Group-like elements in quantum groups, and Feigin's conjecture
Abstract
Let A be an arbitrary symmetrizable Cartan matrix of rank r, and n= n+ be the standard maximal nilpotent subalgebra in the Kac-Moody algebra associated with A (thus, n is generated by E1,…,Er subject to the Serre relations). Let Uq( n) be the completion (with respect to the natural grading) of the quantized enveloping algebra of n. For a sequence i=(i1,…,im) with 1 ik r, let P i be a skew polynomial algebra generated by t1,…,tm subject to the relations tltk=qCik,iltktl (1 k<l m) where C=(Cij)=(diaij) is the symmetric matrix corresponding to A. We construct a group-like element e i∈ P i Uq( n). This element gives rise to the evaluation homomorphism i: Cq[N] P i given by i(x)=x( e i), where Cq[N]=Uq( n)0 is the restricted dual of Uq( n). Under a well-known isomorphism of algebras Cq[N] and Uq( n), the map i identifies with Feigin's homomorphism ( i): Uq( n) P i. We prove that the image of i generates the skew-field of fractions F(P i) if and only if i is a reduced expression of some element w in the Weyl group W; furthermore, in the latter case, Ker~ i depends only on w (so we denote Iw:= Ker~ i). This result generalizes the results in [5], [6] to the case of Kac-Moody algebras. We also construct an element Rw∈ ( Cq[N]/Iw) Uq( n) which specializes to e i under the embedding Cq[N]/Iw P i. The elements Rw are closely
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