Equivariant Koszul Duality, Modular Category O, and Periodic Kazhdan--Lusztig Polynomials
Abstract
Let G be a connected reductive algebraic group over an algebraically closed field of positive characteristic, g be its Lie algebra, and B be a Borel subgroup. We prove a formula for the dimensions of extension groups, in the principal block of the category of strongly B-equivariant g-modules (also called modular category O), from a simple object to a costandard object, under the assumption that Lusztig's conjecture holds (which is known in large characteristic). The answer is given by a coefficient of a periodic Kazhdan--Lusztig polynomial associated with the corresponding affine Weyl group. Among other things, the proof uses a torus-equivariant version of the Koszul duality for g-modules constructed by the first author.
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