The graded Lie algebra of a Kähler group
Identifieur interne : 000505 ( Main/Exploration ); précédent : 000504; suivant : 000506The graded Lie algebra of a Kähler group
Auteurs : Rüdiger PlantikoSource :
- Forum Mathematicum [ 0933-7741 ] ; 1996.
English descriptors
- KwdEn :
- Affine, Affine scheme, Algebra, Algebra homomorphisms, Arbitrary group, Bijection, Central series, Cocycle group, Collection process, Combinatorial group theory, Compact kahler manifold, Compact kahler manifolds, Deformation theory, Finite presentation, Finitely, Free group, Fundamental group, Fundamental groups, General case, Kahler group, Kahler groups, Kahler manifold, Kahler manifolds, Nilpotent group, Nilpotent groups, Nilpotent kahler groups, Other hand, Perfect analogy, Plantiko, Quadratic, Quadratic relations, Quadratic singularity theorem, Representation space, Representation spaces, Space germ, Tangent cone, Thefree group, Trivial representation, Universal envelopping algebra, Universal property, Vector space.
- Teeft :
- Affine, Affine scheme, Algebra, Algebra homomorphisms, Arbitrary group, Bijection, Central series, Cocycle group, Collection process, Combinatorial group theory, Compact kahler manifold, Compact kahler manifolds, Deformation theory, Finite presentation, Finitely, Free group, Fundamental group, Fundamental groups, General case, Kahler group, Kahler groups, Kahler manifold, Kahler manifolds, Nilpotent group, Nilpotent groups, Nilpotent kahler groups, Other hand, Perfect analogy, Plantiko, Quadratic, Quadratic relations, Quadratic singularity theorem, Representation space, Representation spaces, Space germ, Tangent cone, Thefree group, Trivial representation, Universal envelopping algebra, Universal property, Vector space.
Url:
DOI: 10.1515/form.1996.8.569
Affiliations:
Links toward previous steps (curation, corpus...)
- to stream Istex, to step Corpus: 003284
- to stream Istex, to step Curation: 003284
- to stream Istex, to step Checkpoint: 000460
- to stream Main, to step Merge: 000509
- to stream Main, to step Curation: 000505
Le document en format XML
<record><TEI wicri:istexFullTextTei="biblStruct"><teiHeader><fileDesc><titleStmt><title xml:lang="en">The graded Lie algebra of a Kähler group</title>
<author wicri:is="90%"><name sortKey="Plantiko, Rudiger" sort="Plantiko, Rudiger" uniqKey="Plantiko R" first="Rüdiger" last="Plantiko">Rüdiger Plantiko</name>
</author>
</titleStmt>
<publicationStmt><idno type="wicri:source">ISTEX</idno>
<idno type="RBID">ISTEX:F7ADE7F4880343C39474D0A90B7F8F9856EAD3A0</idno>
<date when="2009" year="2009">2009</date>
<idno type="doi">10.1515/form.1996.8.569</idno>
<idno type="url">https://api.istex.fr/document/F7ADE7F4880343C39474D0A90B7F8F9856EAD3A0/fulltext/pdf</idno>
<idno type="wicri:Area/Istex/Corpus">003284</idno>
<idno type="wicri:explorRef" wicri:stream="Istex" wicri:step="Corpus" wicri:corpus="ISTEX">003284</idno>
<idno type="wicri:Area/Istex/Curation">003284</idno>
<idno type="wicri:Area/Istex/Checkpoint">000460</idno>
<idno type="wicri:explorRef" wicri:stream="Istex" wicri:step="Checkpoint">000460</idno>
<idno type="wicri:doubleKey">0933-7741:2009:Plantiko R:the:graded:lie</idno>
<idno type="wicri:Area/Main/Merge">000509</idno>
<idno type="wicri:Area/Main/Curation">000505</idno>
<idno type="wicri:Area/Main/Exploration">000505</idno>
</publicationStmt>
<sourceDesc><biblStruct><analytic><title level="a" type="main" xml:lang="en">The graded Lie algebra of a Kähler group</title>
<author wicri:is="90%"><name sortKey="Plantiko, Rudiger" sort="Plantiko, Rudiger" uniqKey="Plantiko R" first="Rüdiger" last="Plantiko">Rüdiger Plantiko</name>
</author>
</analytic>
<monogr></monogr>
<series><title level="j">Forum Mathematicum</title>
<title level="j" type="abbrev">Forum Mathematicum</title>
