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About
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Governance
Partner Institutions
Visit
People
Management
Faculty
Postdocs
Visiting Scholars
Staff
Research
Research Groups
Courses
Seminars
Join Us
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Qiuzhen College, Tsinghua University
Yau Mathematical Sciences Center, Tsinghua University (YMSC)
Tsinghua Sanya International  Mathematics Forum (TSIMF)
Shanghai Institute for Mathematics and  Interdisciplinary Sciences (SIMIS)
BIMSA > Topics in Representation Theory The positive part of $U_q \left( \widehat{\mathfrak{sl}_2} \right)$ and its embedding into a q-shuffle algebra
The positive part of $U_q \left( \widehat{\mathfrak{sl}_2} \right)$ and its embedding into a q-shuffle algebra
Organizer
Shamil Shakirov
Speaker
Chen Wei Ruan
Time
Friday, October 18, 2024 10:00 AM - 11:30 AM
Venue
A3-4-101
Online
Zoom 638 227 8222 (BIMSA)
Abstract
The q-deformed enveloping algebra $U_q \left( \widehat{\mathfrak{sl}_2} \right)$ and its positive part $U_q^+$ are studied in both mathematics and mathematical physics. ln 1995 , Rosso obtained an embedding of the algebra $U_q^+$ into a q-shuffle algebra. In the literature, there are three PBW bases for $U_q^+$ due to Damiani, Beck, Terwilliger respectively. The Damiani and the Beck PBW bases were originally defined using recurrence relations. Later, Terwilliger used the Rosso embedding to obtain closed forms for these two bases. Terwilliger also obtained the alternating PBW basis for $U_q^+$ using the Rosso embedding. The three PBW bases are related via exponential formulas. ln recent years, I used the Rosso embedding to obtain a uniform approach to the PBW bases and the exponential forrnulas aforementioned. I also studied sonme elements of interest related to the alternating PBW basis. We will discuss these results in this talk.
This talk is based on arXiv:2305.11152, arXiv:2408.02633
Beijing Institute of Mathematical Sciences and Applications
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