BourbakiV1, Istex, Corpus, bibRecord, 002003

Deformations of lie subgroups and the variation of isotropy subgroups

Identifieur interne : 002003 ( Istex/Corpus ); précédent : 002002; suivant : 002004

Deformations of lie subgroups and the variation of isotropy subgroups

Auteurs : R. W. Richardson Jr.

Source :

Acta Mathematica [ 0001-5962 ] ; 1972-12-01.

RBID : ISTEX:9C80F43FB4C874F1F8E28668E08C433776333234

English descriptors

KwdEn :
- Adjoint representation, Affine, Algebra, Algebraic, Algebraic families, Algebraic family, Algebraic group, Algebraic groups, Algebraic subgroup, Algebraic subgroups, Algebraic transformation space, Algebraic varieties, Algebraic variety, Amily, Analytic, Analytic action, Analytic families, Analytic family, Analytic functions, Analytic manifold, Analytic manifold isomorphism, Analytic manifold structure, Analytic manifolds, Analytic maps, Analytic section, Analytic submanifold, Cohomology, Complex manifold, Component group, Conjugacy, Conjugacy classes, Constructible subset, Convergent, Easy consequence, Fibre, Formal power series, Isomorphic, Isomorphism, Isomorphism classes, Isotropy, Isotropy subalgebras, Isotropy subgroup, Isotropy subgroups, Levi, Levi subgroup, Linear isomorphism, Linear representation, Morphism, Normal displacement, Normal displacement function, Ollowing conditions, Open neighborhood, Power series, Power series expansion, Proo, Quotient, Reductive, Resp, Same dimension, Subalgebra, Subalgebras, Subgroup, Submanifold, Submersion, Subset, Subvariety, Toem, Topology, Unipotent, Vector space, Zariski.
Teeft :
- Adjoint representation, Affine, Algebra, Algebraic, Algebraic families, Algebraic family, Algebraic group, Algebraic groups, Algebraic subgroup, Algebraic subgroups, Algebraic transformation space, Algebraic varieties, Algebraic variety, Amily, Analytic, Analytic action, Analytic families, Analytic family, Analytic functions, Analytic manifold, Analytic manifold isomorphism, Analytic manifold structure, Analytic manifolds, Analytic maps, Analytic section, Analytic submanifold, Cohomology, Complex manifold, Component group, Conjugacy, Conjugacy classes, Constructible subset, Convergent, Easy consequence, Fibre, Formal power series, Isomorphic, Isomorphism, Isomorphism classes, Isotropy, Isotropy subalgebras, Isotropy subgroup, Isotropy subgroups, Levi, Levi subgroup, Linear isomorphism, Linear representation, Morphism, Normal displacement, Normal displacement function, Ollowing conditions, Open neighborhood, Power series, Power series expansion, Proo, Quotient, Reductive, Resp, Same dimension, Subalgebra, Subalgebras, Subgroup, Submanifold, Submersion, Subset, Subvariety, Toem, Topology, Unipotent, Vector space, Zariski.

Url:

https://api.istex.fr/document/9C80F43FB4C874F1F8E28668E08C433776333234/fulltext/pdf

