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<rdf:Description rdf:about="https://omeka.ihes.fr/document/M_89_45.pdf">
    <dcterms:title><![CDATA[Bounded structure of infinitely renormalizable mappings]]></dcterms:title>
    <dcterms:subject><![CDATA[GEOMETRIE COMBINATOIRE]]></dcterms:subject>
    <dcterms:subject><![CDATA[RIGIDITE]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/89/45]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[07/1989]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[6 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_89_45.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1989]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_83_39.pdf">
    <dcterms:title><![CDATA[Related aspects of positivity : ?-potential theory on manifolds, lowest eigenstates, Hausdorff geometry, renormalized Markoff processes...]]></dcterms:title>
    <dcterms:subject><![CDATA[POSITIVITE]]></dcterms:subject>
    <dcterms:subject><![CDATA[GEOMETRIE DIFFERENTIELLE]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/83/39]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[07/1983]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[23 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_83_39.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1983]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_83_24.pdf">
    <dcterms:title><![CDATA[Function theory, random paths, and covering spaces]]></dcterms:title>
    <dcterms:subject><![CDATA[FONCTIONS]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEORIE ERGODIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEORIE DU POTENTIEL]]></dcterms:subject>
    <dcterms:subject><![CDATA[VARIETES]]></dcterms:subject>
    <dcterms:subject><![CDATA[ENSEMBLES ALEATOIRES]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:creator><![CDATA[LYONS]]></dcterms:creator>
    <dcterms:source><![CDATA[M/83/24]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[04/1983]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[24 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_83_24.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1983]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[LYONS]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_83_01.pdf">
    <dcterms:title><![CDATA[Quasi conformal homeomorphisms and dynamics. III Topological conjugacy classes of analytic endomorphisms]]></dcterms:title>
    <dcterms:subject><![CDATA[HOMEOMORPHISMES]]></dcterms:subject>
    <dcterms:subject><![CDATA[SURFACES DE RIEMANN]]></dcterms:subject>
    <dcterms:subject><![CDATA[TOPOLOGIE]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEORIE DES GROUPES]]></dcterms:subject>
    <dcterms:subject><![CDATA[ENDOMORPHISMES]]></dcterms:subject>
    <dcterms:subject><![CDATA[METHODE DE NEWTON]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/83/01]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[01/1983]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[20 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_83_01.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1983]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_82_60.pdf">
    <dcterms:title><![CDATA[Quasi conformal homeomorphisms and dynamics. II - Structural stability implies hyperbolicity for Kleinian groups]]></dcterms:title>
    <dcterms:subject><![CDATA[HOMEOMORPHISMES]]></dcterms:subject>
    <dcterms:subject><![CDATA[SURFACES DE RIEMANN]]></dcterms:subject>
    <dcterms:subject><![CDATA[GROUPES DE KLEIN]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/82/60]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[11/1982]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[16 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_60.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1982]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_82_59.pdf">
    <dcterms:title><![CDATA[Quasi conformal homeomorphisms and dynamics. I - Solution of the Fatou-Julia problem on wandering domains]]></dcterms:title>
    <dcterms:subject><![CDATA[HOMEOMORPHISMES]]></dcterms:subject>
    <dcterms:subject><![CDATA[SURFACES DE RIEMANN]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEOREMES]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEORIES DES POINTS CRITIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[TOPOLOGIE]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/82/59]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[11/1982]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[16 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_59.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1982]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_82_52.pdf">
    <dcterms:title><![CDATA[The Dirichlet problem at infinity for a negatively curved manifold]]></dcterms:title>
    <dcterms:subject><![CDATA[GEOMETRIE DE RIEMANN]]></dcterms:subject>
    <dcterms:subject><![CDATA[PROBLEME DE DIRICHLET]]></dcterms:subject>
    <dcterms:subject><![CDATA[VARIETES]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/82/52]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[10/1982]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[8 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_52.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1982]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_82_50.pdf">
    <dcterms:title><![CDATA[Conformal dynamical systems]]></dcterms:title>
    <dcterms:subject><![CDATA[SYSTEMES DYNAMIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[VARIETES]]></dcterms:subject>
    <dcterms:subject><![CDATA[RADON]]></dcterms:subject>
    <dcterms:subject><![CDATA[SCHISTE ARGILEUX]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/82/50]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[09/1982]]></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[M_82_50.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1982]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_82_12.pdf">
    <dcterms:title><![CDATA[Seminar on conformal and hyperbolic geometry]]></dcterms:title>
