Tame cuspidal representations in non-defining characteristics

Fintzen, Jessica

doi:10.48550/arxiv.1905.06374

Cited by 3 publications

(5 citation statements)

References 5 publications

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“…Yu's construction [21] produces a supercuspidal representation π out of the datum Σ. Recently, Fintzen [11] has shown that if the residue characteristic p does not divide the order of the Weyl group, this construction yields all supercuspidal representations of G(F ). 4.2.…”

Section: Review Of Tame and Regular Supercuspidal Representationsmentioning

confidence: 99%

Regular Bernstein blocks

Adler¹,

Mishra²

2019

Preprint

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For a connected reductive group G defined over a non-archimedean local field F , we consider the Bernstein blocks in the category of smooth representations of G(F ). Bernstein blocks whose cuspidal support involves a regular supercuspidal representation are called regular Bernstein blocks. Most Bernstein blocks are regular when the residual characteristic of F is not too small. Under mild hypotheses on the residual characteristic, we show that the Bernstein center of a regular Bernstein block of G(F ) is isomorphic to the Bernstein center of a regular depth-zero Bernstein block of G 0 (F ), where G 0 is a certain twisted Levi subgroup of G. In some cases, we show that the blocks themselves are equivalent, and as a consequence we prove the ABPS Conjecture in some new cases.

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Section: Review Of Tame and Regular Supercuspidal Representationsmentioning

confidence: 99%

Regular Bernstein blocks

Adler¹,

Mishra²

2019

Preprint

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“…Although the proof contained no error, it was based on a statement that had been published with a misprint, and was false. A correct proof of Yu's theorem was given more recently by Fintzen [Fi19], in connection with her proof of the fundamental theorem [Fi21] that we have already mentioned several times.…”

Section: Other Groupsmentioning

confidence: 88%

Local Langlands correspondences

Harris¹

2022

Preprint

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Let G be a connected reductive group over the non-archimedean local field F , with residue field k of characteristic p. Denote by Φ(G/F ) the set of equivalence classes of Weil-Deligne parameters for G/F and let Π(G/F ) denote the set of (equivalence classes of) irreducible admissible representations of G(F ), both taken over a fixed algebraically closed field C of characteristic 0. In its simplest form, the local Langlands conjecture asserts the existence of a canonical parametrization of one set by the other set.

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“…When C is algebraically closed, Z(0)-exhaustion (and unicity) is in [39] and [40] when C = C and the arguments of [40] carry over to C; exhaustivity was implicit in [53], and is established by Fintzen at the end of [24] (the hypothesis on G of [24] plays not role for level 0 representations).…”

Section: Corollary 325 Assume That Ind Gmentioning

confidence: 99%

“…(G n ) x,rn/2 (G n+1 ) x,0+ inflating the representation ρ of (G n+1 ) [x] . In ( [24], §2.4), J is denoted by K and λ 0 is still denoted by ρ. To describe the representation κ of K we introduce more notations following ([24] 2.5).…”

Section: Types à La Bushnell-kutzkomentioning

confidence: 99%

“…Indeed we show that if C a and C ′a are two algebraically closed fields with the same characteristic c = p and G admits a set of C a -types satisfying unicity, exhaustion, and Aut(C a )-stability, then G also admits a list of C ′a -types satisfying the same properties. For example, in the case of a quaternionic unitary group G, the set of cuspidal complex types constructed by Skodlerack in [48] gives rise to a set of cuspidal C-types satisfying exhaustion, unicity, intertwining, and Aut(C)-stability, for any characteristic 0 field C. In another case, only unicity for C a -types is lacking to apply Theorem 0.1: when G splits over a tamely ramified extension of F and p does not divide the order of the absolute Weyl group of G, Fintzen [24] shows that the constructions of Yu [56] give a list of types satisfying exhaustion, for any algebraically closed field C a of characteristic c = p. We prove here Aut(C a )-stability for those types, but we have not verified if the arguments of Hakim-Murnaghan [28], analysing the fibers of the map from data à la Yu to cuspidal representations, give unicity; that is a topic of the current Ph. D. thesis of R. Deseine.…”

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confidence: 99%

See 1 more Smart Citation

Representations of a reductive $p$-adic group in characteristic distinct from $p$

Henniart,

Vignéras

2020

Preprint

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Tame cuspidal representations in non-defining characteristics

Cited by 3 publications

References 5 publications

Regular Bernstein blocks

Regular Bernstein blocks

Local Langlands correspondences

Representations of a reductive $p$-adic group in characteristic distinct from $p$

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