François Digne, Jean Michel
Published 2005-09-01Version 1
This paper is a following to math.RT/0410454. For a finite group of Lie type we study the endomorphisms, commuting with the group action, of a Deligne-Lusztig variety associated to a regular element of the Weyl group. We state some general conjectures, in particular that the endomorphism algebra induced on the cohomology is a cyclotomic Hecke algebra, and prove them in some cases. On the way we also prove results on centralizers in braid groups.
On the representation theory of braid groups
Supercharacter theories for Sylow $p$-subgroups of Lie type $G_2$
The projective cover of the trivial representation for a finite group of Lie type in defining characteristic
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