On endomorphism algebras of Gelfand-Graev representations
Abstract
For a connected reductive group G defined over Fq and equipped with the induced Frobenius endomorphism F, we study the relation among the following three Z-algebras: (i) the Z-model EG of endomorphism algebras of Gelfand-Graev representations of GF; (ii) the Grothendieck group KG of the category of representations of G F over Fq (Deligne-Lusztig dual side); (iii) the ring BG of the scheme (T/\!\!/ W)F over Z (Langlands dual side). The comparison between (i) and (iii) is motivated by recent advances in the local Langlands program.
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