Quantized nilradicals of parabolic subalgebras of sl(n) and algebras of coinvariants

Abstract

Let PJ be the standard parabolic subgroup of SLn obtained by deleting a subset J of negative simple roots, and let PJ = LJUJ be the standard Levi decomposition. Following work of the first author, we study the quantum analogue θ: Oq(PJ) Oq(LJ) Oq(PJ) of an induced coaction and the corresponding subalgebra Oq(PJ)co θ ⊂eq Oq(PJ) of coinvariants. It was shown that the smash product algebra Oq(LJ)\# Oq(PJ)co θ is isomorphic to Oq(PJ). In view of this, Oq(PJ)co θ -- while it is not a Hopf algebra -- can be viewed as a quantum analogue of the coordinate ring O(UJ). In this paper we prove that when q∈ K is nonzero and not a root of unity, Oq(PJ)co θ is isomorphic to a quantum Schubert cell algebra Uq+[w] associated to a parabolic element w in the Weyl group of sl(n). An explicit presentation in terms of generators and relations is found for these quantum Schubert cells.