The Torus Centralizing Subalgebra of Dist(Gr)
Abstract
Let G be a simple and simply connected algebraic group over a field of characteristic p>0, and Gr its r-th Frobenius kernel. In this paper, we initiate a general study of Dist(Gr)T, the subalgebra of Dist(Gr) consisting of fixed points for the adjoint action of a maximal torus T of G. We analyze the structure of this algebra, and classify its simple modules, which essentially are just the non-zero weight spaces of the simple GrT-modules of pr-restricted highest weight. Further connections between the representations of Dist(Gr)T and GrT are shown, demonstrating the potential usefulness of this algebra.
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