Trigonometric sums, green functions of finite groups and representations of Weyl groups
Identifieur interne : 001083 ( Istex/Corpus ); précédent : 001082; suivant : 001084Trigonometric sums, green functions of finite groups and representations of Weyl groups
Auteurs : T. A. SpringerSource :
- Inventiones Mathematicae [ 0020-9910 ] ; 1976-12-01.
English descriptors
- KwdEn :
- Acts trivially, Additive group, Adjoint, Adjoint group, Affine space, Algebra, Algebraic, Algebraic group, Algebraic groups, Base change theorem, Borel, Borel subgroup, Borel subgroups, Centralizer, Character group, Cohomology, Conjugacy, Conjugacy classes, Constant sheaf, Deligne, Direct consequence, Finite field, Finite group, Finite groups, Frobenius, Frobenius morphism, Generic point, Green function, Green functions, Grothendieck, Group characters, Identity component, Irreducible, Irreducible character, Irreducible characters, Irreducible component, Irreducible components, Irreducible representation, Isomorphic, Isomorphism, Last formula, Lecture notes, Levi subgroup, Linear transformation, Main result, Maximal, Maximal tori, Maximal torus, Morphism, Nilpotent classes, Nilpotent orbits, Nontrivial, Nontrivial character, Notation, Orthogonal, Orthogonality, Orthogonality relations, Other hand, Parabolic, Parabolic subgroup, Positive roots, Proper parabolic subgroup, Reductive, Regular element, Regular elements, Root system, Semisimple, Semisimple rank, Sheaf, Sign character, Springer, Standard representation, Subgroup, Suffices, Toral subspace, Torus, Trigonometric, Trigonometric sums, Trigonometricsums, Trivially, Unipotent, Unipotents, Weyl, Weyl group, Weyl groups.
- Teeft :
- Acts trivially, Additive group, Adjoint, Adjoint group, Affine space, Algebra, Algebraic, Algebraic group, Algebraic groups, Base change theorem, Borel, Borel subgroup, Borel subgroups, Centralizer, Character group, Cohomology, Conjugacy, Conjugacy classes, Constant sheaf, Deligne, Direct consequence, Finite field, Finite group, Finite groups, Frobenius, Frobenius morphism, Generic point, Green function, Green functions, Grothendieck, Group characters, Identity component, Irreducible, Irreducible character, Irreducible characters, Irreducible component, Irreducible components, Irreducible representation, Isomorphic, Isomorphism, Last formula, Lecture notes, Levi subgroup, Linear transformation, Main result, Maximal, Maximal tori, Maximal torus, Morphism, Nilpotent classes, Nilpotent orbits, Nontrivial, Nontrivial character, Notation, Orthogonal, Orthogonality, Orthogonality relations, Other hand, Parabolic, Parabolic subgroup, Positive roots, Proper parabolic subgroup, Reductive, Regular element, Regular elements, Root system, Semisimple, Semisimple rank, Sheaf, Sign character, Springer, Standard representation, Subgroup, Suffices, Toral subspace, Torus, Trigonometric, Trigonometric sums, Trigonometricsums, Trivially, Unipotent, Unipotents, Weyl, Weyl group, Weyl groups.
