Algorithm for computing canonical bases and foldings of quantum groups
Abstract
Let Uq- be the negative half of a quantum group of finite type. Let P be the transition matrix between the canonical basis and a PBW basis of Uq-. In the case Uq- is symmetric, Antor gave a simple algorithm of computing P by making use of monomial bases. By the folding theory, Uq- (symmetric, with a certain automorphism) is related to a quantum group Uq- of non-symmetric type. In this paper, we extend the results of Antor to the non-symmetric case, and discuss the relationship between the algorithms for Uq- and for Uq-.
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