DOI: 10.1007/BF02392213

Links to Exploration step

ISTEX:9C80F43FB4C874F1F8E28668E08C433776333234

Le document en format XML

<record><TEI wicri:istexFullTextTei="biblStruct"><teiHeader><fileDesc><titleStmt><title xml:lang="en">Deformations of lie subgroups and the variation of isotropy subgroups</title>
<author><name sortKey="Richardson Jr, R W" sort="Richardson Jr, R W" uniqKey="Richardson Jr R" first="R. W." last="Richardson Jr.">R. W. Richardson Jr.</name>
<affiliation><mods:affiliation>University of Warwick Coventry, England</mods:affiliation>
</affiliation>
<affiliation><mods:affiliation>University of Washington, Seattle, Wash., USA</mods:affiliation>
</affiliation>
</author>
</titleStmt>
<publicationStmt><idno type="wicri:source">ISTEX</idno>
<idno type="RBID">ISTEX:9C80F43FB4C874F1F8E28668E08C433776333234</idno>
<date when="1972" year="1972">1972</date>
<idno type="doi">10.1007/BF02392213</idno>
<idno type="url">https://api.istex.fr/document/9C80F43FB4C874F1F8E28668E08C433776333234/fulltext/pdf</idno>
<idno type="wicri:Area/Istex/Corpus">002003</idno>
<idno type="wicri:explorRef" wicri:stream="Istex" wicri:step="Corpus" wicri:corpus="ISTEX">002003</idno>
</publicationStmt>
<sourceDesc><biblStruct><analytic><title level="a" type="main" xml:lang="en">Deformations of lie subgroups and the variation of isotropy subgroups</title>
<author><name sortKey="Richardson Jr, R W" sort="Richardson Jr, R W" uniqKey="Richardson Jr R" first="R. W." last="Richardson Jr.">R. W. Richardson Jr.</name>
<affiliation><mods:affiliation>University of Warwick Coventry, England</mods:affiliation>
</affiliation>
<affiliation><mods:affiliation>University of Washington, Seattle, Wash., USA</mods:affiliation>
</affiliation>
</author>
</analytic>
<monogr></monogr>
<series><title level="j">Acta Mathematica</title>
<title level="j" type="abbrev">Acta Math.</title>
<idno type="ISSN">0001-5962</idno>
<idno type="eISSN">1871-2509</idno>
<imprint><publisher>Kluwer Academic Publishers</publisher>
<pubPlace>Dordrecht</pubPlace>
<date type="published" when="1972-12-01">1972-12-01</date>
<biblScope unit="volume">129</biblScope>
<biblScope unit="issue">1</biblScope>
<biblScope unit="page" from="35">35</biblScope>
<biblScope unit="page" to="73">73</biblScope>
</imprint>
<idno type="ISSN">0001-5962</idno>
</series>
</biblStruct>
</sourceDesc>
<seriesStmt><idno type="ISSN">0001-5962</idno>
</seriesStmt>
</fileDesc>
<profileDesc><textClass><keywords scheme="KwdEn" xml:lang="en"><term>Adjoint representation</term>
<term>Affine</term>
<term>Algebra</term>
<term>Algebraic</term>
<term>Algebraic families</term>
<term>Algebraic family</term>
<term>Algebraic group</term>
<term>Algebraic groups</term>
<term>Algebraic subgroup</term>
<term>Algebraic subgroups</term>
<term>Algebraic transformation space</term>
<term>Algebraic varieties</term>
<term>Algebraic variety</term>
<term>Amily</term>
<term>Analytic</term>
<term>Analytic action</term>
<term>Analytic families</term>
<term>Analytic family</term>
<term>Analytic functions</term>
<term>Analytic manifold</term>
<term>Analytic manifold isomorphism</term>
<term>Analytic manifold structure</term>
<term>Analytic manifolds</term>
<term>Analytic maps</term>
<term>Analytic section</term>
<term>Analytic submanifold</term>
<term>Cohomology</term>
<term>Complex manifold</term>
<term>Component group</term>
<term>Conjugacy</term>
<term>Conjugacy classes</term>
<term>Constructible subset</term>
<term>Convergent</term>
<term>Easy consequence</term>
<term>Fibre</term>
<term>Formal power series</term>
<term>Isomorphic</term>
<term>Isomorphism</term>
<term>Isomorphism classes</term>
<term>Isotropy</term>
<term>Isotropy subalgebras</term>
<term>Isotropy subgroup</term>
<term>Isotropy subgroups</term>
<term>Levi</term>
<term>Levi subgroup</term>
<term>Linear isomorphism</term>
<term>Linear representation</term>
<term>Morphism</term>
