2016
DOI: 10.1112/s0010437x16007429
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Shintani descent for algebraic groups and almost characters of unipotent groups

Abstract: In this paper, we extend the notion of Shintani descent to general (possibly disconnected) algebraic groups defined over a finite field Fq. For this, it is essential to treat all the pure inner Fq-rational forms of the algebraic group at the same time. We prove that the notion of almost characters (introduced by T. Shoji using Shintani descent) is well defined for any neutrally unipotent algebraic group, i.e. an algebraic group whose neutral connected component is a unipotent group. We also prove that these al… Show more

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Cited by 9 publications
(18 citation statements)
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“…This is a categorical analogue of the classical notion of Shintani descent that appears in the character theory of algebraic groups defined over finite fields (cf. [Sho], [De2]). Let m be a positive integer.…”
Section: Shintani Descent For Modular Categoriesmentioning
confidence: 99%
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“…This is a categorical analogue of the classical notion of Shintani descent that appears in the character theory of algebraic groups defined over finite fields (cf. [Sho], [De2]). Let m be a positive integer.…”
Section: Shintani Descent For Modular Categoriesmentioning
confidence: 99%
“…The operator Θ : K Q ab (C , F ) ∼ = −→ K Q ab (C , F ) is an analogue of the Asai twisting operator (cf. [Sho], [De2,Prop. 3.4]).…”
Section: The Twisting Operator and Shintani Descentmentioning
confidence: 99%
“…We will also continue to use all the notation from [De4]. In particular, we have the set (1) Irrep(G, F ) := g ∈H 1 (F,G)…”
mentioning
confidence: 99%
“…Here g ∈ G and gF := ad(g) • F : G −→ G is another F qFrobenius map for G. The pure inner forms of G F are parametrized by the finite set H 1 (F, G) of F -twisted conjugacy classes in G. Note that if G is connected, then by Lang's theorem H 1 (F, G) is singleton and we have only one pure inner form. We refer to [De3,§2.4.1], [De4,§1.2] for more on these notions.…”
mentioning
confidence: 99%
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