Biography:Hellmuth Kneser

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Short description: German mathematician
Hellmuth Kneser
Hellmuth-Kneser.jpg
Hellmuth Kneser, ca. 1930.
Born(1898-04-16)16 April 1898
Died23 August 1973(1973-08-23) (aged 75)
NationalityBaltic German
Alma materUniversity of Göttingen
Known forNormal function
Prime decomposition of 3-manifolds
Superfunction
Radó–Kneser–Choquet theorem
Scientific career
FieldsMathematics
InstitutionsUniversity of Tübingen
Doctoral advisorDavid Hilbert
Doctoral studentsReinhold Baer,
Wolfgang Walter

Hellmuth Kneser (16 April 1898 – 23 August 1973) was a Baltic German mathematician, who made notable contributions to group theory and topology. His most famous result may be his theorem on the existence of a prime decomposition for 3-manifolds. His proof originated the concept of normal surface, a fundamental cornerstone of the theory of 3-manifolds.

He was born in Dorpat, Russian Empire (now Tartu, Estonia) and died in Tübingen, Germany . He was the son of the mathematician Adolf Kneser and the father of the mathematician Martin Kneser. He assisted Wilhelm Süss in the founding of the Mathematical Research Institute of Oberwolfach and served as the director of the institute from 1958 to 1959. He was an editor of Mathematische Zeitschrift, Archiv der Mathematik and Aequationes Mathematicae.

Kneser formulated the problem of non-integer iteration of functions and proved the existence of the entire Abel function of the exponential; on the base of this Abel function, he constructed the functional square root of the exponential function as a half-iteration of the exponential, i.e. a function φ such that φ(φ(z)) = exp(z).[1]

Kneser was a student of David Hilbert. He was an advisor of a number of notable mathematicians, including Reinhold Baer.

Hellmuth Kneser was a member of the NSDAP and also the SA.[2] In July 1934 he wrote to Ludwig Bieberbach a short note supporting his anti-semitic views and stating: "May God grant German science a unitary, powerful and continued political position."[3]

Selected publications

  • Funktionentheorie. Studia Mathematica, Göttingen, 1958;[4] 2nd edition 1966.
  • Gerhard Betsch, Karl H. Hofmann (eds.): Gesammelte Abhandlungen, De Gruyter 2005; 2011 pbk reprint

References

  1. H.Kneser (1950). "Reelle analytische Lösungen der Gleichung φ(φ(x)) = ex und verwandter Funktionalgleichungen". Journal für die reine und angewandte Mathematik 187: 56–67. http://resolver.sub.uni-goettingen.de/purl?GDZPPN002175851. 
  2. Die Carathéodory-Nachfolge in München 1938-1944 by Freddy Litten
  3. Sanford L. Segal, Mathematicians under the Nazis, Princeton University Press, 2003, page 276
  4. Franklin, Philip (1959). "Book Review: Funktionentheofrie". Bulletin of the American Mathematical Society 65 (6): 337–339. doi:10.1090/S0002-9904-1959-10353-0. ISSN 0002-9904. 

External links