Url:
DOI: 10.1007/BF01390009
Links to Exploration step
ISTEX:52894171CE0943023B5521BBBCD2DF737F543BC4Le document en format XML
<record><TEI wicri:istexFullTextTei="biblStruct"><teiHeader><fileDesc><titleStmt><title xml:lang="en">Trigonometric sums, green functions of finite groups and representations of Weyl groups</title><author><name sortKey="Springer, T A" sort="Springer, T A" uniqKey="Springer T" first="T. A." last="Springer">T. A. Springer</name><affiliation><mods:affiliation>Mathematisch Instituut der Rijksuniversiteit Utrecht, Budapestlaan 6 De Uithof, Utrecht, The Netherlands</mods:affiliation></affiliation></author></titleStmt><publicationStmt><idno type="wicri:source">ISTEX</idno><idno type="RBID">ISTEX:52894171CE0943023B5521BBBCD2DF737F543BC4</idno><date when="1976" year="1976">1976</date><idno type="doi">10.1007/BF01390009</idno><idno type="url">https://api.istex.fr/document/52894171CE0943023B5521BBBCD2DF737F543BC4/fulltext/pdf</idno><idno type="wicri:Area/Istex/Corpus">001083</idno><idno type="wicri:explorRef" wicri:stream="Istex" wicri:step="Corpus" wicri:corpus="ISTEX">001083</idno></publicationStmt><sourceDesc><biblStruct><analytic><title level="a" type="main" xml:lang="en">Trigonometric sums, green functions of finite groups and representations of Weyl groups</title><author><name sortKey="Springer, T A" sort="Springer, T A" uniqKey="Springer T" first="T. A." last="Springer">T. A. Springer</name><affiliation><mods:affiliation>Mathematisch Instituut der Rijksuniversiteit Utrecht, Budapestlaan 6 De Uithof, Utrecht, The Netherlands</mods:affiliation></affiliation></author></analytic><monogr></monogr><series><title level="j">Inventiones Mathematicae</title><title level="j" type="abbrev">Invent Math</title><idno type="ISSN">0020-9910</idno><idno type="eISSN">1432-1297</idno><imprint><publisher>Springer-Verlag</publisher><pubPlace>Berlin/Heidelberg</pubPlace><date type="published" when="1976-12-01">1976-12-01</date><biblScope unit="volume">36</biblScope><biblScope unit="issue">1</biblScope><biblScope unit="page" from="173">173</biblScope><biblScope unit="page" to="207">207</biblScope></imprint><idno type="ISSN">0020-9910</idno></series></biblStruct></sourceDesc><seriesStmt><idno type="ISSN">0020-9910</idno></seriesStmt></fileDesc><profileDesc><textClass><keywords scheme="KwdEn" xml:lang="en"><term>Acts trivially</term><term>Additive group</term><term>Adjoint</term><term>Adjoint group</term><term>Affine space</term><term>Algebra</term><term>Algebraic</term><term>Algebraic group</term><term>Algebraic groups</term><term>Base change theorem</term><term>Borel</term><term>Borel subgroup</term><term>Borel subgroups</term><term>Centralizer</term><term>Character group</term><term>Cohomology</term><term>Conjugacy</term><term>Conjugacy classes</term><term>Constant sheaf</term><term>Deligne</term><term>Direct consequence</term><term>Finite field</term><term>Finite group</term><term>Finite groups</term><term>Frobenius</term><term>Frobenius morphism</term><term>Generic point</term><term>Green function</term><term>Green functions</term><term>Grothendieck</term><term>Group characters</term><term>Identity component</term><term>Irreducible</term><term>Irreducible character</term><term>Irreducible characters</term><term>Irreducible component</term><term>Irreducible components</term><term>Irreducible representation</term><term>Isomorphic</term><term>Isomorphism</term><term>Last formula</term><term>Lecture notes</term><term>Levi subgroup</term><term>Linear transformation</term><term>Main result</term><term>Maximal</term><term>Maximal tori</term><term>Maximal torus</term><term>Morphism</term><term>Nilpotent classes</term><term>Nilpotent orbits</term><term>Nontrivial</term><term>Nontrivial character</term><term>Notation</term><term>Orthogonal</term><term>Orthogonality</term><term>Orthogonality relations</term><term>Other hand</term><term>Parabolic</term><term>Parabolic subgroup</term><term>Positive roots</term><term>Proper parabolic subgroup</term><term>Reductive</term><term>Regular element</term><term>Regular elements</term><term>Root system</term><term>Semisimple</term><term>Semisimple rank</term><term>Sheaf</term><term>Sign character</term><term>Springer</term><term>Standard