Supercuspidal L-packets of positive depth and twisted Coxeter elements
Identifieur interne : 000806 ( Main/Exploration ); précédent : 000805; suivant : 000807Supercuspidal L-packets of positive depth and twisted Coxeter elements
Auteurs : Mark Reeder [États-Unis]Source :
- Journal für die reine und angewandte Mathematik (Crelles Journal) [ 0075-4102 ] ; 2008-07.
English descriptors
- KwdEn :
- Abelian, Adjoint, Alcove, Algebraic, Algebraic closure, Automorphism, Bijection, Canonical, Canonical haar measures, Centralizer, Closure, Conjugacy, Conjugacy class, Coxeter, Coxeter element, Coxeter elements, Coxeter tori, Coxeter torus, Cuspidal representations, Debacker, Dimf, Dual torus, Eigenvalue, Elliptic, Endomorphism, Equivalence classes, Equivariance property, Facet, Formal degree, Formal degrees, Frob, Frobenius, Frobenius endomorphism, Galois, Galois cohomology, Haar, Homomorphism, Hyperspecial, Hyperspecial point, Hyperspecial vertex, Hyperspecial vertices, Inner form, Irreducible, Irreducible supercuspidal representation, Isomorphism, Langlands, Langlands correspondence, Langlands parameter, Langlands parameters, Largest integer, Local factors, Local langlands correspondence, Math, Maximal, Maximal abelian extension, Maximal extension, Maximal torus, Minisotropic, Naturality property, Nite, Nite order, Nontrivial, Parahoric, Parahoric subgroup, Positive depth, Positive system, Pure math, Reductive, Reductive groups, Reeder, Regular eigenvalue, Regularity condition, Right side, Root hyperplanes, Root system, Semidirect product, Stable class, Stable classes, Stably conjugate, Subgroup, Supercuspidal, Supercuspidal representations, Surjective, Torus, Weyl, Weyl group, Weyl groups.
- Teeft :
- Abelian, Adjoint, Alcove, Algebraic, Algebraic closure, Automorphism, Bijection, Canonical, Canonical haar measures, Centralizer, Closure, Conjugacy, Conjugacy class, Coxeter, Coxeter element, Coxeter elements, Coxeter tori, Coxeter torus, Cuspidal representations, Debacker, Dimf, Dual torus, Eigenvalue, Elliptic, Endomorphism, Equivalence classes, Equivariance property, Facet, Formal degree, Formal degrees, Frob, Frobenius, Frobenius endomorphism, Galois, Galois cohomology, Haar, Homomorphism, Hyperspecial, Hyperspecial point, Hyperspecial vertex, Hyperspecial vertices, Inner form, Irreducible, Irreducible supercuspidal representation, Isomorphism, Langlands, Langlands correspondence, Langlands parameter, Langlands parameters, Largest integer, Local factors, Local langlands correspondence, Math, Maximal, Maximal abelian extension, Maximal extension, Maximal torus, Minisotropic, Naturality property, Nite, Nite order, Nontrivial, Parahoric, Parahoric subgroup, Positive depth, Positive system, Pure math, Reductive, Reductive groups, Reeder, Regular eigenvalue, Regularity condition, Right side, Root hyperplanes, Root system, Semidirect product, Stable class, Stable classes, Stably conjugate, Subgroup, Supercuspidal, Supercuspidal representations, Surjective, Torus, Weyl, Weyl group, Weyl groups.
Url:
DOI: 10.1515/CRELLE.2008.046
Affiliations:
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Le document en format XML
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<term>Automorphism</term>
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<term>Conjugacy class</term>
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<term>Frobenius endomorphism</term>
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<term>Galois cohomology</term>
<term>Haar</term>
<term>Homomorphism</term>
<term>Hyperspecial</term>
<term>Hyperspecial point</term>
<term>Hyperspecial vertex</term>
<term>Hyperspecial vertices</term>
<term>Inner form</term>
<term>Irreducible</term>
<term>Irreducible supercuspidal representation</term>
<term>Isomorphism</term>
<term>Langlands</term>
<term>Langlands correspondence</term>
<term>Langlands parameter</term>
<term>Langlands parameters</term>
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<term>Nite order</term>
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<term>Semidirect product</term>
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<term>Stable classes</term>
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<term>Subgroup</term>
<term>Supercuspidal</term>
<term>Supercuspidal representations</term>
<term>Surjective</term>
<term>Torus</term>
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<term>Weyl group</term>
<term>Weyl groups</term>
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<term>Alcove</term>
<term>Algebraic</term>
<term>Algebraic closure</term>
<term>Automorphism</term>
<term>Bijection</term>
<term>Canonical</term>
<term>Canonical haar measures</term>
<term>Centralizer</term>
<term>Closure</term>
<term>Conjugacy</term>
<term>Conjugacy class</term>
<term>Coxeter</term>
<term>Coxeter element</term>
<term>Coxeter elements</term>
<term>Coxeter tori</term>
<term>Coxeter torus</term>
<term>Cuspidal representations</term>
<term>Debacker</term>
<term>Dimf</term>
<term>Dual torus</term>
<term>Eigenvalue</term>
<term>Elliptic</term>
<term>Endomorphism</term>
<term>Equivalence classes</term>
<term>Equivariance property</term>
<term>Facet</term>
<term>Formal degree</term>
<term>Formal degrees</term>
<term>Frob</term>
<term>Frobenius</term>
<term>Frobenius endomorphism</term>
<term>Galois</term>
<term>Galois cohomology</term>
<term>Haar</term>
<term>Homomorphism</term>
<term>Hyperspecial</term>
<term>Hyperspecial point</term>
<term>Hyperspecial vertex</term>
<term>Hyperspecial vertices</term>
<term>Inner form</term>
<term>Irreducible</term>
<term>Irreducible supercuspidal representation</term>
<term>Isomorphism</term>
<term>Langlands</term>
<term>Langlands correspondence</term>
<term>Langlands parameter</term>
<term>Langlands parameters</term>
<term>Largest integer</term>
<term>Local factors</term>
<term>Local langlands correspondence</term>
<term>Math</term>
<term>Maximal</term>
<term>Maximal abelian extension</term>
<term>Maximal extension</term>
<term>Maximal torus</term>
<term>Minisotropic</term>
<term>Naturality property</term>
<term>Nite</term>
<term>Nite order</term>
<term>Nontrivial</term>
<term>Parahoric</term>
<term>Parahoric subgroup</term>
<term>Positive depth</term>
<term>Positive system</term>
<term>Pure math</term>
<term>Reductive</term>
<term>Reductive groups</term>
<term>Reeder</term>
<term>Regular eigenvalue</term>
<term>Regularity condition</term>
<term>Right side</term>
<term>Root hyperplanes</term>
<term>Root system</term>
<term>Semidirect product</term>
<term>Stable class</term>
<term>Stable classes</term>
<term>Stably conjugate</term>
<term>Subgroup</term>
<term>Supercuspidal</term>
<term>Supercuspidal representations</term>
<term>Surjective</term>
<term>Torus</term>
<term>Weyl</term>
<term>Weyl group</term>
<term>Weyl groups</term>
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