Factorization of Shapovalov elements
Abstract
Shapovalov elements θβ,m are special elements in a Borel subalgebra of a classical or quantum universal enveloping algebra parameterized by a positive root β and a positive integer m. They relate the canonical generator of a reducible Verma module with highest vectors of its Verma submodules. For m=1, they can be explicitly obtained as matrix elements of the inverse Shapovalov form. We extend this approach to m>1 for all β but three roots in g2, f4, and e8, presenting θβ,m as a product of matrix elements of weight β.
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