representation</term><term>Subgroup</term><term>Suffices</term><term>Toral subspace</term><term>Torus</term><term>Trigonometric</term><term>Trigonometric sums</term><term>Trigonometricsums</term><term>Trivially</term><term>Unipotent</term><term>Unipotents</term><term>Weyl</term><term>Weyl group</term><term>Weyl groups</term></keywords><keywords scheme="Teeft" xml:lang="en"><term>Acts trivially</term><term>Additive group</term><term>Adjoint</term><term>Adjoint group</term><term>Affine space</term><term>Algebra</term><term>Algebraic</term><term>Algebraic group</term><term>Algebraic groups</term><term>Base change theorem</term><term>Borel</term><term>Borel subgroup</term><term>Borel subgroups</term><term>Centralizer</term><term>Character group</term><term>Cohomology</term><term>Conjugacy</term><term>Conjugacy classes</term><term>Constant sheaf</term><term>Deligne</term><term>Direct consequence</term><term>Finite field</term><term>Finite group</term><term>Finite groups</term><term>Frobenius</term><term>Frobenius morphism</term><term>Generic point</term><term>Green function</term><term>Green functions</term><term>Grothendieck</term><term>Group characters</term><term>Identity component</term><term>Irreducible</term><term>Irreducible character</term><term>Irreducible characters</term><term>Irreducible component</term><term>Irreducible components</term><term>Irreducible representation</term><term>Isomorphic</term><term>Isomorphism</term><term>Last formula</term><term>Lecture notes</term><term>Levi subgroup</term><term>Linear transformation</term><term>Main result</term><term>Maximal</term><term>Maximal tori</term><term>Maximal torus</term><term>Morphism</term><term>Nilpotent classes</term><term>Nilpotent orbits</term><term>Nontrivial</term><term>Nontrivial character</term><term>Notation</term><term>Orthogonal</term><term>Orthogonality</term><term>Orthogonality relations</term><term>Other hand</term><term>Parabolic</term><term>Parabolic subgroup</term><term>Positive roots</term><term>Proper parabolic subgroup</term><term>Reductive</term><term>Regular element</term><term>Regular elements</term><term>Root system</term><term>Semisimple</term><term>Semisimple rank</term><term>Sheaf</term><term>Sign character</term><term>Springer</term><term>Standard representation</term><term>Subgroup</term><term>Suffices</term><term>Toral subspace</term><term>Torus</term><term>Trigonometric</term><term>Trigonometric sums</term><term>Trigonometricsums</term><term>Trivially</term><term>Unipotent</term><term>Unipotents</term><term>Weyl</term><term>Weyl group</term><term>Weyl groups</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>torus</json:string><json:string>springer</json:string><json:string>borel</json:string><json:string>semisimple</json:string><json:string>regular elements</json:string><json:string>weyl</json:string><json:string>isomorphism</json:string><json:string>maximal torus</json:string><json:string>unipotent</json:string><json:string>morphism</json:string><json:string>trigonometric</json:string><json:string>green functions</json:string><json:string>weyl group</json:string><json:string>centralizer</json:string><json:string>trigonometric sums</json:string><json:string>irreducible</json:string><json:string>borel subgroup</json:string><json:string>cohomology</json:string><json:string>irreducible components</json:string><json:string>trivially</json:string><json:string>adjoint</json:string><json:string>parabolic</json:string><json:string>constant sheaf</json:string><json:string>orthogonality</json:string><json:string>frobenius</json:string><json:string>maximal tori</json:string><json:string>trigonometricsums</json:string><json:string>acts trivially</json:string><json:string>nontrivial</json:string><json:string>algebraic</json:string><json:string>suffices</json:string><json:string>borel subgroups</json:string><json:string>deligne</json:string><json:string>irreducible characters</json:string><json:string>orthogonality relations</json:string><json:string>algebra</json:string><json:string>isomorphic</json:string><json:string>unipotents</json:string><json:string>parabolic