Lie algebras of Galois groups arising from Hodge-Tate modules
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Publication:2559414
DOI10.2307/1970879zbMath0258.12009OpenAlexW2030279112WikidataQ100298735 ScholiaQ100298735MaRDI QIDQ2559414
Publication date: 1973
Published in: Annals of Mathematics. Second Series (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2307/1970879
Related Items (25)
A remark on algebraic groups attached to Hodge-Tate modules ⋮ On the l-adic representations attached to simple abelian varieties of type IV ⋮ Formal groups and lifts of the field of norms ⋮ Algebraic number fields ⋮ Deuring’s mass formula of a Mumford family ⋮ An Introduction to p-Adic Hodge Theory ⋮ Arithmetical Torelli theorems for K3 surfaces and for curves ⋮ On Lie algebras arising from \(p\)-adic representations in the imperfect residue field case ⋮ Adjoint Selmer groups of automorphic Galois representations of unitary type ⋮ Continuous cohomology and \(p\)-adic Galois representations ⋮ Algebraic groups associated with abelian varieties ⋮ Potential automorphy and change of weight ⋮ Kato's Euler system ⋮ $p$-adic local Langlands correspondence and weight shifting ⋮ Rigidity and unlikely intersections for formal groups ⋮ Ramified deformation problems ⋮ A remark on the rational points of abelian varieties with values in cyclotomic $Z_p$-extensions ⋮ Fontaine's programm ⋮ Modular curves and the Eisenstein ideal ⋮ Galois level and congruence ideal for -adic families of finite slope Siegel modular forms ⋮ Irreducibility of automorphic Galois representations of low dimensions ⋮ Symmetric power functoriality for holomorphic modular forms ⋮ Diophantine problems and \(p\)-adic period mappings ⋮ Big Image of Galois Representations Associated with Finite Slope p-adic Families of Modular Forms ⋮ Linear semisimple Lie algebras containing an operator with small number of eigenvalues
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