<term>Normal displacement</term>
<term>Normal displacement function</term>
<term>Ollowing conditions</term>
<term>Open neighborhood</term>
<term>Power series</term>
<term>Power series expansion</term>
<term>Proo</term>
<term>Quotient</term>
<term>Reductive</term>
<term>Resp</term>
<term>Same dimension</term>
<term>Subalgebra</term>
<term>Subalgebras</term>
<term>Subgroup</term>
<term>Submanifold</term>
<term>Submersion</term>
<term>Subset</term>
<term>Subvariety</term>
<term>Toem</term>
<term>Topology</term>
<term>Unipotent</term>
<term>Vector space</term>
<term>Zariski</term>
</keywords>
<keywords scheme="Teeft" xml:lang="en"><term>Adjoint representation</term>
<term>Affine</term>
<term>Algebra</term>
<term>Algebraic</term>
<term>Algebraic families</term>
<term>Algebraic family</term>
<term>Algebraic group</term>
<term>Algebraic groups</term>
<term>Algebraic subgroup</term>
<term>Algebraic subgroups</term>
<term>Algebraic transformation space</term>
<term>Algebraic varieties</term>
<term>Algebraic variety</term>
<term>Amily</term>
<term>Analytic</term>
<term>Analytic action</term>
<term>Analytic families</term>
<term>Analytic family</term>
<term>Analytic functions</term>
<term>Analytic manifold</term>
<term>Analytic manifold isomorphism</term>
<term>Analytic manifold structure</term>
<term>Analytic manifolds</term>
<term>Analytic maps</term>
<term>Analytic section</term>
<term>Analytic submanifold</term>
<term>Cohomology</term>
<term>Complex manifold</term>
<term>Component group</term>
<term>Conjugacy</term>
<term>Conjugacy classes</term>
<term>Constructible subset</term>
<term>Convergent</term>
<term>Easy consequence</term>
<term>Fibre</term>
<term>Formal power series</term>
<term>Isomorphic</term>
<term>Isomorphism</term>
<term>Isomorphism classes</term>
<term>Isotropy</term>
<term>Isotropy subalgebras</term>
<term>Isotropy subgroup</term>
<term>Isotropy subgroups</term>
<term>Levi</term>
<term>Levi subgroup</term>
<term>Linear isomorphism</term>
<term>Linear representation</term>
<term>Morphism</term>
<term>Normal displacement</term>
<term>Normal displacement function</term>
<term>Ollowing conditions</term>
<term>Open neighborhood</term>
<term>Power series</term>
<term>Power series expansion</term>
<term>Proo</term>
<term>Quotient</term>
<term>Reductive</term>
<term>Resp</term>
<term>Same dimension</term>
<term>Subalgebra</term>
<term>Subalgebras</term>
<term>Subgroup</term>
<term>Submanifold</term>
<term>Submersion</term>
<term>Subset</term>
<term>Subvariety</term>
<term>Toem</term>
<term>Topology</term>
<term>Unipotent</term>
<term>Vector space</term>
<term>Zariski</term>
</keywords>
</textClass>
<langUsage><language ident="en">en</language>
</langUsage>
</profileDesc>
</teiHeader>
</TEI>
<istex><corpusName>springer-journals</corpusName>
<keywords><teeft><json:string>subgroup</json:string>
<json:string>subset</json:string>
<json:string>zariski</json:string>
<json:string>algebraic</json:string>
<json:string>open neighborhood</json:string>
<json:string>isotropy</json:string>
<json:string>analytic family</json:string>
<json:string>isomorphism</json:string>
<json:string>submanifold</json:string>
<json:string>analytic submanifold</json:string>
<json:string>submersion</json:string>
<json:string>reductive</json:string>
<json:string>power series expansion</json:string>
<json:string>isotropy subgroups</json:string>
<json:string>vector space</json:string>
<json:string>proo</json:string>
<json:string>subalgebras</json:string>
<json:string>algebraic subgroups</json:string>
<json:string>algebraic family</json:string>
<json:string>algebraic varieties</json:string>
<json:string>fibre</json:string>
<json:string>analytic manifold</json:string>
<json:string>cohomology</json:string>
<json:string>topology</json:string>
<json:string>subalgebra</json:string>
<json:string>same dimension</json:string>
<json:string>subvariety</json:string>