subgroup</json:string><json:string>orthogonal</json:string><json:string>conjugacy</json:string><json:string>reductive</json:string><json:string>grothendieck</json:string><json:string>maximal</json:string><json:string>conjugacy classes</json:string><json:string>regular element</json:string><json:string>lecture notes</json:string><json:string>root system</json:string><json:string>finite group</json:string><json:string>adjoint group</json:string><json:string>algebraic groups</json:string><json:string>frobenius morphism</json:string><json:string>sheaf</json:string><json:string>character group</json:string><json:string>affine space</json:string><json:string>toral subspace</json:string><json:string>additive group</json:string><json:string>identity component</json:string><json:string>main result</json:string><json:string>finite field</json:string><json:string>irreducible character</json:string><json:string>nilpotent orbits</json:string><json:string>sign character</json:string><json:string>semisimple rank</json:string><json:string>nontrivial character</json:string><json:string>algebraic group</json:string><json:string>direct consequence</json:string><json:string>linear transformation</json:string><json:string>other hand</json:string><json:string>base change theorem</json:string><json:string>nilpotent classes</json:string><json:string>green function</json:string><json:string>proper parabolic subgroup</json:string><json:string>levi subgroup</json:string><json:string>group characters</json:string><json:string>weyl groups</json:string><json:string>last formula</json:string><json:string>finite groups</json:string><json:string>irreducible representation</json:string><json:string>irreducible component</json:string><json:string>generic point</json:string><json:string>positive roots</json:string><json:string>standard representation</json:string><json:string>notation</json:string></teeft></keywords><author><json:item><name>T. A. Springer</name><affiliations><json:string>Mathematisch Instituut der Rijksuniversiteit Utrecht, Budapestlaan 6 De Uithof, Utrecht, The Netherlands</json:string></affiliations></json:item></author><articleId><json:string>BF01390009</json:string><json:string>Art6</json:string></articleId><arkIstex>ark:/67375/1BB-ZLRP2MQ7-X</arkIstex><language><json:string>eng</json:string></language><originalGenre><json:string>OriginalPaper</json:string></originalGenre><qualityIndicators><score>7.012</score><pdfWordCount>16268</pdfWordCount><pdfCharCount>70452</pdfCharCount><pdfVersion>1.3</pdfVersion><pdfPageCount>35</pdfPageCount><pdfPageSize>417.28 x 641 pts</pdfPageSize><refBibsNative>false</refBibsNative><abstractWordCount>1</abstractWordCount><abstractCharCount>0</abstractCharCount><keywordCount>0</keywordCount></qualityIndicators><title>Trigonometric sums, green functions of finite groups and representations of Weyl groups</title><genre><json:string>research-article</json:string></genre><host><title>Inventiones Mathematicae</title><language><json:string>unknown</json:string></language><publicationDate>1976</publicationDate><copyrightDate>1976</copyrightDate><issn><json:string>0020-9910</json:string></issn><eissn><json:string>1432-1297</json:string></eissn><journalId><json:string>222</json:string></journalId><volume>36</volume><issue>1</issue><pages><first>173</first><last>207</last></pages><genre><json:string>journal</json:string></genre><subject><json:item><value>Mathematics</value></json:item><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-ZLRP2MQ7-X</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>1976</publicationDate><copyrightDate>1976</copyrightDate><doi><json:string>10.1007/BF01390009</json:string></doi><id>52894171CE0943023B5521BBBCD2DF737F543BC4</id><score>1</score><fulltext><json:item><extension>pdf</extension><original>true</original><mimetype>application/pdf</mimetype><uri>https://api.istex.fr/document/52894171CE0943023B5521BBBCD2DF737F543BC4/fulltext/pdf</uri></json:item><json:item><extension>zip</extension><original>false</original><mimetype>application/zip</mimetype><uri>https://api.istex.fr/document/52894171CE0943023B5521BBBCD2DF737F543BC4/fulltext/zip</uri></json:item><istex:fulltextTEI uri="https://api.istex.fr/document/52894171CE0943023B5521BBBCD2DF737F543BC4/fulltext/tei"><teiHeader><fileDesc><titleStmt><title