Let $\mathfrak{g}$ be a semisimple Lie algebra, let $t$ be its canonical 2-tensor, and let $\Phi_{KZ}$ be a Drinfeld associator.When $R_{KZ}=e^{\hbar t/2}$, $(U(\mathfrak{g})[[\hbar]],\Phi_{KZ},R_{KZ})$ has a quasi-triangular topological quasi-bialgebra structure. According to Theorem XIX 4.3 of Kassel's Quantum groups, for a quantum enveloping algebra $U_\hbar(\mathfrak{g})$ of $\mathfrak{g}$, there exists a gauge transformation $F$ exists and $(U(\mathfrak{g})[[\hbar]])_F$ and $U_\hbar(\mathfrak{g})$ are isomorphic. Is it possible to explicitly describe this gauge transformation F ? I would like to know just in the case of $\mathfrak{sl}_2$, not in the case of $\mathfrak{g}$ in general.
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1$\begingroup$ Questions that require reading an external reference, especially a book, to understand are improved by including at least some self-contained information in the question. As things stand, your subject seemed to provide more information than the body, so I edited it in to the body as well. I hope that that was correct. $\endgroup$– LSpiceCommented Oct 30, 2023 at 17:29
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1$\begingroup$ Thank you ! I followed your advice and rewrote the question. $\endgroup$– yohei ohtaCommented Oct 31, 2023 at 15:19
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