Wall-crossing formulas in Hamiltonian geometry
Identifieur interne : 001313 ( Istex/Corpus ); précédent : 001312; suivant : 001314Wall-crossing formulas in Hamiltonian geometry
Auteurs : Paul-Emile ParadanSource :
- Progress in Mathematics ; 2011.
Abstract
Abstract: In this article, we study the local invariants associated to the Hamiltonian action of a compact torus. Our main results are wall-crossing formulas between invariants attached to adjacent connected components of regular values of the moment map.
Url:
DOI: 10.1007/978-0-8176-8244-6_11
Links to Exploration step
ISTEX:5CD8FA74B489A54C5585D0CB45132DFE2EB468C5Le document en format XML
<record><TEI wicri:istexFullTextTei="biblStruct"><teiHeader><fileDesc><titleStmt><title xml:lang="en">Wall-crossing formulas in Hamiltonian geometry</title><author><name sortKey="Paradan, Paul Emile" sort="Paradan, Paul Emile" uniqKey="Paradan P" first="Paul-Emile" last="Paradan">Paul-Emile Paradan</name><affiliation><mods:affiliation>Institut de Mathématiques et de Modèlisation de Montpellier (I3M) CNRS:UMR5149, Université Montpellier II, Montpellier, France</mods:affiliation></affiliation><affiliation><mods:affiliation>E-mail: paradan@math.univ-montp2.fr</mods:affiliation></affiliation></author></titleStmt><publicationStmt><idno type="wicri:source">ISTEX</idno><idno type="RBID">ISTEX:5CD8FA74B489A54C5585D0CB45132DFE2EB468C5</idno><date when="2011" year="2011">2011</date><idno type="doi">10.1007/978-0-8176-8244-6_11</idno><idno type="url">https://api.istex.fr/document/5CD8FA74B489A54C5585D0CB45132DFE2EB468C5/fulltext/pdf</idno><idno type="wicri:Area/Istex/Corpus">001313</idno><idno type="wicri:explorRef" wicri:stream="Istex" wicri:step="Corpus" wicri:corpus="ISTEX">001313</idno></publicationStmt><sourceDesc><biblStruct><analytic><title level="a" type="main" xml:lang="en">Wall-crossing formulas in Hamiltonian geometry</title><author><name sortKey="Paradan, Paul Emile" sort="Paradan, Paul Emile" uniqKey="Paradan P" first="Paul-Emile" last="Paradan">Paul-Emile Paradan</name><affiliation><mods:affiliation>Institut de Mathématiques et de Modèlisation de Montpellier (I3M) CNRS:UMR5149, Université Montpellier II, Montpellier, France</mods:affiliation></affiliation><affiliation><mods:affiliation>E-mail: paradan@math.univ-montp2.fr</mods:affiliation></affiliation></author></analytic><monogr></monogr><series><title level="s">Progress in Mathematics</title><imprint><date>2011</date></imprint></series></biblStruct></sourceDesc></fileDesc><profileDesc><textClass></textClass><langUsage><language ident="en">en</language></langUsage></profileDesc></teiHeader><front><div type="abstract" xml:lang="en">Abstract: In this article, we study the local invariants associated to the Hamiltonian action of a compact torus. Our main results are wall-crossing formulas between invariants attached to adjacent connected components of regular values of the moment map.</div></front></TEI><istex><corpusName>springer-ebooks</corpusName><author><json:item><name>Paul-Emile Paradan</name><affiliations><json:string>Institut de Mathématiques et de Modèlisation de Montpellier (I3M) CNRS:UMR5149, Université Montpellier II, Montpellier, France</json:string><json:string>E-mail: paradan@math.univ-montp2.fr</json:string></affiliations></json:item></author><arkIstex>ark:/67375/HCB-9JT47712-M</arkIstex><language><json:string>eng</json:string></language><originalGenre><json:string>OriginalPaper</json:string></originalGenre><abstract>Abstract: In this article, we study the local invariants associated to the Hamiltonian action of a compact torus. Our main results are wall-crossing formulas between invariants attached to adjacent connected components of regular values of the moment map.