Generic character sheaves on groups over []/(r)
Abstract
Let G be a connected reductive group over , an algebraic closure of a finite field. For an integer r 1 let Gr=G([]/(r)) viewed as an algebraic group of dimension r G over . We show that the character of the generic principal series representation of Gr(Fq) can be realized by a simple perverse sheaf on Gr provided that r=2 or r=4 and we give a strategy to prove the same statement for any even r. (The case where r=1 is already known.)
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