Questions and remarks to the Langlands programme
Identifieur interne : 000143 ( Main/Exploration ); précédent : 000142; suivant : 000144Questions and remarks to the Langlands programme
Auteurs : Aleksei N. ParshinSource :
- Russian Mathematical Surveys [ 0036-0279 ] ; 2012-06-30.
English descriptors
- KwdEn :
- Abelian, Abelian langlands correspondence, Adeles, Adelic, Adelic groups, Algebraic, Algebraic curves, Algebraic functions, Algebraic geometry, Amer, Analogue, Archimedean, Archimedean fibres, Arithmetic surfaces, Arxiv, Automorphic, Automorphic forms, Automorphic induction, Automorphic representations, Automorphism, Base change, Basic fields, Canonical, Central character, Class field theory, Cohomology, Commutative, Commutative diagram sheaves, Complex numbers, Conjecture, Cuspidal representations, Direct image, Direct image conjecture, Direct images, Drinfeld, Duality, Duality formula, Elementary factor, Embedding, English transl, Euler product, Fibre, Finite extensions, Finite field, Finite fields, Finite unramified, Frobenius, Frobenius automorphism, Functorial, Functorial properties, Fundamental group, Galois, Galois group, Galois groups, General case, General fibre, General theory, Geometric case, Geometric correspondence, Geometric langlands correspondence, Global, Global fields, Global langlands correspondence, Ground field, Higher adelic theory, Homomorphism, International congress, Inverse image, Irreducible, Irreducible curve, Irreducible representations, Kapranov, Langlands, Langlands correspondence, Langlands programme, Laurent power series, Lecture notes, Local components, Local field, Local fields, Local langlands correspondence, Math, Morphism, Morphisms, Natural embedding, Number case, Number field case, Number fields, Oregon state univ, Other hand, Parabolic, Parabolic induction, Parshin, Proc, Programme, Pure math, Rational functions, Reciprocity, Reciprocity laws, Reductive, Reductive groups, Representation, Residue field, Same time, Scheme theory, Semisimple representations, Separable closure, Sheaf, Subgroup, Sympos, Tensor, Tensor product, Univ, Unramified, Unramified automorphic forms, Unramified case, Vector space, Vector spaces, Weil, Weil group.
- Teeft :
- Abelian, Abelian langlands correspondence, Adeles, Adelic, Adelic groups, Algebraic, Algebraic curves, Algebraic functions, Algebraic geometry, Amer, Analogue, Archimedean, Archimedean fibres, Arithmetic surfaces, Arxiv, Automorphic, Automorphic forms, Automorphic induction, Automorphic representations, Automorphism, Base change, Basic fields, Canonical, Central character, Class field theory, Cohomology, Commutative, Commutative diagram sheaves, Complex numbers, Conjecture, Cuspidal representations, Direct image, Direct image conjecture, Direct images, Drinfeld, Duality, Duality formula, Elementary factor, Embedding, English transl, Euler product, Fibre, Finite extensions, Finite field, Finite fields, Finite unramified, Frobenius, Frobenius automorphism, Functorial, Functorial properties, Fundamental group, Galois, Galois group, Galois groups, General case, General fibre, General theory, Geometric case, Geometric correspondence, Geometric langlands correspondence, Global, Global fields, Global langlands correspondence, Ground field, Higher adelic theory, Homomorphism, International congress, Inverse image, Irreducible, Irreducible curve, Irreducible representations, Kapranov, Langlands, Langlands correspondence, Langlands programme, Laurent power series, Lecture notes, Local components, Local field, Local fields, Local langlands correspondence, Math, Morphism, Morphisms, Natural embedding, Number case, Number field case, Number fields, Oregon state univ, Other hand, Parabolic, Parabolic induction, Parshin, Proc, Programme, Pure math, Rational functions, Reciprocity, Reciprocity laws, Reductive, Reductive groups, Representation, Residue field, Same time, Scheme theory, Semisimple representations, Separable closure, Sheaf, Subgroup, Sympos, Tensor, Tensor product, Univ, Unramified, Unramified automorphic forms, Unramified case, Vector space, Vector spaces, Weil, Weil group.
Url:
DOI: 10.1070/RM2012v067n03ABEH004795
Affiliations:
Links toward previous steps (curation, corpus...)