    <dcterms:subject><![CDATA[CONGRES ET CONFERENCES]]></dcterms:subject>
    <dcterms:subject><![CDATA[GEOMETRIE HYPERBOLIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[GEOMETRIE CONFORME]]></dcterms:subject>
    <dcterms:subject><![CDATA[SYSTEMES DYNAMIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[ENSEMBLES DE JULIA]]></dcterms:subject>
    <dcterms:description><![CDATA[Notes by M. Baker and J. Seade]]></dcterms:description>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/82/12]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[03/1982]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[48 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_12.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1982]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_79_269.pdf">
    <dcterms:title><![CDATA[Manifolds with canonical coordinate charts : some examples]]></dcterms:title>
    <dcterms:subject><![CDATA[VARIETES]]></dcterms:subject>
    <dcterms:subject><![CDATA[ESPACES HOMOGENES]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:creator><![CDATA[THURSTON]]></dcterms:creator>
    <dcterms:source><![CDATA[M/79/269]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[04/1979]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[9 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_79_269.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1979]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[THURSTON]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_79_261.pdf">
    <dcterms:title><![CDATA[The Density at infinity of a discrete group of hyperbolic motions]]></dcterms:title>
    <dcterms:subject><![CDATA[THEORIE ERGODIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEORIE DE LA MESURE]]></dcterms:subject>
    <dcterms:subject><![CDATA[TRANSFORMATIONS]]></dcterms:subject>
    <dcterms:subject><![CDATA[SURFACES DE RIEMANN]]></dcterms:subject>
    <dcterms:subject><![CDATA[GROUPES DE KLEIN]]></dcterms:subject>
    <dcterms:description><![CDATA[Dedicated to Rufus Bowen]]></dcterms:description>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/79/261]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[03/1979]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[27 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_79_261.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1979]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_78_229.pdf">
    <dcterms:title><![CDATA[On the Ergodic theory at infinity of an arbitrary discrete group of hyperbolic motions]]></dcterms:title>
    <dcterms:subject><![CDATA[THEORIE ERGODIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[GROUPES DISCRETS]]></dcterms:subject>
    <dcterms:subject><![CDATA[MOUVEMENT]]></dcterms:subject>
    <dcterms:subject><![CDATA[HYPERBOLES]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/78/229]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[06/1978]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[18 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_78_229.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1978]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_78_202.pdf">
    <dcterms:title><![CDATA[A Fioliation of geodesics in characterized by having no tangent homologies and a homological characterization of foliations consisting of minimal surfaces]]></dcterms:title>
    <dcterms:subject><![CDATA[GEODESIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[HOMOLOGIE]]></dcterms:subject>
    <dcterms:subject><![CDATA[TANGENTES]]></dcterms:subject>
    <dcterms:subject><![CDATA[SURFACES MINIMALES]]></dcterms:subject>
    <dcterms:description><![CDATA[Dedicated to the memory of George Cooke.]]></dcterms:description>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/78/202]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[01/1978]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[7 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_78_202.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1978]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_78_200B.pdf">
    <dcterms:title><![CDATA[Hyperbolic geometry and homeomorphisms]]></dcterms:title>
    <dcterms:subject><![CDATA[GEOMETRIE HYPERBOLIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[HOMEOMORPHISMES]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/78/200B]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[01/1978]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[7 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_78_200B.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1978]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_78_200A.pdf">
    <dcterms:title><![CDATA[Hyperbolic geometry and homomorphisms. (Suivi de) On Complexes that are Lipschitz manifolds]]></dcterms:title>
    <dcterms:subject><![CDATA[GEOMETRIE HYPERBOLIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[HOMEOMORPHISMES]]></dcterms:subject>
    <dcterms:subject><![CDATA[VARIETES]]></dcterms:subject>
    <dcterms:subject><![CDATA[COMPLEXES]]></dcterms:subject>
    <dcterms:subject><![CDATA[CONGRES ET CONFERENCES]]></dcterms:subject>
    <dcterms:description><![CDATA[Two papers for the proceedings of the Athnes, Georgia Topology Conference of August, 1977]]></dcterms:description>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:creator><![CDATA[SIEBENMANN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/78/200A]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[01/1978]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[21 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_78_200A.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1978]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SIEBENMANN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_76_136.pdf">
    <dcterms:title><![CDATA[Cycles for the dynamical study of foliated manifolds and complex manifolds]]></dcterms:title>
    <dcterms:subject><![CDATA[DISTRIBUTION]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEORIE DES PROBABILITES]]></dcterms:subject>
