Colloquium - Monica Vazirani | Department of Mathematics

September 21, 2017

4:15PM - 5:15PM

Cockins Hall 240

Add to Calendar 2017-09-21 16:15:00 2017-09-21 17:15:00 Colloquium - Monica Vazirani Title: Combinatorics, Categorification, and CrystalsSpeaker: Monica Vazirani (UC Davis)Abstract: Categorification attempts to replace sets or algebraic and geometric structures with more general categories. It has enjoyed amazing successes, such as Khovanov homology categorifying the Jones polynomial knot invariant, KLR algebras categorifying quantum groups, or Soergel bimodules categorifying Hecke algebras. Many of the algebras we see in categorification can be described diagrammatically, which is in its own way very combinatorial. This is related to an historic motivation for categorification: to construct knot and link invariants. The payoffs to finding these richer, higher categorical structures include not only constructing finer knot invariants, but proving positivity results and producing some fantastic mathematics.In this talk, I will focus on the second example, that is, on quantum groups. Their crystal bases or canonical bases exhibit the positivity and integrality that is a trademark feature of a decategorified structure. My launch point will be the type A combinatorics of Young diagrams or partitions. These encode the representation theory of the symmetric group, but they also form a crystal--the crystal graph of the basic representation of $\mathfrak{sl}_\infty$. This is not a coincidence. The symmetric groups categorify the basic representation, with induction and restriction functors descending to raising and lowering operators. This phenomenon generalizes to all symmetrizable types replacing the symmetric groups with cyclotomic Khovanov-Lauda-Rouquier (KLR) algebras.Bio: Monica Vazirani is a professor at UC Davis. She received her PhD from UC Berkeley in 1999, after which she had an NSF postdoc she spent at UC San Diego and UC Berkeley, as well as postdoctoral positions at MSRI and Caltech. Dr. Vazirani's research interests center on the representation theory of algebras related to the symmetric group and how to express algebraic phenomena via the combinatorics of partitions, tableaux, crystal graphs and parking functions.Colloquium URL: https://web.math.osu.edu/colloquium/ Cockins Hall 240 OSU ASC Drupal 8 ascwebservices@osu.edu America/New_York public

Add to Calendar 2017-09-21 16:15:00 2017-09-21 17:15:00 Colloquium - Monica Vazirani Title: Combinatorics, Categorification, and CrystalsSpeaker: Monica Vazirani (UC Davis)Abstract: Categorification attempts to replace sets or algebraic and geometric structures with more general categories. It has enjoyed amazing successes, such as Khovanov homology categorifying the Jones polynomial knot invariant, KLR algebras categorifying quantum groups, or Soergel bimodules categorifying Hecke algebras. Many of the algebras we see in categorification can be described diagrammatically, which is in its own way very combinatorial. This is related to an historic motivation for categorification: to construct knot and link invariants. The payoffs to finding these richer, higher categorical structures include not only constructing finer knot invariants, but proving positivity results and producing some fantastic mathematics.In this talk, I will focus on the second example, that is, on quantum groups. Their crystal bases or canonical bases exhibit the positivity and integrality that is a trademark feature of a decategorified structure. My launch point will be the type A combinatorics of Young diagrams or partitions. These encode the representation theory of the symmetric group, but they also form a crystal--the crystal graph of the basic representation of $\mathfrak{sl}_\infty$. This is not a coincidence. The symmetric groups categorify the basic representation, with induction and restriction functors descending to raising and lowering operators. This phenomenon generalizes to all symmetrizable types replacing the symmetric groups with cyclotomic Khovanov-Lauda-Rouquier (KLR) algebras.Bio: Monica Vazirani is a professor at UC Davis. She received her PhD from UC Berkeley in 1999, after which she had an NSF postdoc she spent at UC San Diego and UC Berkeley, as well as postdoctoral positions at MSRI and Caltech. Dr. Vazirani's research interests center on the representation theory of algebras related to the symmetric group and how to express algebraic phenomena via the combinatorics of partitions, tableaux, crystal graphs and parking functions.Colloquium URL: https://web.math.osu.edu/colloquium/ Cockins Hall 240 Department of Mathematics math@osu.edu America/New_York public

Title: Combinatorics, Categorification, and Crystals

Speaker: Monica Vazirani (UC Davis)

Abstract: Categorification attempts to replace sets or algebraic and geometric structures with more general categories. It has enjoyed amazing successes, such as Khovanov homology categorifying the Jones polynomial knot invariant, KLR algebras categorifying quantum groups, or Soergel bimodules categorifying Hecke algebras. Many of the algebras we see in categorification can be described diagrammatically, which is in its own way very combinatorial. This is related to an historic motivation for categorification: to construct knot and link invariants. The payoffs to finding these richer, higher categorical structures include not only constructing finer knot invariants, but proving positivity results and producing some fantastic mathematics.

In this talk, I will focus on the second example, that is, on quantum groups. Their crystal bases or canonical bases exhibit the positivity and integrality that is a trademark feature of a decategorified structure. My launch point will be the type A combinatorics of Young diagrams or partitions. These encode the representation theory of the symmetric group, but they also form a crystal--the crystal graph of the basic representation of $\mathfrak{sl}_\infty$. This is not a coincidence. The symmetric groups categorify the basic representation, with induction and restriction functors descending to raising and lowering operators. This phenomenon generalizes to all symmetrizable types replacing the symmetric groups with cyclotomic Khovanov-Lauda-Rouquier (KLR) algebras.

Bio: Monica Vazirani is a professor at UC Davis. She received her PhD from UC Berkeley in 1999, after which she had an NSF postdoc she spent at UC San Diego and UC Berkeley, as well as postdoctoral positions at MSRI and Caltech. Dr. Vazirani's research interests center on the representation theory of algebras related to the symmetric group and how to express algebraic phenomena via the combinatorics of partitions, tableaux, crystal graphs and parking functions.

Colloquium URL: https://web.math.osu.edu/colloquium/

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