<json:string>amily</json:string>
<json:string>resp</json:string>
<json:string>algebraic group</json:string>
<json:string>unipotent</json:string>
<json:string>quotient</json:string>
<json:string>isomorphic</json:string>
<json:string>convergent</json:string>
<json:string>normal displacement function</json:string>
<json:string>conjugacy</json:string>
<json:string>linear representation</json:string>
<json:string>analytic section</json:string>
<json:string>algebraic subgroup</json:string>
<json:string>levi</json:string>
<json:string>algebraic transformation space</json:string>
<json:string>affine</json:string>
<json:string>formal power series</json:string>
<json:string>analytic manifolds</json:string>
<json:string>toem</json:string>
<json:string>component group</json:string>
<json:string>power series</json:string>
<json:string>linear isomorphism</json:string>
<json:string>algebraic variety</json:string>
<json:string>morphism</json:string>
<json:string>analytic action</json:string>
<json:string>algebra</json:string>
<json:string>isotropy subgroup</json:string>
<json:string>constructible subset</json:string>
<json:string>normal displacement</json:string>
<json:string>isomorphism classes</json:string>
<json:string>analytic families</json:string>
<json:string>adjoint representation</json:string>
<json:string>conjugacy classes</json:string>
<json:string>analytic manifold structure</json:string>
<json:string>analytic</json:string>
<json:string>levi subgroup</json:string>
<json:string>easy consequence</json:string>
<json:string>analytic functions</json:string>
<json:string>isotropy subalgebras</json:string>
<json:string>analytic maps</json:string>
<json:string>ollowing conditions</json:string>
<json:string>analytic manifold isomorphism</json:string>
<json:string>complex manifold</json:string>
<json:string>algebraic groups</json:string>
<json:string>algebraic families</json:string>
</teeft>
</keywords>
<author><json:item><name>R. W. Richardson Jr.</name>
<affiliations><json:string>University of Warwick Coventry, England</json:string>
<json:string>University of Washington, Seattle, Wash., USA</json:string>
</affiliations>
</json:item>
</author>
<articleId><json:string>BF02392213</json:string>
<json:string>Art3</json:string>
</articleId>
<arkIstex>ark:/67375/1BB-07KZQTJX-7</arkIstex>
<language><json:string>eng</json:string>
</language>
<originalGenre><json:string>OriginalPaper</json:string>
</originalGenre>
<qualityIndicators><score>7.012</score>
<pdfWordCount>20941</pdfWordCount>
<pdfCharCount>77330</pdfCharCount>
<pdfVersion>1.3</pdfVersion>
<pdfPageCount>39</pdfPageCount>
<pdfPageSize>620.64 x 832.28 pts</pdfPageSize>
<refBibsNative>false</refBibsNative>
<abstractWordCount>1</abstractWordCount>
<abstractCharCount>0</abstractCharCount>
<keywordCount>0</keywordCount>
</qualityIndicators>
<title>Deformations of lie subgroups and the variation of isotropy subgroups</title>
<genre><json:string>research-article</json:string>
</genre>
<host><title>Acta Mathematica</title>
<language><json:string>unknown</json:string>
</language>
<publicationDate>1972</publicationDate>
<copyrightDate>1972</copyrightDate>
<issn><json:string>0001-5962</json:string>
</issn>
<eissn><json:string>1871-2509</json:string>
</eissn>
<journalId><json:string>11511</json:string>
</journalId>
<volume>129</volume>
<issue>1</issue>
<pages><first>35</first>
<last>73</last>
</pages>
<genre><json:string>journal</json:string>
</genre>
<subject><json:item><value>Mathematics, general</value>
</json:item>
</subject>
</host>
<namedEntities><unitex><date></date>
<geogName></geogName>
<orgName></orgName>
<orgName_funder></orgName_funder>
<orgName_provider></orgName_provider>
<persName></persName>
<placeName></placeName>
<ref_url></ref_url>
<ref_bibl></ref_bibl>
<bibl></bibl>
</unitex>
</namedEntities>
<ark><json:string>ark:/67375/1BB-07KZQTJX-7</json:string>
