ON THE EXISTENCE OF ADMISSIBLE SUPERSINGULAR REPRESENTATIONS OF -ADIC REDUCTIVE GROUPS

Central extensions and groups locally of minimal type

Classification of Pseudo-reductive Groups (AM-191) ◽

10.23943/princeton/9780691167923.003.0004 ◽

2015 ◽

Author(s):

Brian Conrad ◽

Gopal Prasad

Keyword(s):

Root System ◽

Reductive Group ◽

Reductive Groups ◽

Central Extensions ◽

General Lemma ◽

Quotient Maps ◽

Central Quotient ◽

Characteristic 2 ◽

Minimal Type ◽

Quadratic Case

This chapter deals with central extensions and groups locally of minimal type. It begins with a discussion of the general lemma on the behavior of the scheme-theoretic center with respect to the formation of central quotient maps between pseudo-reductive groups; this lemma generalizes a familiar fact in the connected reductive case. The chapter then considers four phenomena that go beyond the quadratic case, along with a pseudo-reductive group of minimal type that is locally of minimal type. It shows that the pseudo-split absolutely pseudo-simple k-groups of minimal type with a non-reduced root system are classified over any imperfect field of characteristic 2. In this classification there is no effect if the “minimal type” hypothesis is relaxed to “locally of minimal type.”

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Stable vectors in Moy–Prasad filtrations

Compositio Mathematica ◽

10.1112/s0010437x16008228 ◽

2017 ◽

Vol 153 (2) ◽

pp. 358-372 ◽

Cited By ~ 1

Author(s):

Jessica Fintzen ◽

Beth Romano

Keyword(s):

Sufficient Conditions ◽

Reductive Group ◽

Finite Extension ◽

Necessary And Sufficient Conditions ◽

Supercuspidal Representations ◽

Tits Building ◽

Stable Vectors ◽

Necessary And Sufficient

Let $k$ be a finite extension of $\mathbb{Q}_{p}$, let ${\mathcal{G}}$ be an absolutely simple split reductive group over $k$, and let $K$ be a maximal unramified extension of $k$. To each point in the Bruhat–Tits building of ${\mathcal{G}}_{K}$, Moy and Prasad have attached a filtration of ${\mathcal{G}}(K)$ by bounded subgroups. In this paper we give necessary and sufficient conditions for the dual of the first Moy–Prasad filtration quotient to contain stable vectors for the action of the reductive quotient. Our work extends earlier results by Reeder and Yu, who gave a classification in the case when $p$ is sufficiently large. By passing to a finite unramified extension of $k$ if necessary, we obtain new supercuspidal representations of ${\mathcal{G}}(k)$.

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Bruhat Order and Transfer for Complex Reductive Groups

Canadian Journal of Mathematics ◽

10.4153/cjm-1992-056-5 ◽

1992 ◽

Vol 44 (5) ◽

pp. 911-923

Author(s):

Martin Andler

Keyword(s):

Reductive Group ◽

Bruhat Order ◽

Reductive Groups ◽

Natural Way

AbstractLet G be a complex reductive group, and G^ its set of irreducible admissible representations. The Bruhat order on G^ is defined in a natural way. We prove that this Bruhat order is preserved by transfer. This gives new proofs of some results by the author on L-functions.

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Algorithms for representation theory of real reductive groups

Journal of the Institute of Mathematics of Jussieu ◽

10.1017/s1474748008000352 ◽

2009 ◽

Vol 8 (2) ◽

pp. 209-259 ◽

Cited By ~ 10

Author(s):

Jeffrey Adams ◽

Fokko du Cloux

Keyword(s):

Representation Theory ◽

Lie Groups ◽

Maximal Compact Subgroup ◽

Reductive Group ◽

Compact Subgroup ◽

Flag Variety ◽

Irreducible Representations ◽

Structure Theory ◽

Effective Algorithm ◽

Reductive Groups

AbstractThe admissible representations of a real reductive groupGare known by work of Langlands, Knapp, Zuckerman and Vogan. This paper describes an effective algorithm for computing the irreducible representations ofGwith regular integral infinitesimal character. The algorithm also describes structure theory ofG, including the orbits ofK(ℂ) (a complexified maximal compact subgroup) on the flag variety. This algorithm has been implemented on a computer by the second author, as part of the ‘Atlas of Lie Groups and Representations’ project.

