Emilien Zabeth
Published 2022-07-13Version 1
We give a new proof for the description of the blocks in the category of representations of a reductive algebraic group $\mathbf{G}$ over a field of positive characteristic $\ell$ (originally due to Donkin), by working in the Satake category of the Langlands dual group and applying Smith-Treumann theory as developed by Riche and Williamson. On the representation theoretic side, our methods enable us to give a bound for the length of a minimum chain linking two weights in the same block, and to give a new proof for the block decomposition of a quantum group at an $\ell$-th root of unity.
Comments: 50 pages, preliminary version
Crystal of affine $\widehat{\mathfrak{sl}}_{\ell}$ and Hecke algebras at a primitive $2\ell$th root of unity
Notes on the geometric Satake equivalence
On modules arising from quantum groups at $p^r$-th roots of unity
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