?

Shortcut

PrevPrev Article

NextNext Article

Larger Font Smaller Font Up Down Go comment Print
?

Shortcut

PrevPrev Article

NextNext Article

Larger Font Smaller Font Up Down Go comment Print
Extra Form
일정시작 2021-04-29
배경색상 #77CC00

Date:  29 Apr. (Thu.) AM 10:00 ~ 10:50   (10min break)  11:00 ~ 11:50 

                                     11:00 ~ 13:00  (KST)

Place:  Zoom, Meeting ID
Title:  A realization of type A finite $W$-(super)algebra in terms of (super) Yangian

Speaker:  Yung-Ning Peng (National Central University, Taiwan)

 

Abstract:

Let $e\in\mathfrak{g}=\mathfrak{gl}_N$ be a nilpotent element. Associated to $e$, one defines an object called {\em finite $W$-algebra}, denoted by $\mathcal{W}_e$. It can be regarded as a generalization of $U(\mathfrak{g})$, the universal enveloping algebra. However, its algebraic structure is much more complicated than $U(\mathfrak{g})$ and hence difficult to study except for some special choices of $e$.

 

In the first part of this talk, we will explain how to obtain a realization of $\mathcal{W}_e$ in terms of the Yangian $Y_n=Y(\mathfrak{gl}_n)$ associated to $\mathfrak{gl}_n$, where $n$ denotes the number of Jordan blocks of the nilpotent $e\in\mathfrak{gl}_N$. The remarkable connection between finite $W$-algebra and Yangian was firstly observed by Ragoucy-Sorba for special choice of $e$. The general case (which means for an arbitrary $e$) was established by Brundan-Kleshchev. In particular, a certain subalgebra of $Y_n$, called the {\em shifted Yangian}, was explicitly defined. Some necessary background knowledge about finite $W$-algebra and shifted Yangian will be recalled.

 

In the second part of this talk, we will explain the extension of the aforementioned connection to the case of general linear Lie superalgebra. With some mild technical modifications, the finite $W$-superalgebra $\mathcal{W}_e$ can also be defined for a given nilpotent element $e\in(\mathfrak{gl}_{M|N})_{\overline{0}}$. On the other hand, the super Yangian was defined and studied by Nazarov. Therefore, it is natural to seek for a super-analogue of the aforementioned connection.

For some special choices of $e$, such a connection was established by Briot-Ragoucy for rectangular nilpotent case and Brown-Brundan-Goodwin for principal nilpotent case. However, a universal treatment for a general $e$ was still missing in the literature until our recent result. We will explain some difficulties in the Lie superalgebra setting and how to overcome them by making use of the notion of 01-sequence.

 

               

 

                                 

      

                                            

     South Korea - Seoul                                Taiwan - Taipei


List of Articles
No. Subject Author Date Views
Notice QSMS Mailing List Registration qsms 2021.09.09 37547
42 [Seminar 2020.12.23]Machine-learning for mathematics: case study of number fields and elliptic curves qsms 2020.12.07 19420
41 [SNU Number Theory Seminiar 2021.11.12] Moduli of Fontaine-Laffailles and mod-p local-global compatibility file qsms 2021.10.29 19486
40 [SNU Number Theory Seminar 21 Apr] Selberg's central limit theorem of L -functions near the critical line qsms 2023.04.20 19492
39 [QSMS-BK21 Symplectic Seminar 30 June] Matrix Factorizations qsms 2023.06.26 19506
38 [QSMS-BK21 Symplectic Seminar 26 May] 1. Product structures on the relative symplectic cohomology 2. Symplectic homology of affine varieties qsms 2023.05.25 19537
37 [QSMS Geometry seminar 2023-05-25] Symplectic field theory and codimension-2 stable Hamiltonian submanifolds qsms 2023.05.25 19564
36 [QSMS Seminar 2023-10-06, 11-03] Algebraic group analogues of the Slodowy slices and the structure of the set of conjugacy classes in algebraic groups / Poisson q-W-algebras qsms 2023.09.11 19639
35 [QSMS Seminar 2023-12-13] A user’s guide to Schubert calculus of Lagrangian Grassmannians qsms 2023.11.27 19674
34 [Seminar 2020.11.25] On the ordering of the Markov numbers (AM 10:00~12:00) qsms 2020.11.18 19677
33 [QSMS Symplectic topology seminar 20230817] Symplectic Torelli classes of positive entropy qsms 2023.08.14 19709
32 [QSMS Seminar 2022.04.19] Universal objects in vertex algebra theory qsms 2022.04.07 19886
31 [Seminar 2021.05.12] Equivariant symplectic homology qsms 2021.05.06 19923
30 [Series of lectures 2/21, 2/23, 2/28] An introduction to geometric representation theory and 3d mirror symmetry qsms 2023.02.02 20001
29 [SNU Number Theory Seminiar] 2021.10.15 qsms 2021.09.09 20052
28 [QSMS-BK21 Symplectic Seminar 28 July] Nonexistence of Exact K(G,1) Lagrangians in Milnor Fibers of Weighted Homogeneous Polynomials / Associative Yang-Baxter Equation and Fukaya Categories qsms 2023.07.17 20091
27 [QSMS Seminar 2022-10-11] (q,t)-Cartan matrix and representation theories related to the specializations of the matrix file qsms 2022.09.18 20102
26 [QSMS-BK21 symplectic semiar] Part 4 (23' Aug 18 ~) qsms 2023.12.27 20152
25 [QSMS Seminar 2022-09-27] Categories of Whittaker Modules over Lie superalgebras and Categorification of Fock Spaces qsms 2022.09.20 20205
24 [SNU Number Theory Seminar 2022-05-06] On an upper bound of the average analytic rank of a family of elliptic curves qsms 2022.04.19 20251
23 [QSMS Representation theory seminar 2023-12-28] Generalized polynomial functors qsms 2023.12.15 20265
Board Pagination Prev 1 2 3 4 5 6 7 8 9 Next
/ 9