<idno type="ISSN">0933-7741</idno>
<idno type="eISSN">1435-5337</idno>
<imprint><publisher>Walter de Gruyter, Berlin / New York</publisher>
<pubPlace>Berlin, New York</pubPlace>
<date type="published" when="1996">1996</date>
<biblScope unit="volume">8</biblScope>
<biblScope unit="issue">8</biblScope>
<biblScope unit="page" from="569">569</biblScope>
<biblScope unit="page" to="584">584</biblScope>
</imprint>
<idno type="ISSN">0933-7741</idno>
</series>
</biblStruct>
</sourceDesc>
<seriesStmt><idno type="ISSN">0933-7741</idno>
</seriesStmt>
</fileDesc>
<profileDesc><textClass><keywords scheme="KwdEn" xml:lang="en"><term>Affine</term>
<term>Affine scheme</term>
<term>Algebra</term>
<term>Algebra homomorphisms</term>
<term>Arbitrary group</term>
<term>Bijection</term>
<term>Central series</term>
<term>Cocycle group</term>
<term>Collection process</term>
<term>Combinatorial group theory</term>
<term>Compact kahler manifold</term>
<term>Compact kahler manifolds</term>
<term>Deformation theory</term>
<term>Finite presentation</term>
<term>Finitely</term>
<term>Free group</term>
<term>Fundamental group</term>
<term>Fundamental groups</term>
<term>General case</term>
<term>Kahler group</term>
<term>Kahler groups</term>
<term>Kahler manifold</term>
<term>Kahler manifolds</term>
<term>Nilpotent group</term>
<term>Nilpotent groups</term>
<term>Nilpotent kahler groups</term>
<term>Other hand</term>
<term>Perfect analogy</term>
<term>Plantiko</term>
<term>Quadratic</term>
<term>Quadratic relations</term>
<term>Quadratic singularity theorem</term>
<term>Representation space</term>
<term>Representation spaces</term>
<term>Space germ</term>
<term>Tangent cone</term>
<term>Thefree group</term>
<term>Trivial representation</term>
<term>Universal envelopping algebra</term>
<term>Universal property</term>
<term>Vector space</term>
</keywords>
<keywords scheme="Teeft" xml:lang="en"><term>Affine</term>
<term>Affine scheme</term>
<term>Algebra</term>
<term>Algebra homomorphisms</term>
<term>Arbitrary group</term>
<term>Bijection</term>
<term>Central series</term>
<term>Cocycle group</term>
<term>Collection process</term>
<term>Combinatorial group theory</term>
<term>Compact kahler manifold</term>
<term>Compact kahler manifolds</term>
<term>Deformation theory</term>
<term>Finite presentation</term>
<term>Finitely</term>
<term>Free group</term>
<term>Fundamental group</term>
<term>Fundamental groups</term>
<term>General case</term>
<term>Kahler group</term>
<term>Kahler groups</term>
<term>Kahler manifold</term>
<term>Kahler manifolds</term>
<term>Nilpotent group</term>
<term>Nilpotent groups</term>
<term>Nilpotent kahler groups</term>
<term>Other hand</term>
<term>Perfect analogy</term>
<term>Plantiko</term>
<term>Quadratic</term>
<term>Quadratic relations</term>
<term>Quadratic singularity theorem</term>
<term>Representation space</term>
<term>Representation spaces</term>
<term>Space germ</term>
<term>Tangent cone</term>
<term>Thefree group</term>
<term>Trivial representation</term>
<term>Universal envelopping algebra</term>
<term>Universal property</term>
<term>Vector space</term>
</keywords>
</textClass>
<langUsage><language ident="en">en</language>
</langUsage>
</profileDesc>
</teiHeader>
</TEI>
<affiliations><list></list>
<tree><noCountry><name sortKey="Plantiko, Rudiger" sort="Plantiko, Rudiger" uniqKey="Plantiko R" first="Rüdiger" last="Plantiko">Rüdiger Plantiko</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 000505 | SxmlIndent | more
Ou
HfdSelect -h $EXPLOR_AREA/Data/Main/Exploration/biblio.hfd -nk 000505 | 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:F7ADE7F4880343C39474D0A90B7F8F9856EAD3A0 |texte= The graded Lie algebra of a Kähler group }}
This area was generated with Dilib version V0.6.33. |