The Langlands classification for non-connected \(p\)-adic groups
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Publication:5957370
DOI10.1007/BF02784155zbMath0995.22005MaRDI QIDQ5957370
Publication date: 15 October 2002
Published in: Israel Journal of Mathematics (Search for Journal in Brave)
Related Items (6)
On the classification of irreducible representations of affine Hecke algebras with unequal parameters ⋮ Degenerate principal series for even-orthogonal groups ⋮ Theta lifts of generic representations: the case of odd orthogonal groups ⋮ Degenerate principal series representations for quaternionic unitary groups ⋮ Jacquet modules and the Langlands classification ⋮ On supports of induced representations for \(p\)-adic special orthogonal and general spin groups
Cites Work
- Unnamed Item
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- Some remarks on degenerate principal series
- L-indistinguishability and R groups for the special linear group
- The Langlands quotient theorem for p-adic groups
- On reducibility of parabolic induction
- Langlands classification for real Lie groups with reductive Lie algebra
- Structure arising from induction and Jacquet modules of representations of classical \(p\)-adic groups
- Induced representations of reductive ${\germ p}$-adic groups. I
- Some results on the admissible representations of non-connected reductive p-adic groups
- Reducibility for Non-Connected p-Adic Groups, With G° Of Prime Index
- Degenerate principal series for symplectic and odd-orthogonal groups
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