level="a" type="main" xml:lang="en">Trigonometric sums, green functions of finite groups and representations of Weyl groups</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">Springer-Verlag</publisher><pubPlace>Berlin/Heidelberg</pubPlace><availability><licence><p>Springer-Verlag, 1976</p></licence><p scheme="https://loaded-corpus.data.istex.fr/ark:/67375/XBH-3XSW68JL-F">springer</p></availability><date>1976-01-15</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">Trigonometric sums, green functions of finite groups and representations of Weyl groups</title><author xml:id="author-0000"><persName><forename type="first">T.</forename><surname>Springer</surname></persName><affiliation>Mathematisch Instituut der Rijksuniversiteit Utrecht, Budapestlaan 6 De Uithof, Utrecht, The Netherlands</affiliation></author><idno type="istex">52894171CE0943023B5521BBBCD2DF737F543BC4</idno><idno type="ark">ark:/67375/1BB-ZLRP2MQ7-X</idno><idno type="DOI">10.1007/BF01390009</idno><idno type="article-id">BF01390009</idno><idno type="article-id">Art6</idno></analytic><monogr><title level="j">Inventiones Mathematicae</title><title level="j" type="abbrev">Invent Math</title><idno type="pISSN">0020-9910</idno><idno type="eISSN">1432-1297</idno><idno type="journal-ID">true</idno><idno type="issue-article-count">12</idno><idno type="volume-issue-count">0</idno><imprint><publisher>Springer-Verlag</publisher><pubPlace>Berlin/Heidelberg</pubPlace><date type="published" when="1976-12-01"></date><biblScope unit="volume">36</biblScope><biblScope unit="issue">1</biblScope><biblScope unit="page" from="173">173</biblScope><biblScope unit="page" to="207">207</biblScope></imprint></monogr></biblStruct></sourceDesc></fileDesc><profileDesc><creation><date>1976-01-15</date></creation><langUsage><language ident="en">en</language></langUsage><textClass><keywords scheme="Journal-Subject-Group"><list><label>M</label><label>M00009</label><item><term>Mathematics</term></item><item><term>Mathematics, general</term></item></list></keywords></textClass></profileDesc><revisionDesc><change when="1976-01-15">Created</change><change when="1976-12-01">Published</change><change xml:id="refBibs-istex" who="#ISTEX-API" when="2017-11-30">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/52894171CE0943023B5521BBBCD2DF737F543BC4/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>Springer-Verlag</PublisherName><PublisherLocation>Berlin/Heidelberg</PublisherLocation></PublisherInfo><Journal><JournalInfo JournalProductType="ArchiveJournal" NumberingStyle="Unnumbered"><JournalID>222</JournalID><JournalPrintISSN>0020-9910</JournalPrintISSN><JournalElectronicISSN>1432-1297</JournalElectronicISSN><JournalTitle>Inventiones Mathematicae</JournalTitle><JournalAbbreviatedTitle>Invent Math</JournalAbbreviatedTitle><JournalSubjectGroup><JournalSubject Code="M" Type="Primary">Mathematics</JournalSubject><JournalSubject Code="M00009" Priority="1" Type="Secondary">Mathematics, general</JournalSubject></JournalSubjectGroup></JournalInfo><Volume><VolumeInfo TocLevels="0" VolumeType="Regular"><VolumeIDStart>36</VolumeIDStart><VolumeIDEnd>36</VolumeIDEnd><VolumeIssueCount>0</VolumeIssueCount></VolumeInfo><Issue IssueType="Regular"><IssueInfo TocLevels="0"><IssueIDStart>1</IssueIDStart><IssueIDEnd>1</IssueIDEnd><IssueArticleCount>12</IssueArticleCount><IssueHistory><CoverDate><DateString>1976</DateString><Year>1976</Year><Month>12</Month></CoverDate></IssueHistory><IssueCopyright><CopyrightHolderName>Springer-Verlag</CopyrightHolderName><CopyrightYear>1976</CopyrightYear></IssueCopyright></IssueInfo><Article ID="Art6"><ArticleInfo ArticleType="OriginalPaper" ContainsESM="No" Language="En" NumberingStyle="Unnumbered" TocLevels="0"><ArticleID>BF01390009</ArticleID><ArticleDOI>10.1007/BF01390009</ArticleDOI><ArticleSequenceNumber>6</ArticleSequenceNumber><ArticleTitle Language="En">Trigonometric sums, green functions of finite groups and representations of Weyl groups</ArticleTitle><ArticleFirstPage>173</ArticleFirstPage><ArticleLastPage>207</ArticleLastPage><ArticleHistory><RegistrationDate><Year>2005</Year><Month>3</Month><Day>14</Day></RegistrationDate><Received><Year>1976</Year><Month>1</Month><Day>15</Day></Received></ArticleHistory><ArticleCopyright><CopyrightHolderName>Springer-Verlag</CopyrightHolderName><CopyrightYear>1976</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>222</JournalID><VolumeIDStart>36</VolumeIDStart><VolumeIDEnd>36</VolumeIDEnd><IssueIDStart>1</IssueIDStart><IssueIDEnd>1</IssueIDEnd></ArticleContext></ArticleInfo><ArticleHeader><AuthorGroup><Author AffiliationIDS="Aff1"><AuthorName DisplayOrder="Western"><GivenName>T.