- to stream Istex, to step Corpus: 000580
- to stream Istex, to step Curation: 000580
- to stream Istex, to step Checkpoint: 000109
- to stream Main, to step Merge: 000143
- to stream Main, to step Curation: 000143
Le document en format XML
<record><TEI wicri:istexFullTextTei="biblStruct"><teiHeader><fileDesc><titleStmt><title xml:lang="en">Questions and remarks to the Langlands programme</title><author><name sortKey="Parshin, Aleksei N" sort="Parshin, Aleksei N" uniqKey="Parshin A" first="Aleksei N" last="Parshin">Aleksei N. Parshin</name></author></titleStmt><publicationStmt><idno type="wicri:source">ISTEX</idno><idno type="RBID">ISTEX:1B576AA1BAEB6F41988BAA9D52BD41CF7963C379</idno><date when="2012" year="2012">2012</date><idno type="doi">10.1070/RM2012v067n03ABEH004795</idno><idno type="url">https://api.istex.fr/document/1B576AA1BAEB6F41988BAA9D52BD41CF7963C379/fulltext/pdf</idno><idno type="wicri:Area/Istex/Corpus">000580</idno><idno type="wicri:explorRef" wicri:stream="Istex" wicri:step="Corpus" wicri:corpus="ISTEX">000580</idno><idno type="wicri:Area/Istex/Curation">000580</idno><idno type="wicri:Area/Istex/Checkpoint">000109</idno><idno type="wicri:explorRef" wicri:stream="Istex" wicri:step="Checkpoint">000109</idno><idno type="wicri:doubleKey">0036-0279:2012:Parshin A:questions:and:remarks</idno><idno type="wicri:Area/Main/Merge">000143</idno><idno type="wicri:Area/Main/Curation">000143</idno><idno type="wicri:Area/Main/Exploration">000143</idno></publicationStmt><sourceDesc><biblStruct><analytic><title level="a" type="main" xml:lang="en">Questions and remarks to the Langlands programme</title><author><name sortKey="Parshin, Aleksei N" sort="Parshin, Aleksei N" uniqKey="Parshin A" first="Aleksei N" last="Parshin">Aleksei N. Parshin</name></author></analytic><monogr></monogr><series><title level="j">Russian Mathematical Surveys</title><idno type="ISSN">0036-0279</idno><idno type="eISSN">1468-4829</idno><imprint><publisher>Institute Of Physics</publisher><pubPlace>Bristol</pubPlace><date type="published" when="2012-06-30">2012-06-30</date><biblScope unit="volume">67</biblScope><biblScope unit="issue">3</biblScope><biblScope unit="page" from="509">509</biblScope><biblScope unit="page" to="539">539</biblScope><biblScope unit="range">509-539</biblScope><biblScope unit="referenceNumber">69</biblScope><biblScope unit="citationNumber">6</biblScope></imprint><idno type="ISSN">0036-0279</idno></series></biblStruct></sourceDesc><seriesStmt><idno type="ISSN">0036-0279</idno></seriesStmt></fileDesc><profileDesc><textClass><keywords scheme="KwdEn" xml:lang="en"><term>Abelian</term><term>Abelian langlands correspondence</term><term>Adeles</term><term>Adelic</term><term>Adelic groups</term><term>Algebraic</term><term>Algebraic curves</term><term>Algebraic functions</term><term>Algebraic geometry</term><term>Amer</term><term>Analogue</term><term>Archimedean</term><term>Archimedean fibres</term><term>Arithmetic surfaces</term><term>Arxiv</term><term>Automorphic</term><term>Automorphic forms</term><term>Automorphic induction</term><term>Automorphic representations</term><term>Automorphism</term><term>Base change</term><term>Basic fields</term><term>Canonical</term><term>Central character</term><term>Class field theory</term><term>Cohomology</term><term>Commutative</term><term>Commutative diagram sheaves</term><term>Complex numbers</term><term>Conjecture</term><term>Cuspidal representations</term><term>Direct image</term><term>Direct image conjecture</term><term>Direct images</term><term>Drinfeld</term><term>Duality</term><term>Duality formula</term><term>Elementary factor</term><term>Embedding</term><term>English transl</term><term>Euler product</term><term>Fibre</term><term>Finite extensions</term><term>Finite field</term><term>Finite fields</term><term>Finite unramified</term><term>Frobenius</term><term>Frobenius automorphism</term><term>Functorial</term><term>Functorial properties</term><term>Fundamental group</term><term>Galois</term><term>Galois group</term><term>Galois groups</term><term>General case</term><term>General fibre</term><term>General theory</term><term>Geometric case</term><term>Geometric correspondence</term><term>Geometric langlands correspondence</term><term>Global</term><term>Global fields</term><term>Global langlands correspondence</term><term>Ground field</term><term>Higher adelic theory</term><term>Homomorphism</term><term>International congress</term><term>Inverse image</term><term>Irreducible</term><term>Irreducible curve</term><term>Irreducible representations</term><term>Kapranov</term><term>Langlands</term><term>Langlands correspondence</term><term>Langlands programme</term><term>Laurent power series</term><term>Lecture notes</term><term>Local components</term><term>Local field</term><term>Local fields</term><term>Local langlands correspondence</term><term>Math</term><term>Morphism</term><term>Morphisms</term><term>Natural embedding</term><term>Number case</term><term>Number field case</term><term>Number