</abstract><qualityIndicators><refBibsNative>false</refBibsNative><abstractWordCount>38</abstractWordCount><abstractCharCount>255</abstractCharCount><keywordCount>0</keywordCount><score>7.456</score><pdfWordCount>20043</pdfWordCount><pdfCharCount>77256</pdfCharCount><pdfVersion>1.3</pdfVersion><pdfPageCount>49</pdfPageCount><pdfPageSize>439.37 x 666.142 pts</pdfPageSize></qualityIndicators><title>Wall-crossing formulas in Hamiltonian geometry</title><chapterId><json:string>11</json:string><json:string>b978-0-8176-8244-6_11</json:string></chapterId><genre><json:string>research-article</json:string></genre><serie><title>Progress in Mathematics</title><language><json:string>unknown</json:string></language><copyrightDate>2011</copyrightDate></serie><host><title>Geometric Aspects of Analysis and Mechanics</title><language><json:string>unknown</json:string></language><copyrightDate>2011</copyrightDate><doi><json:string>10.1007/978-0-8176-8244-6</json:string></doi><eisbn><json:string>978-0-8176-8244-6</json:string></eisbn><bookId><json:string>978-0-8176-8244-6</json:string></bookId><isbn><json:string>978-0-8176-8243-9</json:string></isbn><volume>292</volume><pages><first>295</first><last>343</last></pages><genre><json:string>book-series</json:string></genre><editor><json:item><name>Johan A.C. Kolk</name><affiliations><json:string>Department of Mathematics, Utrecht University, P.O. Box 80.010, 3508 TA, Utrecht, Netherlands</json:string><json:string>E-mail: j.a.c.kolk@uu.nl</json:string></affiliations></json:item><json:item><name>Erik P. van den Ban</name><affiliations><json:string>Mathematical Institute, Utrecht University, P.O. Box 80.010, 3508 TA, Utrecht, Netherlands</json:string><json:string>E-mail: e.p.vandenban@uu.nl</json:string></affiliations></json:item></editor><subject><json:item><value>Mathematics and Statistics</value></json:item><json:item><value>Mathematics</value></json:item><json:item><value>Analysis</value></json:item><json:item><value>Geometry</value></json:item><json:item><value>Mathematical Methods in Physics</value></json:item><json:item><value>Differential Geometry</value></json:item><json:item><value>Algebraic Geometry</value></json:item><json:item><value>Group Theory and Generalizations</value></json:item></subject></host><ark><json:string>ark:/67375/HCB-9JT47712-M</json:string></ark><publicationDate>2011</publicationDate><copyrightDate>2011</copyrightDate><doi><json:string>10.1007/978-0-8176-8244-6_11</json:string></doi><id>5CD8FA74B489A54C5585D0CB45132DFE2EB468C5</id><score>1</score><fulltext><json:item><extension>pdf</extension><original>true</original><mimetype>application/pdf</mimetype><uri>https://api.istex.fr/document/5CD8FA74B489A54C5585D0CB45132DFE2EB468C5/fulltext/pdf</uri></json:item><json:item><extension>zip</extension><original>false</original><mimetype>application/zip</mimetype><uri>https://api.istex.fr/document/5CD8FA74B489A54C5585D0CB45132DFE2EB468C5/fulltext/zip</uri></json:item><istex:fulltextTEI uri="https://api.istex.fr/document/5CD8FA74B489A54C5585D0CB45132DFE2EB468C5/fulltext/tei"><teiHeader><fileDesc><titleStmt><title level="a" type="main" xml:lang="en">Wall-crossing formulas in Hamiltonian geometry</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">Birkhäuser Boston</publisher><pubPlace>Boston</pubPlace><availability><licence><p>Springer Science+Business Media, LLC, 2011</p></licence><p scheme="https://loaded-corpus.data.istex.fr/ark:/67375/XBH-3XSW68JL-F">springer</p></availability><date>2011</date></publicationStmt><notesStmt><note type="research-article" scheme="https://content-type.data.istex.fr/ark:/67375/XTP-1JC4F85T-7">research-article</note><note type="book-series" scheme="https://publication-type.data.istex.fr/ark:/67375/JMC-0G6R5W5T-Z">book-series</note></notesStmt><sourceDesc><biblStruct type="inbook"><analytic><title level="a" type="main" xml:lang="en">Wall-crossing formulas in Hamiltonian geometry</title><author