<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_97_82.pdf">
    <dcterms:title><![CDATA[Noncommutative geometry and matrix theory : compactification on tori]]></dcterms:title>
    <dcterms:subject><![CDATA[PHYSIQUE DES HAUTES ENERGIES]]></dcterms:subject>
    <dcterms:subject><![CDATA[GEOMETRIE NON COMMUTATIVE]]></dcterms:subject>
    <dcterms:subject><![CDATA[COMPACTIFICATION]]></dcterms:subject>
    <dcterms:subject><![CDATA[TORE]]></dcterms:subject>
    <dcterms:creator><![CDATA[CONNES]]></dcterms:creator>
    <dcterms:creator><![CDATA[DOUGLAS]]></dcterms:creator>
    <dcterms:creator><![CDATA[SCHWARZ]]></dcterms:creator>
    <dcterms:source><![CDATA[M/97/82]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[12/1997]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[22 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_97_82.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1997]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[CONNES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[DOUGLAS]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SCHWARZ]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://archives.ihes.fr/document/M_95_43.pdf">
    <dcterms:title><![CDATA[Determinant bundles, Quillen metrics, and Mumford isomorphisms over the universal commensurability Teichmüller space]]></dcterms:title>
    <dcterms:subject><![CDATA[ESPACES DE TEICHMULLER]]></dcterms:subject>
    <dcterms:subject><![CDATA[SURFACES DE RIEMANN]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : A coherent, genus independent, equivariant construction of determinant line bundles, and connecting Mumford isomorphisms, is obtained over the inductive limie of the Teichmüller spaces of Riemann surfaces of varying genus. The direct limit of the Teichmüller spaces corresponds to the inverse limit over the directed system of all finite unbrached coverings of a fixed surface.]]></dcterms:description>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:creator><![CDATA[BISWAS]]></dcterms:creator>
    <dcterms:creator><![CDATA[NAG]]></dcterms:creator>
    <dcterms:source><![CDATA[M/95/43]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[05/1995]]></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[M_95_43.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1995]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[BISWAS]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[NAG]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://archives.ihes.fr/document/M_93_37.pdf">
    <dcterms:title><![CDATA[Lacunary series as quadratic differentials in conformal dynamics]]></dcterms:title>
    <dcterms:subject><![CDATA[SYSTEMES DYNAMIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[ESPACES DE BANACH]]></dcterms:subject>
    <dcterms:subject><![CDATA[ESPACES DE TEICHMULLER]]></dcterms:subject>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:creator><![CDATA[GARDINER]]></dcterms:creator>
    <dcterms:source><![CDATA[M/93/37]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[06/1993]]></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_93_37.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1993]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[SULLIVAN]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[GARDINER]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://archives.ihes.fr/document/M_91_25.pdf">
    <dcterms:title><![CDATA[Bounds, quadratic differentials and renormalization conjectures]]></dcterms:title>
    <dcterms:subject><![CDATA[RENORMALISATION]]></dcterms:subject>
    <dcterms:subject><![CDATA[PHYSIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEOREME DU POINT FIXE]]></dcterms:subject>
    <dcterms:subject><![CDATA[ANALYSE VECTORIELLE]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : In the context of smooth folding mappings we verifie certain conjecture by showing bounded return time renormalization is topologically hyperbolic and find the stable and unstable manifolds. The main consequence is the asymptotic geometric rigidity of the Cantor sets defined by the critical orbits. We use the bounds and quadratic differentials on Riemann surface lamination to prove exponential renormalization contraction in a space of holomorphic dynamical systems that contains the limit set of renormalization.]]></dcterms:description>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/91/25]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[03/1991]]></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[M_91_25.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1991]]></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://archives.ihes.fr/document/M_90_75.pdf">
    <dcterms:title><![CDATA[On the Structure of infinitely many dynamical systems nested inside or outside a given one]]></dcterms:title>
    <dcterms:subject><![CDATA[SYSTEMES DYNAMIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[RENORMALISATION]]></dcterms:subject>
    <dcterms:subject><![CDATA[PHYSIQUE]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : In the content of smooth folding mappings we show bounded return time renormalization is topologically hyperbolic and find the stable and unstable manifolds. The main consequence is the asymptotic geometric rigidity of the Cantor sets defined by the critical orbits. We use the Teichmüller Contraction Principle to prove renormalization contraction in a space of holomorphic dynamical systems that contains the limit set of renormalization.]]></dcterms:description>
    <dcterms:creator><![CDATA[SULLIVAN]]></dcterms:creator>
    <dcterms:source><![CDATA[M/90/75]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[09/1990]]></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[M_90_75.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1990]]></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://archives.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://archives.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://archives.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://archives.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://archives.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://archives.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://archives.ihes.fr/document/M_02_31.pdf">
    <dcterms:title><![CDATA[Chirurgie des grassmanniennes]]></dcterms:title>
    <dcterms:subject><![CDATA[VARIETES DE GRASSMANN]]></dcterms:subject>
    <dcterms:subject><![CDATA[COMPACTIFICATIONS]]></dcterms:subject>
    <dcterms:subject><![CDATA[PAVAGE]]></dcterms:subject>
    <dcterms:subject><![CDATA[MATHEMATIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[VARIETES DE SCHUBERT]]></dcterms:subject>
    <dcterms:subject><![CDATA[ESPACES FIBRES]]></dcterms:subject>
    <dcterms:creator><![CDATA[LAFFORGUE]]></dcterms:creator>
    <dcterms:source><![CDATA[M/02/31]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[05/2002]]></dcterms:date>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[134 f.]]></dcterms:format>
    <dcterms:language><![CDATA[FR]]></dcterms:language>
    <dcterms:type><![CDATA[TEXTE]]></dcterms:type>
    <dcterms:type><![CDATA[PREPUBLICATION]]></dcterms:type>
    <dcterms:identifier><![CDATA[M_02_31.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[2002]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[LAFFORGUE]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://archives.ihes.fr/document/M_89_48.pdf">
    <dcterms:title><![CDATA[Fairly symmetric hyperbolic manifolds]]></dcterms:title>
    <dcterms:subject><![CDATA[VARIETES]]></dcterms:subject>
    <dcterms:subject><![CDATA[ESPACES HYPERBOLIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[SYMETRIE]]></dcterms:subject>
    <dcterms:subject><![CDATA[TESSELLATIONS]]></dcterms:subject>
    <dcterms:creator><![CDATA[KUIPER]]></dcterms:creator>
    <dcterms:source><![CDATA[M/89/48]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[07/1989]]></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_89_48.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1989]]></dcterms:coverage>
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    <dcterms:title><![CDATA[Deformations of algebras over operads and Deligne&#039;s conjecture]]></dcterms:title>
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    <dcterms:title><![CDATA[Rigidity of lattices : an Introduction]]></dcterms:title>
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    <dcterms:title><![CDATA[Lectures on transformation groups : geometry and dynamics]]></dcterms:title>
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    <dcterms:subject><![CDATA[NOMBRES PREMIERS]]></dcterms:subject>
    <dcterms:subject><![CDATA[FONCTION ZETA]]></dcterms:subject>
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