On graded representations of modular Lie algebras over commutative algebras

Abstract

We develop the theory of a category CA which is a generalisation to non-restricted g-modules of a category famously studied by Andersen, Jantzen and Soergel for restricted g-modules, where g is the Lie algebra of a reductive group G over an algebraically closed field K of characteristic p>0. Its objects are certain graded bimodules. On the left, they are graded modules over an algebra U associated to g and to ∈ g* in standard Levi form. On the right, they are modules over a commutative Noetherian S( h)-algebra A, where h is the Lie algebra of a maximal torus of G. We develop here certain important modules ZA,(λ), QA,I(λ) and QA,(λ) in CA which generalise familiar objects when A= K, and we prove some key structural results regarding them.

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