Weyl group twists and representations of quantum affine Borel algebras
Abstract
We define categories Ow of representations of Borel subalgebras Uqb of quantum affine algebras Uqg, which come from the category O twisted by Weyl group elements w. We construct inductive systems of finite-dimensional Uqb-modules twisted by w, which provide representations in the category Ow. We also establish a classification of simple modules in these categories Ow. We explore convergent phenomenon of q-characters of representations of quantum affine algebras, which conjecturally give the q-characters of representations in Ow. Furthermore, we propose a conjecture concerning the relationship between the category O and the twisted category Ow, and we propose a possible connection with shifted quantum affine algebras.
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