January 23, 2019
4:15PM - 5:15PM
Math Tower 154
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2019-01-23 17:15:00
2019-01-23 18:15:00
Reps Seminar - Sachin Gautam
Title: Tensor structures on representations of Yangians
Speaker: Sachin Gautam (Ohio State University)
Abstract: In this talk I will go over the definition of the Yangian as an associative algebra, and two seemingly different ways to tensor its representations. I will present a method of constructing the unique twist which conjugates one tensor product to the other, based on the existence/uniqueness results for the solutions of PDEs near non-singular points. I will also show one very explicit formula for this twist, obtained in our joint work (Gautam-Toledano Laredo-Wendlandt). Time permitting, we will speculate on its applications to geometry, integrability and mathematical physics.
Seminar URL: https://research.math.osu.edu/reps/
Math Tower 154
OSU ASC Drupal 8
ascwebservices@osu.edu
America/New_York
public
Date Range
Add to Calendar
2019-01-23 16:15:00
2019-01-23 17:15:00
Reps Seminar - Sachin Gautam
Title: Tensor structures on representations of Yangians
Speaker: Sachin Gautam (Ohio State University)
Abstract: In this talk I will go over the definition of the Yangian as an associative algebra, and two seemingly different ways to tensor its representations. I will present a method of constructing the unique twist which conjugates one tensor product to the other, based on the existence/uniqueness results for the solutions of PDEs near non-singular points. I will also show one very explicit formula for this twist, obtained in our joint work (Gautam-Toledano Laredo-Wendlandt). Time permitting, we will speculate on its applications to geometry, integrability and mathematical physics.
Seminar URL: https://research.math.osu.edu/reps/
Math Tower 154
Department of Mathematics
math@osu.edu
America/New_York
public
Title: Tensor structures on representations of Yangians
Speaker: Sachin Gautam (Ohio State University)
Abstract: In this talk I will go over the definition of the Yangian as an associative algebra, and two seemingly different ways to tensor its representations. I will present a method of constructing the unique twist which conjugates one tensor product to the other, based on the existence/uniqueness results for the solutions of PDEs near non-singular points. I will also show one very explicit formula for this twist, obtained in our joint work (Gautam-Toledano Laredo-Wendlandt). Time permitting, we will speculate on its applications to geometry, integrability and mathematical physics.
Seminar URL: https://research.math.osu.edu/reps/