English
 
Help Privacy Policy Disclaimer
  Advanced SearchBrowse

Item

ITEM ACTIONSEXPORT
  Lax matrices from antidominantly shifted Yangians and quantum affine algebras: A-type

Frassek, R., Pestun, V., & Tsymbaliuk, A. (2022). Lax matrices from antidominantly shifted Yangians and quantum affine algebras: A-type. Advances in Mathematics, 401: 108283. doi:10.1016/j.aim.2022.108283.

Item is

Files

show Files
hide Files
:
2001.04929.pdf (Preprint), 2MB
 
File Permalink:
-
Name:
2001.04929.pdf
Description:
File downloaded from arXiv at 2022-04-21 14:06
OA-Status:
Visibility:
Private
MIME-Type / Checksum:
application/pdf
Technical Metadata:
Copyright Date:
-
Copyright Info:
-
:
Frassek-Pestun-Tsymbaliuk_Lax matrices from antidominantly shifted Yangians and quantum affine algebras-A-type_2022.pdf (Publisher version), 2MB
 
File Permalink:
-
Name:
Frassek-Pestun-Tsymbaliuk_Lax matrices from antidominantly shifted Yangians and quantum affine algebras-A-type_2022.pdf
Description:
-
OA-Status:
Visibility:
Restricted ( Max Planck Society (every institute); )
MIME-Type / Checksum:
application/pdf
Technical Metadata:
Copyright Date:
-
Copyright Info:
-
License:
-

Locators

show
hide
Locator:
https://doi.org/10.1016/j.aim.2022.108283 (Publisher version)
Description:
-
OA-Status:
Not specified
Description:
-
OA-Status:
Green

Creators

show
hide
 Creators:
Frassek, Rouven1, Author           
Pestun, Vasily, Author
Tsymbaliuk, Alexander, Author
Affiliations:
1Max Planck Institute for Mathematics, Max Planck Society, ou_3029201              

Content

show
hide
Free keywords: Mathematics, Representation Theory, Mathematical Physics
 Abstract: We construct a family of $GL_n$ rational and trigonometric Lax matrices
$T_D(z)$ parametrized by $\Lambda^+$-valued divisors $D$ on $\mathbb{P}^1$. To
this end, we study the shifted Drinfeld Yangians $Y_\mu(\mathfrak{gl}_n)$ and
quantum affine algebras $U_{\mu^+,\mu^-}(L\mathfrak{gl}_n)$, which slightly
generalize their $\mathfrak{sl}_n$-counterparts. Our key observation is that
both algebras admit the RTT type realization when $\mu$ (respectively, $\mu^+$
and $\mu^-$) are antidominant coweights. We prove that $T_D(z)$ are polynomial
in $z$ (up to a rational factor) and obtain explicit simple formulas for those
linear in $z$. This generalizes the recent construction by the first two
authors of linear rational Lax matrices in both trigonometric and higher
$z$-degree directions. Furthermore, we show that all $T_D(z)$ are normalized
limits of those parametrized by $D$ supported away from $\{\infty\}$ (in the
rational case) or $\{0,\infty\}$ (in the trigonometric case). The RTT approach
provides conceptual and elementary proofs for the construction of the coproduct
homomorphisms on shifted Yangians and quantum affine algebras of
$\mathfrak{sl}_n$, previously established via rather tedious computations.
Finally, we establish a close relation between a certain collection of explicit
linear Lax matrices and the well-known parabolic Gelfand-Tsetlin formulas.

Details

show
hide
Language(s): eng - English
 Dates: 2022
 Publication Status: Issued
 Pages: 73
 Publishing info: -
 Table of Contents: -
 Rev. Type: Peer
 Identifiers: arXiv: 2001.04929
DOI: 10.1016/j.aim.2022.108283
 Degree: -

Event

show

Legal Case

show

Project information

show

Source 1

show
hide
Title: Advances in Mathematics
Source Genre: Journal
 Creator(s):
Affiliations:
Publ. Info: Elsevier
Pages: - Volume / Issue: 401 Sequence Number: 108283 Start / End Page: - Identifier: -