</ark>
<categories><wos><json:string>1 - science</json:string>
<json:string>2 - mathematics</json:string>
</wos>
<scienceMetrix><json:string>1 - natural sciences</json:string>
<json:string>2 - mathematics & statistics</json:string>
<json:string>3 - general mathematics</json:string>
</scienceMetrix>
<scopus><json:string>1 - Physical Sciences</json:string>
<json:string>2 - Mathematics</json:string>
<json:string>3 - General Mathematics</json:string>
</scopus>
</categories>
<publicationDate>1972</publicationDate>
<copyrightDate>1972</copyrightDate>
<doi><json:string>10.1007/BF02392213</json:string>
</doi>
<id>9C80F43FB4C874F1F8E28668E08C433776333234</id>
<score>1</score>
<fulltext><json:item><extension>pdf</extension>
<original>true</original>
<mimetype>application/pdf</mimetype>
<uri>https://api.istex.fr/document/9C80F43FB4C874F1F8E28668E08C433776333234/fulltext/pdf</uri>
</json:item>
<json:item><extension>zip</extension>
<original>false</original>
<mimetype>application/zip</mimetype>
<uri>https://api.istex.fr/document/9C80F43FB4C874F1F8E28668E08C433776333234/fulltext/zip</uri>
</json:item>
<istex:fulltextTEI uri="https://api.istex.fr/document/9C80F43FB4C874F1F8E28668E08C433776333234/fulltext/tei"><teiHeader><fileDesc><titleStmt><title level="a" type="main" xml:lang="en">Deformations of lie subgroups and the variation of isotropy subgroups</title>
<respStmt><resp>Références bibliographiques récupérées via GROBID</resp>
<name resp="ISTEX-API">ISTEX-API (INIST-CNRS)</name>
</respStmt>
</titleStmt>
<publicationStmt><authority>ISTEX</authority>
<publisher scheme="https://publisher-list.data.istex.fr">Kluwer Academic Publishers</publisher>
<pubPlace>Dordrecht</pubPlace>
<availability><licence><p>Almqvist & Wiksell Informationsindustri AB, 1972</p>
</licence>
<p scheme="https://loaded-corpus.data.istex.fr/ark:/67375/XBH-3XSW68JL-F">springer</p>
</availability>
<date>1971-07-07</date>
</publicationStmt>
<notesStmt><note type="research-article" scheme="https://content-type.data.istex.fr/ark:/67375/XTP-1JC4F85T-7">research-article</note>
<note type="journal" scheme="https://publication-type.data.istex.fr/ark:/67375/JMC-0GLKJH51-B">journal</note>
</notesStmt>
<sourceDesc><biblStruct type="inbook"><analytic><title level="a" type="main" xml:lang="en">Deformations of lie subgroups and the variation of isotropy subgroups</title>
<author xml:id="author-0000"><persName><forename type="first">R.</forename>
<surname>Richardson Jr.</surname>
</persName>
<affiliation>University of Warwick Coventry, England</affiliation>
<affiliation>University of Washington, Seattle, Wash., USA</affiliation>
</author>
<idno type="istex">9C80F43FB4C874F1F8E28668E08C433776333234</idno>
<idno type="ark">ark:/67375/1BB-07KZQTJX-7</idno>
<idno type="DOI">10.1007/BF02392213</idno>
<idno type="article-id">BF02392213</idno>
<idno type="article-id">Art3</idno>
</analytic>
<monogr><title level="j">Acta Mathematica</title>
<title level="j" type="abbrev">Acta Math.</title>
<idno type="pISSN">0001-5962</idno>
<idno type="eISSN">1871-2509</idno>
<idno type="journal-ID">true</idno>
<idno type="issue-article-count">8</idno>
<idno type="volume-issue-count">0</idno>
<imprint><publisher>Kluwer Academic Publishers</publisher>
<pubPlace>Dordrecht</pubPlace>
<date type="published" when="1972-12-01"></date>
<biblScope unit="volume">129</biblScope>
<biblScope unit="issue">1</biblScope>
<biblScope unit="page" from="35">35</biblScope>
<biblScope unit="page" to="73">73</biblScope>
</imprint>
</monogr>
</biblStruct>
</sourceDesc>
</fileDesc>
<profileDesc><creation><date>1971-07-07</date>
</creation>
<langUsage><language ident="en">en</language>
</langUsage>
<textClass><keywords scheme="Journal Subject"><list><head>Mathematics</head>
<item><term>Mathematics, general</term>
</item>
</list>
</keywords>
</textClass>
</profileDesc>
<revisionDesc><change when="1971-07-07">Created</change>
