Counting the discrete series for GL(n)
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Publication:3429617
DOI10.1112/blms/bdl024zbMath1138.22012OpenAlexW1965360747MaRDI QIDQ3429617
Guy Henniart, Colin J. Bushnell
Publication date: 2 April 2007
Published in: Bulletin of the London Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1112/blms/bdl024
Related Items (2)
On an inequality of Bushnell-Henniart for Rankin-Selberg conductors ⋮ Local Jacquet-Langlands corespondence and congruences modulo \(\ell\)
Cites Work
- Unnamed Item
- Representations of \(GL(n)\) and division algebras over a p-adic field
- Weyl's law for the cuspidal spectrum of \(\mathrm{SL}_n\).
- Gauss sums and p-adic division algebras
- Absolute convergence of the spectral side of the Arthur trace formula for \(\text{GL}_n\)
- Orthogonality of characters of \(\text{GL}_n\) over a local field of non-zero characteristic
- Zeta functions of simple algebras
- The Admissible Dual of GL(N) via Compact Open Subgroups. (AM-129)
- Non-Abelian Congruence Gauss Sums and p -Adic Simple Algebras
- Représentations cuspidales du groupe linéaire
- Local Constants and the Tame Langlands Correspondence
- Eisensteinsche Polynomfolgen und Arithmetik in Divisionsalgebren über lokalen Körpern
- The Admissible Dual of SL(N ) II
- A Construction of the Supercuspidal Representations of GL n (F), F p-Adic
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