</GivenName><GivenName>A.</GivenName><FamilyName>Springer</FamilyName></AuthorName></Author><Affiliation ID="Aff1"><OrgName>Mathematisch Instituut der Rijksuniversiteit Utrecht</OrgName><OrgAddress><Street>Budapestlaan 6 De Uithof</Street><City>Utrecht</City><Country>The Netherlands</Country></OrgAddress></Affiliation></AuthorGroup><ArticleNote Type="Dedication"><SimplePara>To Jean-Pierre Serre</SimplePara></ArticleNote></ArticleHeader><NoBody></NoBody></Article></Issue></Volume></Journal></Publisher></istex:document></istex:metadataXml><mods version="3.6"><titleInfo lang="en"><title>Trigonometric sums, green functions of finite groups and representations of Weyl groups</title></titleInfo><titleInfo type="alternative" contentType="CDATA" lang="en"><title>Trigonometric sums, green functions of finite groups and representations of Weyl groups</title></titleInfo><name type="personal"><namePart type="given">T.</namePart><namePart type="given">A.</namePart><namePart type="family">Springer</namePart><affiliation>Mathematisch Instituut der Rijksuniversiteit Utrecht, Budapestlaan 6 De Uithof, Utrecht, The Netherlands</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>Springer-Verlag</publisher><place><placeTerm type="text">Berlin/Heidelberg</placeTerm></place><dateCreated encoding="w3cdtf">1976-01-15</dateCreated><dateIssued encoding="w3cdtf">1976-12-01</dateIssued><dateIssued encoding="w3cdtf">1976</dateIssued><copyrightDate encoding="w3cdtf">1976</copyrightDate></originInfo><language><languageTerm type="code" authority="rfc3066">en</languageTerm><languageTerm type="code" authority="iso639-2b">eng</languageTerm></language><relatedItem type="host"><titleInfo><title>Inventiones Mathematicae</title></titleInfo><titleInfo type="abbreviated"><title>Invent 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">1976-12-01</dateIssued><copyrightDate encoding="w3cdtf">1976</copyrightDate></originInfo><subject><genre>Journal-Subject-Group</genre><topic authority="SpringerSubjectCodes" authorityURI="M">Mathematics</topic><topic authority="SpringerSubjectCodes" authorityURI="M00009">Mathematics, general</topic></subject><identifier type="ISSN">0020-9910</identifier><identifier type="eISSN">1432-1297</identifier><identifier type="JournalID">222</identifier><identifier type="IssueArticleCount">12</identifier><identifier type="VolumeIssueCount">0</identifier><part><date>1976</date><detail type="volume"><number>36</number><caption>vol.</caption></detail><detail type="issue"><number>1</number><caption>no.</caption></detail><extent unit="pages"><start>173</start><end>207</end></extent></part><recordInfo><recordOrigin>Springer-Verlag, 1976</recordOrigin></recordInfo></relatedItem><identifier type="istex">52894171CE0943023B5521BBBCD2DF737F543BC4</identifier><identifier type="ark">ark:/67375/1BB-ZLRP2MQ7-X</identifier><identifier type="DOI">10.1007/BF01390009</identifier><identifier type="ArticleID">BF01390009</identifier><identifier type="ArticleID">Art6</identifier><accessCondition type="use and reproduction" contentType="copyright">Springer-Verlag, 1976</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>Springer-Verlag, 1976</recordOrigin></recordInfo></mods><json:item><extension>json</extension><original>false</original><mimetype>application/json</mimetype><uri>https://api.istex.fr/document/52894171CE0943023B5521BBBCD2DF737F543BC4/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 001083 | SxmlIndent | more
Ou
HfdSelect -h $EXPLOR_AREA/Data/Istex/Corpus/biblio.hfd -nk 001083 | 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:52894171CE0943023B5521BBBCD2DF737F543BC4
|texte= Trigonometric sums, green functions of finite groups and representations of Weyl groups
}}
| This area was generated with Dilib version V0.6.33. |  |