<change when="1972-12-01">Published</change>
<change xml:id="refBibs-istex" who="#ISTEX-API" when="2017-12-2">References added</change>
</revisionDesc>
</teiHeader>
</istex:fulltextTEI>
<json:item><extension>txt</extension>
<original>false</original>
<mimetype>text/plain</mimetype>
<uri>https://api.istex.fr/document/9C80F43FB4C874F1F8E28668E08C433776333234/fulltext/txt</uri>
</json:item>
</fulltext>
<metadata><istex:metadataXml wicri:clean="corpus springer-journals not found" wicri:toSee="no header"><istex:xmlDeclaration>version="1.0" encoding="UTF-8"</istex:xmlDeclaration>
<istex:docType PUBLIC="-//Springer-Verlag//DTD A++ V2.4//EN" URI="http://devel.springer.de/A++/V2.4/DTD/A++V2.4.dtd" name="istex:docType"></istex:docType>
<istex:document><Publisher><PublisherInfo><PublisherName>Kluwer Academic Publishers</PublisherName>
<PublisherLocation>Dordrecht</PublisherLocation>
</PublisherInfo>
<Journal><JournalInfo JournalProductType="ArchiveJournal" NumberingStyle="Unnumbered"><JournalID>11511</JournalID>
<JournalPrintISSN>0001-5962</JournalPrintISSN>
<JournalElectronicISSN>1871-2509</JournalElectronicISSN>
<JournalTitle>Acta Mathematica</JournalTitle>
<JournalAbbreviatedTitle>Acta Math.</JournalAbbreviatedTitle>
<JournalSubjectGroup><JournalSubject Type="Primary">Mathematics</JournalSubject>
<JournalSubject Type="Secondary">Mathematics, general</JournalSubject>
</JournalSubjectGroup>
</JournalInfo>
<Volume><VolumeInfo TocLevels="0" VolumeType="Regular"><VolumeIDStart>129</VolumeIDStart>
<VolumeIDEnd>129</VolumeIDEnd>
<VolumeIssueCount>0</VolumeIssueCount>
</VolumeInfo>
<Issue IssueType="Regular"><IssueInfo TocLevels="0"><IssueIDStart>1</IssueIDStart>
<IssueIDEnd>1</IssueIDEnd>
<IssueArticleCount>8</IssueArticleCount>
<IssueHistory><CoverDate><DateString>1972</DateString>
<Year>1972</Year>
<Month>12</Month>
</CoverDate>
</IssueHistory>
<IssueCopyright><CopyrightHolderName>Almqvist & Wiksell Informationsindustri AB</CopyrightHolderName>
<CopyrightYear>1972</CopyrightYear>
</IssueCopyright>
</IssueInfo>
<Article ID="Art3"><ArticleInfo ArticleType="OriginalPaper" ContainsESM="No" Language="En" NumberingStyle="Unnumbered" TocLevels="0"><ArticleID>BF02392213</ArticleID>
<ArticleDOI>10.1007/BF02392213</ArticleDOI>
<ArticleSequenceNumber>3</ArticleSequenceNumber>
<ArticleTitle Language="En">Deformations of lie subgroups and the variation of isotropy subgroups</ArticleTitle>
<ArticleFirstPage>35</ArticleFirstPage>
<ArticleLastPage>73</ArticleLastPage>
<ArticleHistory><RegistrationDate><Year>2006</Year>
<Month>4</Month>
<Day>3</Day>
</RegistrationDate>
<Received><Year>1971</Year>
<Month>7</Month>
<Day>7</Day>
</Received>
</ArticleHistory>
<ArticleCopyright><CopyrightHolderName>Almqvist & Wiksell Informationsindustri AB</CopyrightHolderName>
<CopyrightYear>1972</CopyrightYear>
</ArticleCopyright>
<ArticleGrants Type="Regular"><MetadataGrant Grant="OpenAccess"></MetadataGrant>
<AbstractGrant Grant="OpenAccess"></AbstractGrant>
<BodyPDFGrant Grant="Restricted"></BodyPDFGrant>
<BodyHTMLGrant Grant="Restricted"></BodyHTMLGrant>
<BibliographyGrant Grant="Restricted"></BibliographyGrant>
<ESMGrant Grant="Restricted"></ESMGrant>
</ArticleGrants>
<ArticleContext><JournalID>11511</JournalID>
<VolumeIDStart>129</VolumeIDStart>
<VolumeIDEnd>129</VolumeIDEnd>
<IssueIDStart>1</IssueIDStart>
<IssueIDEnd>1</IssueIDEnd>
</ArticleContext>
</ArticleInfo>
<ArticleHeader><AuthorGroup><Author AffiliationIDS="Aff1 Aff2"><AuthorName DisplayOrder="Western"><GivenName>R.</GivenName>
<GivenName>W.</GivenName>
<FamilyName>Richardson</FamilyName>
<Suffix>Jr.</Suffix>
</AuthorName>
</Author>
<Affiliation ID="Aff1"><OrgName>University of Warwick Coventry</OrgName>
<OrgAddress><Country>England</Country>
</OrgAddress>
</Affiliation>
<Affiliation ID="Aff2"><OrgName>University of Washington</OrgName>
<OrgAddress><City>Seattle</City>
<State>Wash.</State>
