Motivic L-functions and Galois module structures
Identifieur interne : 001A68 ( Main/Exploration ); précédent : 001A67; suivant : 001A69Motivic L-functions and Galois module structures
Auteurs : D. Burns [Royaume-Uni, États-Unis] ; M. Flach [Royaume-Uni, États-Unis]Source :
- Mathematische Annalen [ 0025-5831 ] ; 1996-05-01.
English descriptors
- KwdEn :
- Abelian, Abelian group, Abelian variety, Academic press, Algebra resp, Algebraic, Algebraic closure, Algebraic integers, Canonical, Canonical identification, Canonical invertible, Canonical isomorphism, Chinburg, Cohomologie galoisienne, Cohomology, Commutative diagram, Comparison isomorphism, Conjecture, Constant function, Continuous section, Cycle class, Dedekind ring, Determinant, Duality, Exact sequence, Extra structure, Filtration, Finite galois extension, Finite places, Finitely, Flach, Fontaine, Functor, Galois, Galois group, Galois module structures, Galois module theory, Grothendieck group, Height pairing, Inertia subgroup, Infinite places, Invertible, Isomorphism, Kato, Local completion, Mapping cone, Module, Morphism, Motivic, Motivic cohomology, Natural identification, Negative weight, Neron model, Number field, Number fields, Number theory, Orthogonal complement, Perfect complexes, Projective, Projective variety, Pure math, Regular model, Residue field, Resp, Right hand side, Sect, Spec, Such place, Tangent space, Tare motives, Tate, Tate module, Tate motives, Trivial class, Unramified, Vertical maps.
- Teeft :
- Abelian, Abelian group, Abelian variety, Academic press, Algebra resp, Algebraic, Algebraic closure, Algebraic integers, Canonical, Canonical identification, Canonical invertible, Canonical isomorphism, Chinburg, Cohomologie galoisienne, Cohomology, Commutative diagram, Comparison isomorphism, Conjecture, Constant function, Continuous section, Cycle class, Dedekind ring, Determinant, Duality, Exact sequence, Extra structure, Filtration, Finite galois extension, Finite places, Finitely, Flach, Fontaine, Functor, Galois, Galois group, Galois module structures, Galois module theory, Grothendieck group, Height pairing, Inertia subgroup, Infinite places, Invertible, Isomorphism, Kato, Local completion, Mapping cone, Module, Morphism, Motivic, Motivic cohomology, Natural identification, Negative weight, Neron model, Number field, Number fields, Number theory, Orthogonal complement, Perfect complexes, Projective, Projective variety, Pure math, Regular model, Residue field, Resp, Right hand side, Sect, Spec, Such place, Tangent space, Tare motives, Tate, Tate module, Tate motives, Trivial class, Unramified, Vertical maps.
Url:
DOI: 10.1007/BF01444212
Affiliations:
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weight</term><term>Neron model</term><term>Number field</term><term>Number fields</term><term>Number theory</term><term>Orthogonal complement</term><term>Perfect complexes</term><term>Projective</term><term>Projective variety</term><term>Pure math</term><term>Regular model</term><term>Residue field</term><term>Resp</term><term>Right hand side</term><term>Sect</term><term>Spec</term><term>Such place</term><term>Tangent space</term><term>Tare motives</term><term>Tate</term><term>Tate module</term><term>Tate motives</term><term>Trivial class</term><term>Unramified</term><term>Vertical maps</term></keywords><keywords scheme="Teeft" xml:lang="en"><term>Abelian</term><term>Abelian group</term><term>Abelian variety</term><term>Academic press</term><term>Algebra resp</term><term>Algebraic</term><term>Algebraic closure</term><term>Algebraic integers</term><term>Canonical</term><term>Canonical identification</term><term>Canonical invertible</term><term>Canonical 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Burns</name></region><name sortKey="Flach, M" sort="Flach, M" uniqKey="Flach M" first="M." last="Flach">M. Flach</name></country><country name="États-Unis"><region name="New Jersey"><name sortKey="Burns, D" sort="Burns, D" uniqKey="Burns D" first="D." last="Burns">D. Burns</name></region><name sortKey="Flach, M" sort="Flach, M" uniqKey="Flach M" first="M." last="Flach">M. Flach</name></country></tree></affiliations></record>Pour manipuler ce document sous Unix (Dilib)
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