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  1. de.wikipedia.org › wiki › Pál_TuránPál Turán – Wikipedia

    August 1910 in Budapest, Österreich-Ungarn; † 26. September 1976 ebenda) [1] war ein ungarischer Mathematiker. Er lieferte Beiträge zu der Zahlentheorie, Gruppentheorie und der Approximationstheorie. Er bewies 1941 ein erstes grundlegendes Resultat der extremalen Graphentheorie, den heute sogenannten Satz von Turán .

  2. en.wikipedia.org › wiki › Pál_TuránPál Turán - Wikipedia

    Pál Turán (Hungarian: [ˈpaːl ˈturaːn]; 18 August 1910 – 26 September 1976) also known as Paul Turán, was a Hungarian mathematician who worked primarily in extremal combinatorics. In 1940, because of his Jewish origins, he was arrested by the Nazis and sent to a labour camp in Transylvania, later being transferred several ...

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  4. hu.wikipedia.org › wiki › Turán_PálTurán Pál – Wikipédia

    Turán Pál (született Rosenfeld) ( Budapest, 1910. augusztus 18. [12] – . Budapest, 1976. szeptember 26.) magyar matematikus, aki a számelmélet, a gráfelmélet és a klasszikus analízis területén ért el jelentős eredményeket. Élete.

  5. mathshistory.st-andrews.ac.uk › Biographies › TuranPaul Turán (1910 - 1976) - Biography - MacTutor History of...

    18. Aug. 2017 · Quick Info. Born. 18 August 1910. Budapest, Hungary. Died. 26 September 1976. Budapest, Hungary. Summary. Paul Turán was a Hungarian mathematician who worked in number theory. View three larger pictures. Biography. Paul Turán's parents were Aranha Beck and Béla Turán.

  6. yivoencyclopedia.org › article › Turan_PalYIVO | Turán, Pál

    Turán was one of the most important mathematicians of twentieth-century Hungary. The number of his publications, written alone or with a coauthor, exceeds 245, and his research led him to remarkable finds in almost every branch of mathematics. His most important discovery is the power sum method that bears his name.

  7. de.wikipedia.org › wiki › Satz_von_TuránSatz von Turán – Wikipedia

    Der Satz von Turán (nach Pál Turán) ist eine Aussage aus dem mathematischen Teilgebiet der Graphentheorie. Er macht eine Aussage über die maximale Anzahl von Kanten, die ein Graph mit gegebener Knotenzahl haben kann, ohne einen vollständigen Untergraphen mit Knoten enthalten zu müssen.

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    • Pál Turán: teoría de grafos y fábricas de ladrillos — Cuaderno de ...
    • Who's That Mathematician? Paul R. Halmos Collection - Page 53
    • Pál Turán Biography - Hungarian mathematician | Pantheon
    • Mathematical Graffiti #1 - Pál Turán e la Siberia... evitata - Maddmaths!
    • Pál Turán - Zsidó Kiválóságok Háza

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  9. www.math.auckland.ac.nz › hat › peoplePál (Paul) Turán (1910-1976) - math.auckland.ac.nz

    Turán, P., On some open problems of approximation theory, J. Approx. Theory 29 (1980), 23-85. For those with access, this article may be viewed at Science Direct.Pages 86-89, (for those with access here) just following this paper, contain a list of articles dealing with Turán's Problems as presented in the above paper.