Jacobi–Trudi Identity and Drinfeld Functor for Super Yangian

Files
Lu2021Jacobi-AAM.pdf (561.44 KB)
If you need an accessible version of this item, please email your request to digschol@iu.edu so that they may create one and provide it to you.
Date
2021-11
Authors
Lu, Kang
Mukhin, Evgeny
Language
American English
Embargo Lift Date
Department
Mathematical Sciences, School of Science
Committee Members
Degree
Degree Year
Department
Grantor
Journal Title
Journal ISSN
Volume Title
Found At
Oxford
Abstract

We show that the quantum Berezinian that gives a generating function of the integrals of motions of XXX spin chains associated to super Yangian Y(glm|n) can be written as a ratio of two difference operators of orders m and n whose coefficients are ratios of transfer matrices corresponding to explicit skew Young diagrams. In the process, we develop several missing parts of the representation theory of Y(glm|n) such as q-character theory, Jacobi–Trudi identity, Drinfeld functor, extended T-systems, and Harish-Chandra map.

Description
Keywords
Drinfeld Functor, quantum Berezinian, super Yangian
item.page.description.tableofcontents
item.page.relation.haspart
Cite As
Lu, K., & Mukhin, E. (2021). Jacobi–Trudi Identity and Drinfeld Functor for Super Yangian. International Mathematics Research Notices, 2021(21), 16751–16810. https://doi.org/10.1093/imrn/rnab023
ISSN
1073-7928, 1687-0247
Publisher
Series/Report
Sponsorship
Major
Extent
Identifier
Relation
Journal
International Mathematics Research Notices
Rights
Publisher Policy
Source
ArXiv
Alternative Title
Type
Article
Number
Volume
Conference Dates
Conference Host
Conference Location
Conference Name
Conference Panel
Conference Secretariat Location
Permanent Link
https://hdl.handle.net/1805/33839
DOI
https://doi.org/10.1093/imrn/rnab023
Version
Author's manuscript
Full Text Available at
This item is under embargo {{howLong}}
Collections
Open Access Policy Articles
Department of Mathematical Sciences Articles