<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/A3_1_10_2_2.pdf">
    <dcterms:title><![CDATA[Rapport des activités scientifiques de l&#039;IHES en 1986 exposé lors du conseil d&#039;administration du 18 mai 1987]]></dcterms:title>
    <dcterms:subject><![CDATA[CONSEIL D&#039;ADMINISTRATION]]></dcterms:subject>
    <dcterms:subject><![CDATA[ACTIVITE SCIENTIFIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[PHYSIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[MATHEMATIQUE]]></dcterms:subject>
    <dcterms:subject><![CDATA[CHAMP VECTORIEL]]></dcterms:subject>
    <dcterms:subject><![CDATA[COURBE]]></dcterms:subject>
    <dcterms:subject><![CDATA[THEORIE DES CORDES]]></dcterms:subject>
    <dcterms:creator><![CDATA[BERGER]]></dcterms:creator>
    <dcterms:source><![CDATA[A3.1.10.2.2]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:format><![CDATA[21x29,7]]></dcterms:format>
    <dcterms:format><![CDATA[17 f.]]></dcterms:format>
    <dcterms:language><![CDATA[FR]]></dcterms:language>
    <dcterms:type><![CDATA[TEXTE]]></dcterms:type>
    <dcterms:type><![CDATA[RAPPORT]]></dcterms:type>
    <dcterms:identifier><![CDATA[A3_1_10_2_2.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1987]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
</rdf:Description><rdf:Description rdf:about="https://archives.ihes.fr/document/P_85_55.pdf">
    <dcterms:title><![CDATA[News proofs of the existence of the Feigenbaum functions]]></dcterms:title>
    <dcterms:subject><![CDATA[EQUATIONS FONCTIONNELLES]]></dcterms:subject>
    <dcterms:subject><![CDATA[SYSTEMES DYNAMIQUES]]></dcterms:subject>
    <dcterms:description><![CDATA[Abstract : A new proof of the existence of analytic, unimodal soutions of the Cvitanovic-Feigenbaum functional equation ?g (x) = -g(g-?x)), g(x) ? 1-const. |x| r at 0, walid for all ? in (0,1), is given, and the existence of the Eckmann-Wittwer functions [8] is recovered. The method also provides the existence of solutions for certain given values of r, and in particular, for r=2, a proof requiring no computer.]]></dcterms:description>
    <dcterms:creator><![CDATA[EPSTEIN]]></dcterms:creator>
    <dcterms:source><![CDATA[P/85/55]]></dcterms:source>
    <dcterms:publisher><![CDATA[IHES]]></dcterms:publisher>
    <dcterms:date><![CDATA[10/1985]]></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[P_85_55.pdf]]></dcterms:identifier>
    <dcterms:coverage><![CDATA[1985]]></dcterms:coverage>
    <dcterms:provenance><![CDATA[IHES]]></dcterms:provenance>
    <dcterms:rightsHolder><![CDATA[IHES]]></dcterms:rightsHolder>
    <dcterms:rightsHolder><![CDATA[EPSTEIN]]></dcterms:rightsHolder>
</rdf:Description></rdf:RDF>