Level-Rank Dualities from -Cuspidal Pairs and Affine Springer Fibers

Abstract

We propose a generalization of the level-rank dualities arising from Uglov's work on higher-level Fock spaces. The statements use Hecke algebras defined by Brou\'e-Malle, which conjecturally describe the endomorphisms of Lusztig induction modules, and a generalization of Harish-Chandra theory due to Brou\'e-Malle-Michel. For any generic finite reductive group G and integers e, m > 0, we conjecture that: (1) the intersection of a e-Harish-Chandra series and a m-Harish-Chandra series is parametrized by a union of blocks of the Hecke algebra of the e-cuspidal pair at an mth root of unity, and similarly for the Hecke algebra of the m-cuspidal pair at an eth root of unity; (2) these parametrizations match the blocks on the two sides; (3) when two blocks match, the bijection between them lifts to a derived equivalence between associated blocks of rational DAHAs. Surprisingly, these structures also appear in bimodules formed from the cohomology of affine Springer fibers studied by Oblomkov-Yun. When G = GLn and e, m are coprime, we show that (1)-(3) hold, and that (3) recovers the level-rank dualities conjectured by Chuang-Miyachi and later proved through the work of several other people. Finally, we verify for many cases where G is exceptional that Brou\'e-Malle's parameters are numerically compatible with our conjectures.

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