exists a braided equivalence between module categories of affine Lie algebras and corresponding quantum groups. These module categories for affine Lie algebras were later realized as module categories over certain rational vertex operator algebras. In this talk I will discuss a correspondence between modules categories of the unrolled restricted quantum group of sl2 at even root of unity and the singlet vertex operator algebra, and how to use this correspondence to construct braided tensor categories related to the Bp vertex operator algebras.