fields</term><term>Oregon state univ</term><term>Other hand</term><term>Parabolic</term><term>Parabolic induction</term><term>Parshin</term><term>Proc</term><term>Programme</term><term>Pure math</term><term>Rational functions</term><term>Reciprocity</term><term>Reciprocity laws</term><term>Reductive</term><term>Reductive groups</term><term>Representation</term><term>Residue field</term><term>Same time</term><term>Scheme theory</term><term>Semisimple representations</term><term>Separable closure</term><term>Sheaf</term><term>Subgroup</term><term>Sympos</term><term>Tensor</term><term>Tensor product</term><term>Univ</term><term>Unramified</term><term>Unramified automorphic forms</term><term>Unramified case</term><term>Vector space</term><term>Vector spaces</term><term>Weil</term><term>Weil group</term></keywords><keywords scheme="Teeft" xml:lang="en"><term>Abelian</term><term>Abelian langlands correspondence</term><term>Adeles</term><term>Adelic</term><term>Adelic groups</term><term>Algebraic</term><term>Algebraic curves</term><term>Algebraic functions</term><term>Algebraic geometry</term><term>Amer</term><term>Analogue</term><term>Archimedean</term><term>Archimedean fibres</term><term>Arithmetic surfaces</term><term>Arxiv</term><term>Automorphic</term><term>Automorphic forms</term><term>Automorphic induction</term><term>Automorphic representations</term><term>Automorphism</term><term>Base change</term><term>Basic fields</term><term>Canonical</term><term>Central character</term><term>Class field theory</term><term>Cohomology</term><term>Commutative</term><term>Commutative diagram sheaves</term><term>Complex numbers</term><term>Conjecture</term><term>Cuspidal representations</term><term>Direct image</term><term>Direct image conjecture</term><term>Direct images</term><term>Drinfeld</term><term>Duality</term><term>Duality formula</term><term>Elementary factor</term><term>Embedding</term><term>English transl</term><term>Euler product</term><term>Fibre</term><term>Finite extensions</term><term>Finite field</term><term>Finite fields</term><term>Finite unramified</term><term>Frobenius</term><term>Frobenius automorphism</term><term>Functorial</term><term>Functorial properties</term><term>Fundamental group</term><term>Galois</term><term>Galois group</term><term>Galois groups</term><term>General case</term><term>General fibre</term><term>General theory</term><term>Geometric case</term><term>Geometric correspondence</term><term>Geometric langlands correspondence</term><term>Global</term><term>Global fields</term><term>Global langlands correspondence</term><term>Ground field</term><term>Higher adelic theory</term><term>Homomorphism</term><term>International congress</term><term>Inverse image</term><term>Irreducible</term><term>Irreducible curve</term><term>Irreducible representations</term><term>Kapranov</term><term>Langlands</term><term>Langlands correspondence</term><term>Langlands programme</term><term>Laurent power series</term><term>Lecture notes</term><term>Local components</term><term>Local field</term><term>Local fields</term><term>Local langlands correspondence</term><term>Math</term><term>Morphism</term><term>Morphisms</term><term>Natural embedding</term><term>Number case</term><term>Number field case</term><term>Number fields</term><term>Oregon state univ</term><term>Other hand</term><term>Parabolic</term><term>Parabolic induction</term><term>Parshin</term><term>Proc</term><term>Programme</term><term>Pure math</term><term>Rational functions</term><term>Reciprocity</term><term>Reciprocity laws</term><term>Reductive</term><term>Reductive groups</term><term>Representation</term><term>Residue field</term><term>Same time</term><term>Scheme theory</term><term>Semisimple representations</term><term>Separable closure</term><term>Sheaf</term><term>Subgroup</term><term>Sympos</term><term>Tensor</term><term>Tensor product</term><term>Univ</term><term>Unramified</term><term>Unramified automorphic forms</term><term>Unramified case</term><term>Vector space</term><term>Vector spaces</term><term>Weil</term><term>Weil group</term></keywords></textClass><langUsage><language ident="en">en</language></langUsage></profileDesc></teiHeader></TEI><affiliations><list></list><tree><noCountry><name sortKey="Parshin, Aleksei N" sort="Parshin, Aleksei N" uniqKey="Parshin A" first="Aleksei N" last="Parshin">Aleksei N. Parshin</name></noCountry></tree></affiliations></record>Pour manipuler ce document sous Unix (Dilib)
EXPLOR_STEP=$WICRI_ROOT/Wicri/Mathematiques/explor/BourbakiV1/Data/Main/Exploration
HfdSelect -h $EXPLOR_STEP/biblio.hfd -nk 000143 | SxmlIndent | more
Ou
HfdSelect -h $EXPLOR_AREA/Data/Main/Exploration/biblio.hfd -nk 000143 | SxmlIndent | more
Pour mettre un lien sur cette page dans le réseau Wicri
{{Explor lien
|wiki= Wicri/Mathematiques
|area= BourbakiV1
|flux= Main
|étape= Exploration
|type= RBID
|clé= ISTEX:1B576AA1BAEB6F41988BAA9D52BD41CF7963C379
|texte= Questions and remarks to the Langlands programme
}}
| This area was generated with Dilib version V0.6.33. |  |