<Country>USA</Country>
</OrgAddress>
</Affiliation>
</AuthorGroup>
<ArticleNote Type="Misc"><SimplePara>Partial support received from NSF Grant GP-21504.</SimplePara>
</ArticleNote>
</ArticleHeader>
<NoBody></NoBody>
</Article>
</Issue>
</Volume>
</Journal>
</Publisher>
</istex:document>
</istex:metadataXml>
<mods version="3.6"><titleInfo lang="en"><title>Deformations of lie subgroups and the variation of isotropy subgroups</title>
</titleInfo>
<titleInfo type="alternative" contentType="CDATA" lang="en"><title>Deformations of lie subgroups and the variation of isotropy subgroups</title>
</titleInfo>
<name type="personal"><namePart type="given">R.</namePart>
<namePart type="given">W.</namePart>
<namePart type="family">Richardson Jr.</namePart>
<affiliation>University of Warwick Coventry, England</affiliation>
<affiliation>University of Washington, Seattle, Wash., USA</affiliation>
<role><roleTerm type="text">author</roleTerm>
</role>
</name>
<typeOfResource>text</typeOfResource>
<genre type="research-article" displayLabel="OriginalPaper" authority="ISTEX" authorityURI="https://content-type.data.istex.fr" valueURI="https://content-type.data.istex.fr/ark:/67375/XTP-1JC4F85T-7">research-article</genre>
<originInfo><publisher>Kluwer Academic Publishers</publisher>
<place><placeTerm type="text">Dordrecht</placeTerm>
</place>
<dateCreated encoding="w3cdtf">1971-07-07</dateCreated>
<dateIssued encoding="w3cdtf">1972-12-01</dateIssued>
<dateIssued encoding="w3cdtf">1972</dateIssued>
<copyrightDate encoding="w3cdtf">1972</copyrightDate>
</originInfo>
<language><languageTerm type="code" authority="rfc3066">en</languageTerm>
<languageTerm type="code" authority="iso639-2b">eng</languageTerm>
</language>
<relatedItem type="host"><titleInfo><title>Acta Mathematica</title>
</titleInfo>
<titleInfo type="abbreviated"><title>Acta Math.</title>
</titleInfo>
<genre type="journal" displayLabel="Archive Journal" authority="ISTEX" valueURI="https://publication-type.data.istex.fr/ark:/67375/JMC-0GLKJH51-B">journal</genre>
<originInfo><publisher>Springer</publisher>
<dateIssued encoding="w3cdtf">1972-12-01</dateIssued>
<copyrightDate encoding="w3cdtf">1972</copyrightDate>
</originInfo>
<subject><genre>Mathematics</genre>
<topic>Mathematics, general</topic>
</subject>
<identifier type="ISSN">0001-5962</identifier>
<identifier type="eISSN">1871-2509</identifier>
<identifier type="JournalID">11511</identifier>
<identifier type="IssueArticleCount">8</identifier>
<identifier type="VolumeIssueCount">0</identifier>
<part><date>1972</date>
<detail type="volume"><number>129</number>
<caption>vol.</caption>
</detail>
<detail type="issue"><number>1</number>
<caption>no.</caption>
</detail>
<extent unit="pages"><start>35</start>
<end>73</end>
</extent>
</part>
<recordInfo><recordOrigin>Almqvist & Wiksell Informationsindustri AB, 1972</recordOrigin>
</recordInfo>
</relatedItem>
<identifier type="istex">9C80F43FB4C874F1F8E28668E08C433776333234</identifier>
<identifier type="ark">ark:/67375/1BB-07KZQTJX-7</identifier>
<identifier type="DOI">10.1007/BF02392213</identifier>
<identifier type="ArticleID">BF02392213</identifier>
<identifier type="ArticleID">Art3</identifier>
<accessCondition type="use and reproduction" contentType="copyright">Almqvist & Wiksell Informationsindustri AB, 1972</accessCondition>
<recordInfo><recordContentSource authority="ISTEX" authorityURI="https://loaded-corpus.data.istex.fr" valueURI="https://loaded-corpus.data.istex.fr/ark:/67375/XBH-3XSW68JL-F">springer</recordContentSource>
<recordOrigin>Almqvist & Wiksell Informationsindustri AB, 1972</recordOrigin>
</recordInfo>
</mods>
<json:item><extension>json</extension>
<original>false</original>
<mimetype>application/json</mimetype>
<uri>https://api.istex.fr/document/9C80F43FB4C874F1F8E28668E08C433776333234/metadata/json</uri>
</json:item>
</metadata>
<serie></serie>
</istex>
</record>