xml:id="author-0000" corresp="yes"><persName><forename type="first">Paul-Emile</forename><surname>Paradan</surname></persName><email>paradan@math.univ-montp2.fr</email><affiliation>Institut de Mathématiques et de Modèlisation de Montpellier (I3M) CNRS:UMR5149, Université Montpellier II, Montpellier, France</affiliation></author><idno type="istex">5CD8FA74B489A54C5585D0CB45132DFE2EB468C5</idno><idno type="ark">ark:/67375/HCB-9JT47712-M</idno><idno type="DOI">10.1007/978-0-8176-8244-6_11</idno><idno type="ChapterID">11</idno><idno type="ChapterID">b978-0-8176-8244-6_11</idno></analytic><monogr><title level="m">Geometric Aspects of Analysis and Mechanics</title><title level="m" type="sub">In Honor of the 65th Birthday of Hans Duistermaat</title><idno type="DOI">10.1007/978-0-8176-8244-6</idno><idno type="pISBN">978-0-8176-8243-9</idno><idno type="eISBN">978-0-8176-8244-6</idno><idno type="book-title-id">214051</idno><idno type="book-id">978-0-8176-8244-6</idno><idno type="book-chapter-count">13</idno><idno type="book-volume-number">292</idno><idno type="book-sequence-number">1052</idno><editor xml:id="book-author-0000"><persName><forename type="first">Johan A.C.</forename><surname>Kolk</surname></persName><email>j.a.c.kolk@uu.nl</email><affiliation>Department of Mathematics, Utrecht University, P.O. Box 80.010, 3508 TA, Utrecht, Netherlands</affiliation></editor><editor xml:id="book-author-0001"><persName><forename type="first">Erik P.</forename><surname>van den Ban</surname></persName><email>e.p.vandenban@uu.nl</email><affiliation>Mathematical Institute, Utrecht University, P.O. Box 80.010, 3508 TA, Utrecht, Netherlands</affiliation></editor><imprint><publisher>Birkhäuser Boston</publisher><pubPlace>Boston</pubPlace><date type="published" when="2011-06-11"></date><biblScope unit="volume">292</biblScope><biblScope unit="page" from="295">295</biblScope><biblScope unit="page" to="343">343</biblScope></imprint></monogr><series><title level="s">Progress in Mathematics</title><biblScope><date>2011</date></biblScope><idno type="series-id">4848</idno></series></biblStruct></sourceDesc></fileDesc><profileDesc><creation><date>2011</date></creation><langUsage><language ident="en">en</language></langUsage><abstract xml:lang="en"><p>Abstract: In this article, we study the local invariants associated to the Hamiltonian action of a compact torus. Our main results are wall-crossing formulas between invariants attached to adjacent connected components of regular values of the moment map.</p></abstract><textClass><keywords scheme="Book-Subject-Collection"><list><label>SUCO11649</label><item><term>Mathematics and Statistics</term></item></list></keywords></textClass><textClass><keywords scheme="Book-Subject-Group"><list><label>SCM</label><label>SCM12007</label><label>SCM21006</label><label>SCP19013</label><label>SCM21022</label><label>SCM11019</label><label>SCM11078</label><item><term>Mathematics</term></item><item><term>Analysis</term></item><item><term>Geometry</term></item><item><term>Mathematical Methods in Physics</term></item><item><term>Differential Geometry</term></item><item><term>Algebraic Geometry</term></item><item><term>Group Theory and Generalizations</term></item></list></keywords></textClass></profileDesc><revisionDesc><change when="2011-06-11">Published</change><change xml:id="refBibs-istex" who="#ISTEX-API" when="2017-11-28">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/5CD8FA74B489A54C5585D0CB45132DFE2EB468C5/fulltext/txt</uri></json:item></fulltext><metadata><istex:metadataXml wicri:clean="corpus springer-ebooks 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>Birkhäuser Boston</PublisherName><PublisherLocation>Boston</PublisherLocation></PublisherInfo><Series><SeriesInfo SeriesType="Series" TocLevels="0"><SeriesID>4848</SeriesID><SeriesTitle Language="En">Progress in Mathematics</SeriesTitle><SeriesAbbreviatedTitle>Progress in Mathematics