    <dcterms:subject><![CDATA[HOMOLOGIE]]></dcterms:subject>
    <dcterms:subject><![CDATA[CHAMPS VECTORIELS]]></dcterms:subject>
    <dcterms:subject><![CDATA[FEUILLETAGES]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/76/136]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[02/1976]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[33 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_76_136.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1976]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_75_123.pdf">
    <dcterms:title><![CDATA[A New flow]]></dcterms:title>
    <dcterms:subject><![CDATA[DYNAMIQUE TOPOLOGIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[FLUX]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/75/123]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[10/1975]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[3 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_75_123.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1975]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_75_113.pdf">
    <dcterms:title><![CDATA[A Counterexample to the periodic orbit conjecture]]></dcterms:title>
    <dcterms:subject><![CDATA[CERCLE]]></dcterms:subject>
    <dcterms:subject><![CDATA[ORBITES]]></dcterms:subject>
    <dcterms:subject><![CDATA[FONCTIONS PERIODIQUES]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/75/113]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[02/1975]]></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[M_75_113.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1975]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_75_111.pdf">
    <dcterms:title><![CDATA[Foliations with all leaves compact]]></dcterms:title>
    <dcterms:subject><![CDATA[FEUILLLETAGES]]></dcterms:subject>
    <dcterms:subject><![CDATA[MATHEMATIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEORIE GEOMETRIQUE DES GROUPES]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:creator><![CDATA[EDWARDS]]></dcterms:creator>
    <dcterms:creator><![CDATA[MILLET]]></dcterms:creator>
    <dcterms:source><![CDATA[M/75/111]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[06/1975]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[52 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_75_111.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1975]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[EDWARDS]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[MILLET]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_75_109.pdf">
    <dcterms:title><![CDATA[The Homology theory of the closed geodesic problem]]></dcterms:title>
    <dcterms:subject><![CDATA[TOPOLOGIE ALGEBRIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[HOLOTOPIE]]></dcterms:subject>
    <dcterms:subject><![CDATA[GEODESIE]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:creator><![CDATA[VIGUE-POIRRIER]]></dcterms:creator>
    <dcterms:source><![CDATA[M/75/109]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[1975]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[20 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_75_109.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1975]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[VIGUE-POIRRIER]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_74_82.pdf">
    <dcterms:title><![CDATA[A semi-local combinatorial formula for the signature of a 4k-manifold]]></dcterms:title>
    <dcterms:subject><![CDATA[SIMPLEXES]]></dcterms:subject>
    <dcterms:subject><![CDATA[MATHEMATIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[DISTRIBUTION]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEORIE DES PROBABILITES]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:creator><![CDATA[RANICKI]]></dcterms:creator>
    <dcterms:source><![CDATA[M/74/82]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[05/1974]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[9 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_74_82.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1974]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RANICKI]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_74_18.pdf">
    <dcterms:title><![CDATA[Inside and outside manifolds]]></dcterms:title>
    <dcterms:subject><![CDATA[THEORIE DE LA CLASSIFICATION]]></dcterms:subject>
    <dcterms:subject><![CDATA[VARIABLES]]></dcterms:subject>
    <dcterms:subject><![CDATA[DISTRIBUTION]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEORIE DES PROBABILITES]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/74/18]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[[12/1974]]]></dcterms:date>
    <dcterms:format><![CDATA[A]]></dcterms:format>
    <dcterms:format><![CDATA[13 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_74_18.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1974]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_74_13.pdf">
    <dcterms:title><![CDATA[Real homotopy of Kähler manifolds]]></dcterms:title>
    <dcterms:subject><![CDATA[VARIETES KAHLERIENNES]]></dcterms:subject>
    <dcterms:subject><![CDATA[TOPOLOGIE ALGEBRIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[ALGEBRE DIFFERENTIELLE]]></dcterms:subject>
    <dcterms:subject><![CDATA[VARIETES]]></dcterms:subject>
    <dcterms:subject><![CDATA[HOMOTOPIE]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:creator><![CDATA[DELIGNE ]]></dcterms:creator>
    <dcterms:creator><![CDATA[GRIFFITH]]></dcterms:creator>
    <dcterms:creator><![CDATA[MORGAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/74/13]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[10/1974]]></dcterms:date>
    <dcterms:relation><![CDATA[Deligne P. / Griffiths, P. / Morgan, J. et al. Real homotopy theory of Kähler manifolds. Invent Math 29 p. 245–274 (1975). https://doi.org/10.1007/BF01389853]]></dcterms:relation>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[69 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_74_13.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1974]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[DELIGNE]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[GRIFFITH]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[MORGAN]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/P_82_02.pdf">