Pour manipuler ce document sous Unix (Dilib)

EXPLOR_STEP=$WICRI_ROOT/Wicri/Mathematiques/explor/BourbakiV1/Data/Istex/Corpus

HfdSelect -h $EXPLOR_STEP/biblio.hfd -nk 002003 | SxmlIndent | more

HfdSelect -h $EXPLOR_AREA/Data/Istex/Corpus/biblio.hfd -nk 002003 | SxmlIndent | more

Pour mettre un lien sur cette page dans le réseau Wicri

{{Explor lien
   |wiki=    Wicri/Mathematiques
   |area=    BourbakiV1
   |flux=    Istex
   |étape=   Corpus
   |type=    RBID
   |clé=     ISTEX:9C80F43FB4C874F1F8E28668E08C433776333234
   |texte=   Deformations of lie subgroups and the variation of isotropy subgroups
}}

This area was generated with Dilib version V0.6.33.
Data generation: Thu Jul 5 10:00:31 2018. Site generation: Sat Nov 19 17:42:07 2022

	Serveur d'exploration Bourbaki
	Attention, ce site est en cours de développement ! Attention, site généré par des moyens informatiques à partir de corpus bruts. Les informations ne sont donc pas validées.

Serveur d'exploration Bourbaki

Deformations of lie subgroups and the variation of isotropy subgroups

Deformations of lie subgroups and the variation of isotropy subgroups

Source :

English descriptors

Links to Exploration step

Le document en format XML

Pour manipuler ce document sous Unix (Dilib)

Pour mettre un lien sur cette page dans le réseau Wicri