COCENTERS OF -ADIC GROUPS, I: NEWTON DECOMPOSITION
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Publication:4635502
DOI10.1017/fmp.2018.1zbMath1392.22009arXiv1610.04791OpenAlexW2963208202MaRDI QIDQ4635502
Publication date: 23 April 2018
Published in: Forum of Mathematics, Pi (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1610.04791
reductive groupHecke algebra\(p\)-adic groupIwahori subgroupcocenterHowe's conjectureNewton decompositionIwahori-Matsumoto generatorsrigid cocenter
Hecke algebras and their representations (20C08) Representations of Lie and linear algebraic groups over local fields (22E50)
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Cocenter of \(p\)-adic groups. II: Induction map ⋮ Cocenters of \(p\)-adic groups. III: Elliptic and rigid cocenters ⋮ A geometric interpretation of Newton strata ⋮ Jordan decompositions of cocenters of reductive 𝑝-adic groups
Cites Work
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- Twisted loop groups and their affine flag varieties. With an appendix by T. Haines and M. Rapoport.
- Reductive groups on a local field. II. Groups schemes. Existence of valuated root datum
- Cuspidal geometry of p-adic groups
- Representations of groups over close local fields
- Trace Paley-Wiener theorem for reductive p-adic groups
- Orbital integrals on p-adic groups: A proof of the Howe conjecture
- Kac-Moody groups, their flag varieties and representation theory
- \(l\)-modular representations of a \(p\)-adic reductive group with \(l\neq p\)
- On the \(K_0\) of a \(p\)-adic group
- Cocenters and representations of affine Hecke algebras
- Geometric and homological properties of affine Deligne-Lusztig varieties
- On the Iwahori-Weyl group
- Minimal length elements of extended affine Weyl groups
- Kottwitz-Rapoport conjecture on unions of affine Deligne-Lusztig varieties
- The local Langlands correspondence for GSp4 over local function fields
- A new proof of the Howe Conjecture
