Group-like elements in quantum groups, and Feigin's conjecture
Abstract
Let be an arbitrary symmetrizable Cartan matrix of rank , and be the standard maximal nilpotent subalgebra in the Kac-Moody algebra associated with (thus, is generated by subject to the Serre relations). Let be the completion (with respect to the natural grading) of the quantized enveloping algebra of . For a sequence with , let be a skew polynomial algebra generated by subject to the relations () where is the symmetric matrix corresponding to . We construct a group-like element . This element gives rise to the evaluation homomorphism given by , where is the restricted dual of . Under a well-known isomorphism of algebras and , the map identifies with Feigin's homomorphism . We prove that the image of generates the skew-field of fractions if and only if is a reduced expression of some element in the Weyl group ; furthermore, in the latter case, depends only on (so we denote ). This result generalizes the results in [5], [6] to the case of Kac-Moody algebras. We also construct an element which specializes to under the embedding . The elements are closely
Cite
@article{arxiv.q-alg/9605016,
title = {Group-like elements in quantum groups, and Feigin's conjecture},
author = {Arkady Berenstein},
journal= {arXiv preprint arXiv:q-alg/9605016},
year = {2008}
}
Comments
25 pages, plain TEX