Equivariant quantizations of the positive nilradical and covariant differential calculi
Abstract
Consider a decomposition n = n1 ·s nr of the positive nilradical of a complex semisimple Lie algebra of rank r, where each nk is a module under an appropriate Levi factor. We show that this can be quantized as a finite-dimensional subspace nqk = nq1 ·s nqr of the positive part of the quantized enveloping algebra, where each nqk is a module under the left adjoint action of a quantized Levi factor. Furthermore, we show that C nq is a left coideal, with the possible exception of components corresponding to some exceptional Lie algebras. Finally we use these quantizations to construct covariant first-order differential calculi on quantum flag manifolds, compatible in a certain sense with the decomposition above, which coincide with those introduced by Heckenberger-Kolb in the irreducible case.
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