<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://omeka.ihes.fr/document/P_72_20.pdf">
    <dcterms:title><![CDATA[Bifurcations in the presence of a symmetry group]]></dcterms:title>
    <dcterms:subject><![CDATA[RESEAUX]]></dcterms:subject>
    <dcterms:subject><![CDATA[SYSTEMES COMPLEXES]]></dcterms:subject>
    <dcterms:subject><![CDATA[SYSTEMES DYNAMIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[SYSTEMES NON LINEAIRES]]></dcterms:subject>
    <dcterms:subject><![CDATA[GROUPES DE SYMETRIE]]></dcterms:subject>
    <dcterms:subject><![CDATA[ELECTROMAGNETISME]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : Let the origin O of a Banach space E be a fixed point of a diffeomorphism or a critical point of a vector, assuming equivariance under a linear group of isometries of E. Explicit techniques are presented to handle the generalization of the Hopf bifurcation to this equivariant situation.]]></dcterms:description>
    <dcterms:creator><![CDATA[RUELLE]]></dcterms:creator>
    <dcterms:source><![CDATA[P/72/20]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[07/1972]]></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[P_72_20.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1972]]></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_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/M_80_06.pdf">
    <dcterms:title><![CDATA[Groups of polynomial growth and expanding maps]]></dcterms:title>
    <dcterms:subject><![CDATA[THEORIE GEOMETRIQUE DES GROUPES]]></dcterms:subject>
    <dcterms:subject><![CDATA[GROUPES FINIS]]></dcterms:subject>
    <dcterms:subject><![CDATA[ESPACES METRIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[CONVERGENCE]]></dcterms:subject>
    <dcterms:subject><![CDATA[EXPANSION]]></dcterms:subject>
    <dcterms:creator><![CDATA[GROMOV]]></dcterms:creator>
    <dcterms:source><![CDATA[M/80/06]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:format><![CDATA[A4]]></dcterms:format>
    <dcterms:format><![CDATA[19 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_80_06.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1980]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[GROMOV]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/M_84_48.pdf">
    <dcterms:title><![CDATA[Introduction to hyperbolic sets]]></dcterms:title>
    <dcterms:subject><![CDATA[SYSTEMES DYNAMIQUES]]></dcterms:subject>
    <dcterms:subject><![CDATA[ASTRONOMIE]]></dcterms:subject>
    <dcterms:subject><![CDATA[ORBITES]]></dcterms:subject>
    <dcterms:subject><![CDATA[ENSEMBLES INVARIANTS]]></dcterms:subject>
    <dcterms:subject><![CDATA[HYPERBOLES]]></dcterms:subject>
    <dcterms:creator><![CDATA[LANFORD]]></dcterms:creator>
    <dcterms:source><![CDATA[M/84/48]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[10/1984]]></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_84_48.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1984]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[LANFORD]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/F3_2_2_1_5.pdf">
    <dcterms:title><![CDATA[Liste des séminaires et conférences ayant eu lieu à l&#039;IHES en 1970]]></dcterms:title>
    <dcterms:subject><![CDATA[SEMINAIRE]]></dcterms:subject>
    <dcterms:subject><![CDATA[CONFERENCE]]></dcterms:subject>
    <dcterms:creator><![CDATA[IHES]]></dcterms:creator>
    <dcterms:source><![CDATA[F3.2.2.1/5]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:format><![CDATA[21x29,7]]></dcterms:format>
    <dcterms:format><![CDATA[6 f.]]></dcterms:format>
    <dcterms:language><![CDATA[FR]]></dcterms:language>
    <dcterms:type><![CDATA[TEXTE]]></dcterms:type>
    <dcterms:type><![CDATA[RAPPORT]]></dcterms:type>
    <dcterms:identifier><![CDATA[F3_2_2_1_5.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1970]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.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://omeka.ihes.fr/document/H1_1_4_5_1_3.pdf">
    <dcterms:title><![CDATA[Procès-verbal du comité scientifique du 3 décembre 1977]]></dcterms:title>
    <dcterms:subject><![CDATA[CONSEIL SCIENTIFIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[PROFESSEUR PERMANENT]]></dcterms:subject>
    <dcterms:subject><![CDATA[VISITEUR]]></dcterms:subject>