(Birkhäuser)</SeriesAbbreviatedTitle></SeriesInfo><Book Language="En" OutputMedium="All"><BookInfo BookProductType="Contributed volume" ContainsESM="No" Language="En" MediaType="eBook" NumberingStyle="ContentOnly" OutputMedium="All" TocLevels="0"><BookID>978-0-8176-8244-6</BookID><BookTitle>Geometric Aspects of Analysis and Mechanics</BookTitle><BookSubTitle>In Honor of the 65th Birthday of Hans Duistermaat</BookSubTitle><BookVolumeNumber>292</BookVolumeNumber><BookSequenceNumber>1052</BookSequenceNumber><BookDOI>10.1007/978-0-8176-8244-6</BookDOI><BookTitleID>214051</BookTitleID><BookPrintISBN>978-0-8176-8243-9</BookPrintISBN><BookElectronicISBN>978-0-8176-8244-6</BookElectronicISBN><BookChapterCount>13</BookChapterCount><BookCopyright><CopyrightHolderName>Springer Science+Business Media, LLC</CopyrightHolderName><CopyrightYear>2011</CopyrightYear></BookCopyright><BookSubjectGroup><BookSubject Code="SCM" Type="Primary">Mathematics</BookSubject><BookSubject Code="SCM12007" Priority="1" Type="Secondary">Analysis</BookSubject><BookSubject Code="SCM21006" Priority="2" Type="Secondary">Geometry</BookSubject><BookSubject Code="SCP19013" Priority="3" Type="Secondary">Mathematical Methods in Physics</BookSubject><BookSubject Code="SCM21022" Priority="4" Type="Secondary">Differential Geometry</BookSubject><BookSubject Code="SCM11019" Priority="5" Type="Secondary">Algebraic Geometry</BookSubject><BookSubject Code="SCM11078" Priority="6" Type="Secondary">Group Theory and Generalizations</BookSubject><SubjectCollection Code="SUCO11649">Mathematics and Statistics</SubjectCollection></BookSubjectGroup><BookContext><SeriesID>4848</SeriesID></BookContext></BookInfo><BookHeader><EditorGroup><Editor AffiliationIDS="AffID1"><EditorName DisplayOrder="Western"><GivenName>Johan A.C.</GivenName><FamilyName>Kolk</FamilyName></EditorName><Contact><Phone>30253 1514</Phone><Fax>30251 8394</Fax><Email>j.a.c.kolk@uu.nl</Email></Contact></Editor><Editor AffiliationIDS="AffID2"><EditorName DisplayOrder="Western"><GivenName>Erik P.</GivenName><FamilyName>van den Ban</FamilyName></EditorName><Contact><Phone>31-30-23-15-18</Phone><Fax>31-30-251-83-94</Fax><Email>e.p.vandenban@uu.nl</Email></Contact></Editor><Affiliation ID="AffID1"><OrgDivision>Department of Mathematics</OrgDivision><OrgName>Utrecht University</OrgName><OrgAddress><Street>P.O. Box 80.010</Street><City>Utrecht</City><Postcode>3508 TA</Postcode><Country>Netherlands</Country></OrgAddress></Affiliation><Affiliation ID="AffID2"><OrgDivision>Mathematical Institute</OrgDivision><OrgName>Utrecht University</OrgName><OrgAddress><Street>P.O. Box 80.010</Street><City>Utrecht</City><Postcode>3508 TA</Postcode><Country>Netherlands</Country></OrgAddress></Affiliation></EditorGroup></BookHeader><Chapter ID="b978-0-8176-8244-6_11" Language="En" OutputMedium="All"><ChapterInfo ChapterType="OriginalPaper" ContainsESM="No" Language="En" NumberingDepth="2" NumberingStyle="ContentOnly" OutputMedium="All" TocLevels="0"><ChapterID>11</ChapterID><ChapterDOI>10.1007/978-0-8176-8244-6_11</ChapterDOI><ChapterSequenceNumber>11</ChapterSequenceNumber><ChapterTitle Language="En">Wall-crossing formulas in Hamiltonian geometry</ChapterTitle><ChapterFirstPage>295</ChapterFirstPage><ChapterLastPage>343</ChapterLastPage><ChapterCopyright><CopyrightHolderName>Springer Science+Buisness Media, LLC</CopyrightHolderName><CopyrightYear>2011</CopyrightYear></ChapterCopyright><ChapterHistory><RegistrationDate><Year>2011</Year><Month>5</Month><Day>23</Day></RegistrationDate><OnlineDate><Year>2011</Year><Month>6</Month><Day>11</Day></OnlineDate></ChapterHistory><ChapterContext><SeriesID>4848</SeriesID><BookID>978-0-8176-8244-6</BookID><BookTitle>Geometric Aspects of Analysis and