A field-independent filtration of plethystic modules for SL2(F) that categorifies a product rule for the Cartan subalgebra of Uq(sl2)
Abstract
We lift a product rule in the Cartan subalgebra of quantum sl2 to a filtration of the plethystic representation Δ(n,m)Symd E of the affine group scheme of the algebraic group SL2, where E is the natural representation and Δ(n,m) the Weyl functor. This is a significant step towards a categorification of quantum sl2. Our filtration is an addition to a growing family of field-independent isomorphisms of SL2 representations that include Hermite reciprocity and the Wronskian isomorphism. It is the first such field-independent result requiring multiple filtration layers. It is proved by combinatorial techniques using the authors' symmetric functions model for Weyl modules.
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