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Asymptotics of the powers in finite reductive groups

Journal of Group Theory ◽

10.1515/jgth-2020-0206 ◽

2021 ◽

Vol 0 (0) ◽

Author(s):

Amit Kulshrestha ◽

Rijubrata Kundu ◽

Anupam Singh

Keyword(s):

Reductive Group ◽

Reductive Groups ◽

Regular Elements

Abstract Let 𝐺 be a connected reductive group defined over F q \mathbb{F}_{q} . Fix an integer M ≥ 2 M\geq 2 , and consider the power map x ↦ x M x\mapsto x^{M} on 𝐺. We denote the image of G ⁢ ( F q ) G(\mathbb{F}_{q}) under this map by G ⁢ ( F q ) M G(\mathbb{F}_{q})^{M} and estimate what proportion of regular semisimple, semisimple and regular elements of G ⁢ ( F q ) G(\mathbb{F}_{q}) it contains. We prove that, as q → ∞ q\to\infty , the set of limits for each of these proportions is the same and provide a formula. This generalizes the well-known results for M = 1 M=1 where all the limits take the same value 1. We also compute this more explicitly for the groups GL ⁢ ( n , q ) \mathrm{GL}(n,q) and U ⁢ ( n , q ) \mathrm{U}(n,q) and show that the set of limits are the same for these two group, in fact, in bijection under q ↦ - q q\mapsto-q for a fixed 𝑀.

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Stratifications with respect to actions of real reductive groups

Compositio Mathematica ◽

10.1112/s0010437x07003259 ◽

2008 ◽

Vol 144 (1) ◽

pp. 163-185 ◽

Cited By ~ 16

Author(s):

Peter Heinzner ◽

Gerald W. Schwarz ◽

Henrik Stötzel

Keyword(s):

Critical Points ◽

Maximal Compact Subgroup ◽

Reductive Group ◽

Compact Subgroup ◽

Kähler Manifold ◽

Reductive Groups ◽

Cartan Decomposition ◽

Kahler Manifold ◽

Real Submanifold

AbstractWe study the action of a real reductive group G on a real submanifold X of a Kähler manifold Z. We suppose that the action of G extends holomorphically to an action of the complexified group $G^{\mathbb {C}}$ and that with respect to a compatible maximal compact subgroup U of $G^{\mathbb {C}}$ the action on Z is Hamiltonian. There is a corresponding gradient map $\mu _{\mathfrak {p}}\colon X\to \mathfrak {p}^*$ where $\mathfrak {g}=\mathfrak {k}\oplus \mathfrak {p}$ is a Cartan decomposition of $\mathfrak {g}$. We obtain a Morse-like function $\eta _{\mathfrak {p}}:=\Vert \mu _{\mathfrak {p}}\Vert ^2$ on X. Associated with critical points of $\eta _{\mathfrak {p}}$ are various sets of semistable points which we study in great detail. In particular, we have G-stable submanifolds Sβ of X which are called pre-strata. In cases where $\mu _{\mathfrak {p}}$ is proper, the pre-strata form a decomposition of X and in cases where X is compact they are the strata of a Morse-type stratification of X. Our results are generalizations of results of Kirwan obtained in the case where $G=U^{\mathbb {C}}$ and X=Z is compact.

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Lifting Representations of Finite Reductive Groups I: Semisimple Conjugacy Classes

Canadian Journal of Mathematics ◽

10.4153/cjm-2014-013-6 ◽

2014 ◽

Vol 66 (6) ◽

pp. 1201-1224 ◽

Cited By ~ 2

Author(s):

Jeffrey D. Adler ◽

Joshua M. Lansky

Keyword(s):

Fixed Point ◽

Finite Group ◽

Fixed Points ◽

Point Group ◽

Reductive Group ◽

Conjugacy Classes ◽

Irreducible Representations ◽

Reductive Groups ◽

A Finite Group ◽

The Relationship

AbstractSuppose that is a connected reductive group defined over a field k, and ┌ is a finite group acting via k-automorphisms of satisfying a certain quasi-semisimplicity condition. Then the identity component of the group of -fixed points in is reductive. We axiomatize the main features of the relationship between this fixed-point group and the pair (,┌) and consider any group G satisfying the axioms. If both and G are k-quasisplit, then we can consider their duals *and G*. We show the existence of and give an explicit formula for a natural map from the set of semisimple stable conjugacy classes in G*(k) to the analogous set for *(k). If k is finite, then our groups are automatically quasisplit, and our result specializes to give a map of semisimple conjugacy classes. Since such classes parametrize packets of irreducible representations of G(k) and (k), one obtains a mapping of such packets.