Mechanics</BookTitle></ChapterContext></ChapterInfo><ChapterHeader><AuthorGroup><Author AffiliationIDS="Aff1_11" CorrespondingAffiliationID="Aff1_11"><AuthorName DisplayOrder="Western"><GivenName>Paul-Emile</GivenName><FamilyName>Paradan</FamilyName></AuthorName><Contact><Email>paradan@math.univ-montp2.fr</Email></Contact></Author><Affiliation ID="Aff1_11"><OrgDivision>Institut de Mathématiques et de Modèlisation de Montpellier (I3M) CNRS:UMR5149</OrgDivision><OrgName>Université Montpellier II</OrgName><OrgAddress><City>Montpellier</City><Country>France</Country></OrgAddress></Affiliation></AuthorGroup><Abstract ID="Abs1_11" Language="En" OutputMedium="All"><Heading>Abstract</Heading><Para>In this article, we study the local invariants associated to the Hamiltonian action of a compact torus. Our main results are wall-crossing formulas between invariants attached to adjacent connected components of regular values of the moment map.</Para></Abstract><KeywordGroup Language="En" OutputMedium="All"><Heading>Keywords</Heading><Keyword>Symplectic</Keyword><Keyword>moment map</Keyword><Keyword>geometric quantization</Keyword><Keyword>transversally elliptic</Keyword><Keyword>partition function</Keyword></KeywordGroup><ArticleNote Type="Dedication"><SimplePara><Emphasis Type="Italic">Dedicated to Hans Duistermaat on the occasion of his 65th
birthday</Emphasis></SimplePara></ArticleNote><ArticleNote Type="Misc"><SimplePara><Emphasis Type="Bold">Mathematics Subject Classification (2010):</Emphasis> 58J20, 53D20, 53D50</SimplePara></ArticleNote></ChapterHeader><NoBody></NoBody></Chapter></Book></Series></Publisher></istex:document></istex:metadataXml><mods version="3.6"><titleInfo lang="en"><title>Wall-crossing formulas in Hamiltonian geometry</title></titleInfo><titleInfo type="alternative" contentType="CDATA" lang="en"><title>Wall-crossing formulas in Hamiltonian geometry</title></titleInfo><name type="personal" displayLabel="corresp"><namePart type="given">Paul-Emile</namePart><namePart type="family">Paradan</namePart><affiliation>Institut de Mathématiques et de Modèlisation de Montpellier (I3M) CNRS:UMR5149, Université Montpellier II, Montpellier, France</affiliation><affiliation>E-mail: paradan@math.univ-montp2.fr</affiliation><role><roleTerm type="text">author</roleTerm></role></name><typeOfResource>text</typeOfResource><genre displayLabel="OriginalPaper" authority="ISTEX" authorityURI="https://content-type.data.istex.fr" type="research-article" valueURI="https://content-type.data.istex.fr/ark:/67375/XTP-1JC4F85T-7">research-article</genre><originInfo><publisher>Birkhäuser Boston</publisher><place><placeTerm type="text">Boston</placeTerm></place><dateIssued encoding="w3cdtf">2011-06-11</dateIssued><copyrightDate encoding="w3cdtf">2011</copyrightDate></originInfo><language><languageTerm type="code" authority="rfc3066">en</languageTerm><languageTerm type="code" authority="iso639-2b">eng</languageTerm></language><abstract lang="en">Abstract: In this article, we study the local invariants associated to the Hamiltonian action of a compact torus. Our main results are wall-crossing formulas between invariants attached to adjacent connected components of regular values of the moment map.</abstract><relatedItem type="host"><titleInfo><title>Geometric Aspects of Analysis and Mechanics</title><subTitle>In Honor of the 65th Birthday of Hans Duistermaat</subTitle></titleInfo><name type="personal"><namePart type="given">Johan A.C.</namePart><namePart type="family">Kolk</namePart><affiliation>Department of Mathematics, Utrecht University, P.O. Box 80.010, 3508 TA, Utrecht, Netherlands</affiliation><affiliation>E-mail: j.a.c.kolk@uu.nl</affiliation><role><roleTerm type="text">editor</roleTerm></role></name><name type="personal"><namePart type="given">Erik P.