On admissible tensor products inp-adic Hodge theory
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Publication:4914609
DOI10.1112/S0010437X1200070XzbMath1291.11090arXiv1103.2231OpenAlexW3098897865MaRDI QIDQ4914609
Publication date: 15 April 2013
Published in: Compositio Mathematica (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1103.2231
tensor productSchur functor\(p\)-adic Hodge theorycrystalline representationsemi-stable representationde Rham representation\(p\)-adic Galois representation\(B\)-pairHodge-Tate representation
Related Items (4)
Deuring’s mass formula of a Mumford family ⋮ Geometrically irreducible \(p\)-adic local systems are de Rham up to a twist ⋮ On automorphy of certain Galois representations of \(\mathrm{GO}_{4}\)-type ⋮ Galois level and congruence ideal for -adic families of finite slope Siegel modular forms
Cites Work
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- Continuous cohomology and \(p\)-adic Galois representations
- Periods of abelian varieties with complex multiplication
- Propriétés du groupe tannakien des structures de Hodge \(p\)-adiques et torseur entre cohomologies cristalline et étale. (Properties of the Tannakian group of \(p\)-adic Hodge structures and torsor between crystalline and étale cohomologies.)
- \(p\)-adic representations and differential equations
- Analogue \(p\)-adique du théorème de Turrittin et le théorème de la monodromie \(p\)-adique.
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- A \(p\)-adic local monodromy theorem
- Lifting according to an isogeny of \(\ell\)-adic Galois representations associated to motives
- Classification of two-dimensional split trianguline representations ofp-adic fields
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