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Characters of Non-Connected, Reductive p-Abic Groups

Canadian Journal of Mathematics ◽

10.4153/cjm-1987-008-3 ◽

1987 ◽

Vol 39 (1) ◽

pp. 149-167 ◽

Cited By ~ 23

Author(s):

Laurent Clozel

Keyword(s):

Irreducible Representation ◽

Characteristic Zero ◽

Reductive Group ◽

Base Change ◽

Reductive Groups ◽

Local Integrability ◽

Precise Control ◽

Distribution Character ◽

Connected Case

In this paper, we extend to non-connected, reductive groups over p-adic field of characteristic zero Harish-Chandra's theorem on the local integrability of characters.Harish-Chandra's theorem states that the distribution character of an admissible, irreducible representation of a (connected) reductive p-adic group is locally integrable. We show that this extends to any reductive group; just as in the connected case, one even gets a very precise control over the singularities of the character along the singular elements.As will be seen, the proof in the non-connected case is an easy extension of Harish-Chandra's. The reader may wonder why we have bothered to write its generalization completely. The reason is that the original article [8] does not contain proofs for the crucial lemmas, and this makes it impossible to explain why the theorem extends. Because this result is needed for work of Arthur and the author on base change, it has been thought necessary to give complete arguments.

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Compactifications of reductive groups as moduli stacks of bundles

Compositio Mathematica ◽

10.1112/s0010437x15007484 ◽

2015 ◽

Vol 152 (1) ◽

pp. 62-98 ◽

Cited By ~ 3

Author(s):

Johan Martens ◽

Michael Thaddeus

Keyword(s):

Stability Condition ◽

Reductive Group ◽

Weyl Chamber ◽

Reductive Groups ◽

Moduli Stacks ◽

Moduli Stack

Let $G$ be a split reductive group. We introduce the moduli problem of bundle chains parametrizing framed principal $G$-bundles on chains of lines. Any fan supported in a Weyl chamber determines a stability condition on bundle chains. Its moduli stack provides an equivariant toroidal compactification of $G$. All toric orbifolds may be thus obtained. Moreover, we get a canonical compactification of any semisimple $G$, which agrees with the wonderful compactification in the adjoint case, but which in other cases is an orbifold. Finally, we describe the connections with Losev–Manin’s spaces of weighted pointed curves and with Kausz’s compactification of $GL_{n}$.

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The ℓ-modular representation of reductive groups over finite local rings of length two

Journal of Group Theory ◽

10.1515/jgth-2020-0148 ◽

2021 ◽

Vol 0 (0) ◽

Author(s):

Nariel Monteiro

Keyword(s):

Residue Field ◽

Reductive Group ◽

Group Scheme ◽

Modular Representation ◽

Group Algebras ◽

Large Field ◽

Local Rings ◽

Reductive Groups ◽

Good For ◽

Prime 2

Abstract Let O 2 \mathcal{O}_{2} and O 2 ′ \mathcal{O}^{\prime}_{2} be two distinct finite local rings of length two with residue field of characteristic 𝑝. Let G ⁢ ( O 2 ) \mathbb{G}(\mathcal{O}_{2}) and G ⁢ ( O 2 ′ ) \mathbb{G}(\mathcal{O}^{\prime}_{2}) be the groups of points of any reductive group scheme 𝔾 over ℤ such that 𝑝 is very good for G × F q \mathbb{G}\times\mathbb{F}_{q} or G = GL n \mathbb{G}=\operatorname{GL}_{n} . We prove that there exists an isomorphism of group algebras K ⁢ G ⁢ ( O 2 ) ≅ K ⁢ G ⁢ ( O 2 ′ ) K\mathbb{G}(\mathcal{O}_{2})\cong K\mathbb{G}(\mathcal{O}^{\prime}_{2}) , where 𝐾 is a sufficiently large field of characteristic different from 𝑝.

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