<rdf:RDF xmlns:rdf="http://www.w3.org/1999/02/22-rdf-syntax-ns#" xmlns:dcterms="http://purl.org/dc/terms/">
<rdf:Description rdf:about="https://archives.ihes.fr/document/M_82_46.pdf">
    <dcterms:title><![CDATA[Monodromy of hypergeometric functions and non-lattice integral monodromy]]></dcterms:title>
    <dcterms:subject><![CDATA[FONCTIONS HYPERGEOMETRIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[GROUPES DE MONODROMIE]]></dcterms:subject>
    <dcterms:subject><![CDATA[ARITHMETIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[FORMES HERMITIENNES]]></dcterms:subject>
    <dcterms:subject><![CDATA[ISOMETRIE]]></dcterms:subject>
    <dcterms:subject><![CDATA[INTEGRALES]]></dcterms:subject>
    <dcterms:subject><![CDATA[COMPACTIFICATIONS]]></dcterms:subject>
    <dcterms:creator><![CDATA[DELIGNE]]></dcterms:creator>
    <dcterms:creator><![CDATA[MOSTOW]]></dcterms:creator>
    <dcterms:source><![CDATA[M/82/46]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[07/1982]]></dcterms:date>
    <dcterms:relation><![CDATA[Deligne P. / Mostow G. D. Monodromy of hypergeometric functions and non-lattice integral monodromy. Publications Mathématiques de l’Institut des Hautes Scientifiques 63 p. 5–89 (1986). https://doi.org/10.1007/BF02831622]]></dcterms:relation>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[66 f.]]></dcterms:format>
    <dcterms:language><![CDATA[EN]]></dcterms:language>
    <dcterms:type><![CDATA[TEXTE]]></dcterms:type>
    <dcterms:type><![CDATA[PREPUBLICATION]]></dcterms:type>
    <dcterms:identifier><![CDATA[M_82_46.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1982]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[DELIGNE]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[MOSTOW]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://archives.ihes.fr/document/P_78_216.pdf">
    <dcterms:title><![CDATA[Analysis of ?1232 polarization]]></dcterms:title>
    <dcterms:subject><![CDATA[POLARISATION]]></dcterms:subject>
    <dcterms:subject><![CDATA[SPIN]]></dcterms:subject>
    <dcterms:subject><![CDATA[SPHERE]]></dcterms:subject>
    <dcterms:subject><![CDATA[ELECTROMAGNETISME]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : The observed polarization domain of a spin 3/2 ? produced in a quasi two body or incluseve reaction is a sphere in three dimensions when the beam and the targert are unpolarized and a sphere in five dimensions otherwise. In the strong, electromagnetic or neutrino production of ?&#039;s we study what information can be gained with the use of olarized beam or target and we compare the predictions of some models.]]></dcterms:description>
    <dcterms:creator><![CDATA[MICHEL]]></dcterms:creator>
    <dcterms:creator><![CDATA[DONCEL]]></dcterms:creator>
    <dcterms:creator><![CDATA[MINNAERT]]></dcterms:creator>
    <dcterms:source><![CDATA[P/78/216]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[03/1978]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[15 f.]]></dcterms:format>
    <dcterms:language><![CDATA[EN]]></dcterms:language>
    <dcterms:type><![CDATA[TEXTE]]></dcterms:type>
    <dcterms:type><![CDATA[PREPUBLICATION]]></dcterms:type>
    <dcterms:identifier><![CDATA[P_78_216.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1978]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[MICHEL]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[DONCEL]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[MINNAERT]]></dcterms:rightsHolder>
</rdf:Description></rdf:RDF>