    <dcterms:title><![CDATA[Do there exist turbulent crystals ?]]></dcterms:title>
    <dcterms:subject><![CDATA[CRISTAUX]]></dcterms:subject>
    <dcterms:subject><![CDATA[TURBULENCE]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : We discuss the possibility that, besides periodic and quasiperiodic crystals, there exist turbulent crystals as thermodynamic equilibrium states at non-zero temperature. Turbulent crystals would not be invariant under translation, but would differ from other crystals by the fuzziness of some diffraction peaks. Turbulent crystals could appear by breakdown of long range order in quasiperiodic crystals with two independent modulations.]]></dcterms:description>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/82/02]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[01/1982]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[6 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_82_02.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1982]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/P_81_52.pdf">
    <dcterms:title><![CDATA[Repellers for real analytic maps]]></dcterms:title>
    <dcterms:subject><![CDATA[PHYSIQUE NUCLEAIRE]]></dcterms:subject>
    <dcterms:subject><![CDATA[PARTICULES]]></dcterms:subject>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/81/52]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[11/1981]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[7 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_81_52.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1981]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/P_81_23.pdf">
    <dcterms:title><![CDATA[Small random perturbations of dynamical systems and the definition of attractors]]></dcterms:title>
    <dcterms:subject><![CDATA[RESEAUX]]></dcterms:subject>
    <dcterms:subject><![CDATA[SYSTEMES DYNAMIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[PHYSIQUE STATISTIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[SYSTEMES COMPLEXES]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEORIES NON LINEAIRES]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : The strange attractors plotted by computers and seen in physical experiments do not necessarily have an open basin of attraction. In view of this we study a new definition of attractors based on ideas of Conley. We argue that the attractors observed in the presence of small random perturbations correspond to this new definition.]]></dcterms:description>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/81/23]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[03/1981]]></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_81_23.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1981]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/P_80_11.pdf">
    <dcterms:title><![CDATA[Characteristic exponents and invariant manifolds in Hilbert space]]></dcterms:title>
    <dcterms:subject><![CDATA[THEORIE ERGODIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[MATHEMATIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[VARIETES]]></dcterms:subject>
    <dcterms:subject><![CDATA[ESPACES DE HILBERT]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEOREMES]]></dcterms:subject>
    <dcterms:subject><![CDATA[TOPOLOGIE]]></dcterms:subject>
    <dcterms:subject><![CDATA[VALEURS PROPRES]]></dcterms:subject>
    <dcterms:subject><![CDATA[FONCTIONS]]></dcterms:subject>
    <dcterms:subject><![CDATA[SYSTEMES SYNAMIQUES]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : The multiplicative ergodic theorem and the construction almost everywhere of stable and unstable manifolds (Pesin theory) are extended to differentiable dynamical systems on Hilbert manifolds under some compactness assumptions. The results apply to partial differential equations of evolution and also to non-invertible maps of compact manifolds.]]></dcterms:description>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/80/11]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[03/1980]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[38 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_80_11.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1980]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/P_79_313.pdf">
    <dcterms:title><![CDATA[Measures describing a turbulent flow]]></dcterms:title>
    <dcterms:subject><![CDATA[STABILITE]]></dcterms:subject>
    <dcterms:subject><![CDATA[PERTURBATION]]></dcterms:subject>
    <dcterms:subject><![CDATA[PROCESSUS STOCHASTIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[TEMPS]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract :Recent attempts at understanding hydrodynamic turbulence have used the ideas of strange attractors, characteristic exponents and stable manifolds for differentiable dynamical systems in finite dimensional spaces. This use was somewhat metophorical, because hydrodynamic evolution is defined in infinite dimensional functional spaces. A recent study indicates that many results in infinite dimensional Hilbert spaces under certain compactness assumptions. This is the case in particular for the time evolution defined by the Navier-Stokes equations in a bounded region of R2 or R3.]]></dcterms:description>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/79/313]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[11/1979]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[9 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_79_313.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1979]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/P_78_245.pdf">
    <dcterms:title><![CDATA[On the Measures which describe turbulence]]></dcterms:title>
    <dcterms:subject><![CDATA[TURBULENCE]]></dcterms:subject>
