@prefix psr: . @prefix skos: . @prefix dc: . @prefix xsd: . psr: a skos:ConceptScheme . psr:-KFJ2KP3Q-W skos:exactMatch , ; skos:altLabel "Thue-Siegel-Roth theorem"@en, "théorème de Thue-Siegel-Roth"@fr ; skos:inScheme psr: ; dc:modified "2023-08-30"^^xsd:date ; dc:created "2023-08-30"^^xsd:date ; skos:broader psr:-Z1B19BG4-0, psr:-F7SFNL4R-1 ; skos:prefLabel "Roth's theorem"@en, "théorème de Roth"@fr ; skos:definition """In mathematics, Roth's theorem or Thue–Siegel–Roth theorem is a fundamental result in diophantine approximation to algebraic numbers. It is of a qualitative type, stating that algebraic numbers cannot have many rational number approximations that are 'very good'. Over half a century, the meaning of very good here was refined by a number of mathematicians, starting with Joseph Liouville in 1844 and continuing with work of Axel Thue (1909), Carl Ludwig Siegel (1921), Freeman Dyson (1947), and Klaus Roth (1955).
(Wikipedia, The Free Encyclopedia, https://en.wikipedia.org/wiki/Roth%27s_theorem)"""@en, """En mathématiques, le théorème de Roth, ou théorème de Thue-Siegel-Roth, est un énoncé de théorie des nombres, concernant plus particulièrement l'approximation diophantienne.
(Wikipedia, L'Encylopédie Libre, https://fr.wikipedia.org/wiki/Th%C3%A9or%C3%A8me_de_Roth)"""@fr ; a skos:Concept . psr:-Z1B19BG4-0 skos:prefLabel "approximation diophantienne"@fr, "Diophantine approximation"@en ; a skos:Concept ; skos:narrower psr:-KFJ2KP3Q-W . psr:-F7SFNL4R-1 skos:prefLabel "algebraic number theory"@en, "théorie algébrique des nombres"@fr ; a skos:Concept ; skos:narrower psr:-KFJ2KP3Q-W .