</namePart><namePart type="family">van den Ban</namePart><affiliation>Mathematical Institute, Utrecht University, P.O. Box 80.010, 3508 TA, Utrecht, Netherlands</affiliation><affiliation>E-mail: e.p.vandenban@uu.nl</affiliation><role><roleTerm type="text">editor</roleTerm></role></name><genre type="book-series" displayLabel="Contributed volume" authority="ISTEX" authorityURI="https://publication-type.data.istex.fr" valueURI="https://publication-type.data.istex.fr/ark:/67375/JMC-0G6R5W5T-Z">book-series</genre><originInfo><publisher>Springer</publisher><copyrightDate encoding="w3cdtf">2011</copyrightDate><issuance>monographic</issuance></originInfo><subject><genre>Book-Subject-Collection</genre><topic authority="SpringerSubjectCodes" authorityURI="SUCO11649">Mathematics and Statistics</topic></subject><subject><genre>Book-Subject-Group</genre><topic authority="SpringerSubjectCodes" authorityURI="SCM">Mathematics</topic><topic authority="SpringerSubjectCodes" authorityURI="SCM12007">Analysis</topic><topic authority="SpringerSubjectCodes" authorityURI="SCM21006">Geometry</topic><topic authority="SpringerSubjectCodes" authorityURI="SCP19013">Mathematical Methods in Physics</topic><topic authority="SpringerSubjectCodes" authorityURI="SCM21022">Differential Geometry</topic><topic authority="SpringerSubjectCodes" authorityURI="SCM11019">Algebraic Geometry</topic><topic authority="SpringerSubjectCodes" authorityURI="SCM11078">Group Theory and Generalizations</topic></subject><identifier type="DOI">10.1007/978-0-8176-8244-6</identifier><identifier type="ISBN">978-0-8176-8243-9</identifier><identifier type="eISBN">978-0-8176-8244-6</identifier><identifier type="BookTitleID">214051</identifier><identifier type="BookID">978-0-8176-8244-6</identifier><identifier type="BookChapterCount">13</identifier><identifier type="BookVolumeNumber">292</identifier><identifier type="BookSequenceNumber">1052</identifier><part><date>2011</date><detail type="volume"><number>292</number><caption>vol.</caption></detail><extent unit="pages"><start>295</start><end>343</end></extent></part><recordInfo><recordOrigin>Springer Science+Business Media, LLC, 2011</recordOrigin></recordInfo></relatedItem><relatedItem type="series"><titleInfo><title>Progress in Mathematics</title></titleInfo><originInfo><publisher>Springer</publisher><copyrightDate encoding="w3cdtf">2011</copyrightDate><issuance>serial</issuance></originInfo><identifier type="SeriesID">4848</identifier><recordInfo><recordOrigin>Springer Science+Business Media, LLC, 2011</recordOrigin></recordInfo></relatedItem><identifier type="istex">5CD8FA74B489A54C5585D0CB45132DFE2EB468C5</identifier><identifier type="ark">ark:/67375/HCB-9JT47712-M</identifier><identifier type="DOI">10.1007/978-0-8176-8244-6_11</identifier><identifier type="ChapterID">11</identifier><identifier type="ChapterID">b978-0-8176-8244-6_11</identifier><accessCondition type="use and reproduction" contentType="copyright">Springer Science+Business Media, LLC, 2011</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 Science+Buisness Media, LLC, 2011</recordOrigin></recordInfo></mods><json:item><extension>json</extension><original>false</original><mimetype>application/json</mimetype><uri>https://api.istex.fr/document/5CD8FA74B489A54C5585D0CB45132DFE2EB468C5/metadata/json</uri></json:item></metadata><annexes><json:item><extension>txt</extension><original>true</original><mimetype>text/plain</mimetype><uri>https://api.istex.fr/document/5CD8FA74B489A54C5585D0CB45132DFE2EB468C5/annexes/txt</uri></json:item></annexes></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 001313 | SxmlIndent | more
Ou
HfdSelect -h $EXPLOR_AREA/Data/Istex/Corpus/biblio.hfd -nk 001313 | 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:5CD8FA74B489A54C5585D0CB45132DFE2EB468C5
|texte= Wall-crossing formulas in Hamiltonian geometry
}}
| This area was generated with Dilib version V0.6.33. |  |