    <dcterms:subject><![CDATA[SEMINAIRE]]></dcterms:subject>
    <dcterms:subject><![CDATA[PHYSIQUE THEORIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[UNESCO]]></dcterms:subject>
    <dcterms:subject><![CDATA[CONFERENCE]]></dcterms:subject>
    <dcterms:subject><![CDATA[CHINOIS]]></dcterms:subject>
    <dcterms:source><![CDATA[H1.1.4.5.1/3]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[13/01/1978]]></dcterms:date>
    <dcterms:format><![CDATA[21x29,7]]></dcterms:format>
    <dcterms:format><![CDATA[6 f.]]></dcterms:format>
    <dcterms:language><![CDATA[FR]]></dcterms:language>
    <dcterms:type><![CDATA[TEXTE]]></dcterms:type>
    <dcterms:type><![CDATA[RAPPORT]]></dcterms:type>
    <dcterms:identifier><![CDATA[H1_1_4_5_1_3.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1978]]></dcterms:coverage>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/H1_1_6_4_2_1.pdf">
    <dcterms:title><![CDATA[Rapport du comité scientifique du 10 mars 1984]]></dcterms:title>
    <dcterms:subject><![CDATA[CONSEIL SCIENTIFIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[VISITEUR]]></dcterms:subject>
    <dcterms:subject><![CDATA[BATIMENT SCIENTIFIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[PRIX SCIENTIFIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[PROFESSEUR PERMANENT]]></dcterms:subject>
    <dcterms:subject><![CDATA[DIRECTEUR]]></dcterms:subject>
    <dcterms:subject><![CDATA[ORDINATEUR]]></dcterms:subject>
    <dcterms:subject><![CDATA[INFORMATIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[SEMINAIRE]]></dcterms:subject>
    <dcterms:subject><![CDATA[GEOMETRIE ALGEBRIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[RUSSE]]></dcterms:subject>
    <dcterms:source><![CDATA[H1.1.6.4.2/1]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:format><![CDATA[29,7x42]]></dcterms:format>
    <dcterms:format><![CDATA[7 f.]]></dcterms:format>
    <dcterms:language><![CDATA[FR]]></dcterms:language>
    <dcterms:type><![CDATA[TEXTE]]></dcterms:type>
    <dcterms:type><![CDATA[RAPPORT]]></dcterms:type>
    <dcterms:identifier><![CDATA[H1_1_6_4_2_1.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1984]]></dcterms:coverage>
    <dcterms:rightsHolder><![CDATA[IHES]]></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/H1_1_4_2_2_1.pdf">
    <dcterms:title><![CDATA[Tableau récapitulant les mathématiciens invités en 1976-1977]]></dcterms:title>
    <dcterms:subject><![CDATA[CONSEIL SCIENTIFIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[VISITEUR]]></dcterms:subject>
    <dcterms:subject><![CDATA[MATHEMATICIEN]]></dcterms:subject>
    <dcterms:source><![CDATA[H1.1.4.2.2/1]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[18/08/1976]]></dcterms:date>
    <dcterms:format><![CDATA[33x24,2]]></dcterms:format>
    <dcterms:format><![CDATA[1 f.]]></dcterms:format>
    <dcterms:language><![CDATA[FR]]></dcterms:language>
    <dcterms:type><![CDATA[TEXTE]]></dcterms:type>
    <dcterms:type><![CDATA[RAPPORT]]></dcterms:type>
    <dcterms:identifier><![CDATA[H1_1_4_2_2_1.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1976]]></dcterms:coverage>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://omeka.ihes.fr/document/H1_1_4_6_5_3.pdf">
    <dcterms:title><![CDATA[Tableau récapitulant les physiciens et les mathématiciens invités sur l&#039;année 1978-1979]]></dcterms:title>
    <dcterms:subject><![CDATA[CONSEIL SCIENTIFIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[VISITEUR]]></dcterms:subject>
    <dcterms:subject><![CDATA[MATHEMATICIEN]]></dcterms:subject>
    <dcterms:subject><![CDATA[PHYSICIEN]]></dcterms:subject>
    <dcterms:source><![CDATA[H1.1.4.6.5/3]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[11/09/1978]]></dcterms:date>
    <dcterms:format><![CDATA[29,7x42]]></dcterms:format>
    <dcterms:format><![CDATA[1 f.]]></dcterms:format>
    <dcterms:language><![CDATA[FR]]></dcterms:language>
    <dcterms:type><![CDATA[TEXTE]]></dcterms:type>
    <dcterms:type><![CDATA[RAPPORT]]></dcterms:type>
    <dcterms:identifier><![CDATA[H1_1_4_6_5_3.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1978]]></dcterms:coverage>
    <dcterms:rightsHolder><![CDATA[IHES]]></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>