    <dcterms:subject><![CDATA[HYDRODYNAMIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEORIE ASYMPTOTIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[HEURISTIQUE]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : One expects that the average behavior (over large times) for hydordynamics and other natural phenomena is described by certain asymptotic measures on phase space. If initial conditions in a set of zero Lebesgu measure ar discarded, the asymptotic measures can be characterized on the basis of heuristic arguments. The requirement of stability under small stochastic perturbations produces measures with the same characterizations. We give here a critical discussion of the heuristic arguments and of the possible use of the characterizations of the asymptotic measures in the study of turbulence.]]></dcterms:description>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/78/245]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[11/1978]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[13 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_245.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1978]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/P_78_240.pdf">
    <dcterms:title><![CDATA[Ergodic theory of differentiable dynamical systems]]></dcterms:title>
    <dcterms:subject><![CDATA[THEORIE ERGODIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[SYSTEMES DYNAMIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEOREME]]></dcterms:subject>
    <dcterms:subject><![CDATA[EXPOSANTS]]></dcterms:subject>
    <dcterms:subject><![CDATA[VARIETES]]></dcterms:subject>
    <dcterms:subject><![CDATA[STABILITE]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : If f is a C1+? diffeomorphism of a compact manifold M, we prove the existence of stable manifolds, almost verywhere with respect to every f-invariant probability measure on M. These stable manifolds are smooth but do not in general constitute a continuous family. The proof of this stable manifold theorem (and similar results) is through the study of random matrix products (multiplicative ergodic theorem) and perturbation of such products. ]]></dcterms:description>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/78/240]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[09/1978]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[31 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_240.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1978]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/P_78_214.pdf">
    <dcterms:title><![CDATA[The Multiplicative ergodic theorem]]></dcterms:title>
    <dcterms:subject><![CDATA[THEORIE ERGODIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[SYSTEMES DYNAMIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[DYNAMIQUE DIFFERENTIABLE]]></dcterms:subject>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/78/214]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[03/1978]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[12 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_214.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1978]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/P_77_193.pdf">
    <dcterms:title><![CDATA[Analiticity properties of the characteristic exponents of random matrix products]]></dcterms:title>
    <dcterms:subject><![CDATA[EXPOSANTS]]></dcterms:subject>
    <dcterms:subject><![CDATA[MATRICES]]></dcterms:subject>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/77/193]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[11/1977]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[11 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_77_193.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1977]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/P_77_190.pdf">
    <dcterms:title><![CDATA[Sensitive dependence on initial conditions and turbulent behavior of dynamical systems]]></dcterms:title>
    <dcterms:subject><![CDATA[SYSTEMES DYNAMIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[DYNAMIQUE DIFFERENTIABLE]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : The asymptotic behavior of differentiable dynamical systems is analyzed. We discuss its descriptoin by asymptotic measures and the turbulent behavior with senditive dependence on initial condition.]]></dcterms:description>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/77/190]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[10/1977]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[9 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_77_190.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1977]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/P_77_189.pdf">
    <dcterms:title><![CDATA[Dynamical systems with turbulent behavior]]></dcterms:title>
    <dcterms:subject><![CDATA[CONGRES ET CONFERENCES]]></dcterms:subject>
    <dcterms:subject><![CDATA[SYSTEMES DYNAMIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[ENTROPIE]]></dcterms:subject>
    <dcterms:subject><![CDATA[RADON]]></dcterms:subject>
    <dcterms:description><![CDATA[[Text of a talk presented at the International Mathematical Physics Conference in Rome, 1977]]]></dcterms:description>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/77/189]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[10/1977]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[13 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_77_189.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1977]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/PM_77_181.pdf">
    <dcterms:title><![CDATA[Integral representation of measures associated with a foliation]]></dcterms:title>
    <dcterms:subject><![CDATA[CALCUL INTEGRAL]]></dcterms:subject>
    <dcterms:subject><![CDATA[TOPOLOGIE DIFFERENTIELLE]]></dcterms:subject>
    <dcterms:subject><![CDATA[FEUILLETAGES]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEORIE GEOMETRIQUE DES FONCTIONS]]></dcterms:subject>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[PM/77/181]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[05/1977]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[6 f.]]></dcterms:format>
