Article ID Journal Published Year Pages File Type
10130410 Journal of Algebra 2018 23 Pages PDF
Abstract
We prove the conjecture of Lusztig in [5, Section 4]. Given a reductive group over Fq‾[ε]/(εr) for some r≥2, there is a notion of a character sheaf defined in [4, Section 8]. On the other hand, there is also a geometric analogue of the character constructed by Gérardin [2]. The conjecture in [5, Section 4] states that the two constructions are equivalent, which Lusztig also proved for r=2,3,4. Here we generalize his method to prove this conjecture for general r. As a corollary we prove that the characters derived from these two complexes are equal.
Related Topics
Physical Sciences and Engineering Mathematics Algebra and Number Theory
Authors
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