An algebra isomorphism on U(gln)
Abstract
For each positive integer n, let sn=gln Cn. We show that U(sn)Xn Dn U(sn-1) for any n∈Z≥ 2, where U(sn)Xn is the localization of U(sn) with respect to the subset Xn:=\e1i1·s enin i1,…,in∈ Z+\, and Dn is the Weyl algebra C[x1 1, ·s, xn 1, ∂∂ x1,·s, ∂∂ xn]. As an application, we give a new proof of the Gelfand-Kirillov conjecture for sn and gln. Moreover we show that the category of Harish-Chandra U(sn)Xn-modules with a fixed weight support is equivalent to the category of finite dimensional sn-1-modules whose representation type is wild, for any n∈ Z≥ 2.
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