scientific article; zbMATH DE number 7779484
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Publication:6090103
Publication date: 15 December 2023
Full work available at URL: http://www.mathjournals.org/jrms/2023-038-003/2023-038-003-001.html
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Analysis on (p)-adic Lie groups (22E35) Representations of Lie and linear algebraic groups over local fields (22E50) Representation-theoretic methods; automorphic representations over local and global fields (11F70)
Cites Work
- Unnamed Item
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- The unitarizability of the Aubert dual of strongly positive square integrable representations
- A unitarity criterion for p-adic groups
- Composition series of generalized principal series; the case of strongly positive discrete series
- Representations of quivers of type \(A\) and the multisegment duality
- Erratum à “Dualité dans le groupe de Grothendieck de la catégorie des représentations lisses de longueur finie d’un groupe réductif p-adique”
- Duality for Representations of a Hecke Algebra
- Construction of discrete series for classical 𝑝-adic groups
- Duality for classical 𝑝-adic groups: The half-integral case
- Classification of unitary representations in irreducible representations of general linear group (non-Archimedean case)
- Dualite Dans Le Groupe De Grothendieck De La Categorie Des Representations Lisses De Longueur Finie D'un Groupe Reductif p-Adique
- Unitary dual of p-adic group SO(7) with support on minimal parabolic subgroup
- The unitary dual of p-adic $SO(5)$
- Aubert duals of discrete series: the first inductive step
- Aubert duals of strongly positive discrete series and a class of unitarizable representations
- Reduction to Real Infinitesimal Character in Affine Hecke Algebras
- Sur certains paquets d’Arthur et involution d’Aubert-Schneider-Stuhler généralisée
- The explicit Zelevinsky–Aubert duality
- Reducibility of standard representations
- Unitarizability in Corank Three for Classical 𝑝-adic Groups
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