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The question itself is not precisely enough stated (or documented) to permit a real answer, I think. It's an old problem to specify some "natural" correspondence between conjugacy classes in a Weyl …

I'm interpreting your quantum group as the quantized enveloping algebra studied by Lusztig and many others, starting with the divided power version of the usual enveloping algebra of a semisimple Lie …

This is mostly meant as a reminder that the original question asks about articles and not books or research papers. Of the latter there are a huge number by now. The notion of "quantum group" has …

First some background: Given a simple Lie algebra $\mathfrak{g}$ over an algebraically closed field of characteristic 0 such as $\mathbb{C}$, fix a Cartan decomposition $\mathfrak{g} = \mathfrak{h} \o …

To answer the question in the header, there is certainly a relevant fusion rule in positive characteristic. This arises in a purely representation-theoretic context in the work of various people (Ol …

The answer to both questions is positive (since mathematicians tend to leave no stone unturned). See for example: Geck, Meinolf; Lambropoulou, Sofia. Markov traces and knot invariants related to Iw …

In the case of the rank 1 simple Lie algebra, your references give a good account of what is known. But in general, it's wise to keep in mind that many of the indecomposable $U_q(\mathfrak{g})$-mod …