    <dcterms:language><![CDATA[EN]]></dcterms:language>
    <dcterms:type><![CDATA[TEXTE]]></dcterms:type>
    <dcterms:type><![CDATA[PREPUBLICATION]]></dcterms:type>
    <dcterms:identifier><![CDATA[PM_77_181.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1977]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/P_77_163.pdf">
    <dcterms:title><![CDATA[Applications conservant une mesure absolument continue par rapport à dx sur [0, 1]]]></dcterms:title>
    <dcterms:subject><![CDATA[FONCTIONS DIFFERENTIABLES]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEORIE DE LA MESURE]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : Sufficient conditions are given such that a differentiable, noninvertible, map g : [0,1]~[0,1] leaves invariant a measure absolutely continuous with respect to the Lebesgue measure. In particular, this is shown to be the case for 9(x)=Rx(1- x) when R = 3,6785735 .... ]]></dcterms:description>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/77/163]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[03/1977]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[6 f.]]></dcterms:format>
    <dcterms:language><![CDATA[FR]]></dcterms:language>
    <dcterms:language><![CDATA[EN]]></dcterms:language>
    <dcterms:type><![CDATA[TEXTE]]></dcterms:type>
    <dcterms:type><![CDATA[PREPUBLICATION]]></dcterms:type>
    <dcterms:identifier><![CDATA[P_77_163.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1977]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/P_76_149.pdf">
    <dcterms:title><![CDATA[A Heuristic theory of phase transitions]]></dcterms:title>
    <dcterms:subject><![CDATA[RESEAUX]]></dcterms:subject>
    <dcterms:subject><![CDATA[SYSTEMES COMPLEXES]]></dcterms:subject>
    <dcterms:subject><![CDATA[ESPACES DE BANACH]]></dcterms:subject>
    <dcterms:subject><![CDATA[TRANSITIONS DE PHASE]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : Let Z be a suitable Banach space of interactions for a lattice spin system. If n+1 thermodynamic phases coexist for ?0 ?Z, it is shown that a manifold of codimension n of coexistence of (at least) n+1 phases passes through ?0. There are also n+1 manifolds of codimension n?1 of coexistence of (at least) n phases; these have a common boundary along the manifold of coexistence of n+1 phases. And so on for coexistence of fewer phases. This theorem is proved under a technical condition (R) which says that the pressure is a differentiable function of the interaction at ?0 when restricted to some codimensionn affine subspace of Z. The condition (R) has not been checked in any specific instance, and it is possible that our theorem is useless or vacuous. We believe however that the method of proof is physically correct and constitutes at least a heuristic proof of the Gibbs phase rule.]]></dcterms:description>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/76/149]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[10/1976]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[25 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_76_149.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1976]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/P_75_129.pdf">
    <dcterms:title><![CDATA[Probability estimates for continuous spin systems]]></dcterms:title>
    <dcterms:subject><![CDATA[PROBABILITES]]></dcterms:subject>
    <dcterms:subject><![CDATA[CENTRIFUGATION]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : Probability estimates for classical systems of particles with superstable interactions [1] are extended to continuous spin systems. ]]></dcterms:description>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/75/129]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[12/1975]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[11 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_75_129.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1975]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/P_75_128.pdf">
    <dcterms:title><![CDATA[On Manifolds of phase coexistence]]></dcterms:title>
    <dcterms:subject><![CDATA[PHYSIQUE THEORIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[PHYSIQUE MATHEMATIQUE]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : Using a theorem on convex functions due to Israel, it is shown that a point of coexistence of n+1n+1 phases cannot be isolated in the space of interactions, but lies on some infinite dimensional manifold.]]></dcterms:description>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/75/128]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[12/1975]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[13 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_75_128.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1975]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/MP_75_106.pdf">
    <dcterms:title><![CDATA[Zeta-functions for expanding maps and Anosov flows]]></dcterms:title>
    <dcterms:subject><![CDATA[FONCTIONS ZETA]]></dcterms:subject>
    <dcterms:subject><![CDATA[FLOTS D&#039;ANOSOV]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : Given a real-analytic expanding endomorphism of a compact manifold M, a meromorphic zeta function is defined on the complex-valued real-analytic functions on M. A zeta function for Anosov flows is shown to be meromorphic if the flow and its stable-unstable foliations are real-analytic. ]]></dcterms:description>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[MP/75/106]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[05/1975]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[24 f.]]></dcterms:format>
    <dcterms:language><![CDATA[EN]]></dcterms:language>
    <dcterms:type><![CDATA[TEXTE]]></dcterms:type>
    <dcterms:type><![CDATA[PREPUBLICATION]]></dcterms:type>
    <dcterms:identifier><![CDATA[MP_75_106.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1975]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[RUELLE]]></dcterms:rightsHolder>
</rdf:Description></rdf:RDF>