A new involution for quantum loop algebras
Abstract
In this article, we introduce a completion U+v(Lg) of the positive half of the quantum affinization U+v(Lg) of a symmetrizable Kac-Moody algebra g. On U+v(L(g)), we define a new "bar-involution" and construct the analogue Kashiwara's operators. We conjecture that the resulting pair (L,B) is a crystal basis which provides the existence of the "canonical basis" on the (completion of the) of the positive half of the quamtum affinization.
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