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Pure and Applied Mathematics Quarterly
Volume 20 (2024)
Number 1
Special Issue dedicated to Corrado De Concini
Guest Editors: Alberto De Sole, Nicoletta Cantarini, and Andrea Maffei
On the Drinfeld coproduct
Pages: 171 – 232
DOI: https://dx.doi.org/10.4310/PAMQ.2024.v20.n1.a6
Author
Abstract
This paper provides a construction of the Drinfeld coproduct $\Delta_v$ on an affine quantum Kac–Moody algebra or on a quantum affinization $\mathcal{U}$ through the exponentials of some locally nilpotent derivations, thus proving that this “coproduct” with values in a suitable completion of $\mathcal{U} \oplus \mathcal{U}$ is well defined.
For the affine quantum algebras, $\Delta_v$ is also obtained as “$t$-equivariant limit” of the Drinfeld–Jimbo coproduct $\Delta$.
Received 18 November 2022
Accepted 18 October 2023
Published 26 March 2024