Biography:Ernst Witt

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Ernst Witt
Ernst Witt.jpeg
Ernst Witt in Nice, 1970
Born(1911-06-26)26 June 1911
Alsen, German Empire (present-day Denmark )
Died3 July 1991(1991-07-03) (aged 80)
Hamburg, Germany
EducationUniversity of Göttingen
Known forWitt algebra
Witt group
Witt's theorem
Witt vector
Bourbaki–Witt theorem
Hasse–Witt matrix
Poincaré–Birkhoff–Witt theorem
Scientific career
FieldsMathematics
InstitutionsUniversity of Hamburg
Doctoral advisorEmmy Noether
Doctoral students

Ernst Witt (26 June 1911 – 3 July 1991) was a German mathematician, one of the leading algebraists of his time.[1]

Biography

Witt was born on the island of Alsen, then a part of the German Empire. Shortly after his birth, his parents moved the family to China to work as missionaries,[2] and he did not return to Europe until he was nine.[2]

After his schooling, Witt went to the University of Freiburg and the University of Göttingen. He joined the NSDAP (Nazi Party) and was an active party member.[3] Witt was awarded a Ph.D. at the University of Göttingen in 1934 with a thesis titled: "Riemann-Roch theorem and zeta-Function in hypercomplexes"[4] (Riemann-Rochscher Satz und Zeta-Funktion im Hyperkomplexen) that was supervised by Gustav Herglotz, with Emmy Noether suggesting the topic for the doctorate.[5] He qualified to become a lecturer and gave guest lectures in Göttingen and Hamburg.[5] He became associated with the team led by Helmut Hasse who led his habilitation. In June 1936, he gave his habilitation lecture.[4]

During World War II he joined a group of five mathematicians, recruited by Wilhelm Fenner, and which included Georg Aumann, Alexander Aigner, Oswald Teichmüller, Johann Friedrich Schultze and their leader professor Wolfgang Franz, to form the backbone of the new mathematical research department in the late 1930s that would eventually be called: Section IVc of Cipher Department of the High Command of the Wehrmacht (abbr. OKW/Chi).[6][7]

From 1937 until 1979, he taught at the University of Hamburg.[8] He died in Hamburg in 1991, shortly after his 80th birthday.

Work

Witt's work has been highly influential. His invention of the Witt vectors clarifies and generalizes the structure of the p-adic numbers.[9] It has become fundamental to p-adic Hodge theory.

Witt was the founder of the theory of quadratic forms over an arbitrary field.[10] He proved several of the key results, including the Witt cancellation theorem. He defined the Witt ring of all quadratic forms over a field, now a central object in the theory.[11]

The Poincaré–Birkhoff–Witt theorem is basic to the study of Lie algebras. In algebraic geometry, the Hasse–Witt matrix of an algebraic curve over a finite field determines the cyclic étale coverings of degree p of a curve in characteristic p.

In the 1970s, Witt claimed that in 1940 he had discovered what would eventually be named the "Leech lattice" many years before John Leech discovered it in 1965, but Witt did not publish his discovery and the details of exactly what he did are unclear.[12][13]

See also

References

  1. Kersten, Ina (20 October 1993). "Ernst Witt 1911-1991". Jahresbericht der Deutschen Mathematiker-Vereinigung 95: 166–180. https://www.math.uni-bielefeld.de/jb_dmv/JB_DMV_095_4.pdf. 
  2. 2.0 2.1 Segal, Sanford L. (23 November 2014) (in en). Mathematicians under the Nazis. Princeton University Press. p. 451. ISBN 978-0-691-16463-2. 
  3. According to Schappacher (letter in Mathematical Intelligencer 1996) it was most certainly him and not Oswald Teichmüller, who attended Emmy Noether's private seminar held in her house while wearing his SA-uniform.
  4. 4.0 4.1 Kersten, Ina (July 1999). "Biography of Ernst Witt (1911{1991)". in Bayer-Fluckiger, Eva; Lewis, David; Ranicki, Andrew (in en). Quadratic Forms and Their Applications, Proceedings of the Conference on Quadratic Forms and Their Applications. University College Dublin. p. 155. http://www.maths.ed.ac.uk/~aar/books/dublin.pdf. 
  5. 5.0 5.1 Frei, Günther; Lemmermeyer, Franz; Roquette, Peter J. (16 January 2014) (in en). Emil Artin and Helmut Hasse: The Correspondence 1923-1958. Contributions in Mathematical and Computational Sciences. 5. Göttingen: Springer Science & Business Media. p. 439. doi:10.1007/978-3-0348-0715-9. ISBN 978-3-0348-0715-9. 
  6. "Army Security Agency: DF-187 The Career of Wilhelm Fenner with Special Regard to his activity in the field of Cryptography and Cryptanalysis (PDF)". 1 December 1949. p. 7. https://drive.google.com/file/d/0B7sNVKDp-yiJNjE4YTIyOTctNGFlZi00NTliLWEwZWUtOGYxYzEyMjk1NGE1/view. 
  7. TICOM reports DF-187 A-G and DF-176, ‘European Axis Signal Intelligence in World War II’ vol 2
  8. Frei, Günther; Lemmermeyer, Franz; Roquette, Peter J. (16 January 2014) (in en). Emil Artin and Helmut Hasse: The Correspondence 1923-1958. Gottigen: Springer Science & Business Media. p. 439. ISBN 978-3-0348-0715-9. https://books.google.com/books?id=6rDBBAAAQBAJ. 
  9. Rabinoff, Joseph (2014). "The Theory of Witt Vectors". arXiv:1409.7445 [math.NT].
  10. Szymiczek, K. (8 July 2009). "Quadratic Forms". in Hazewinkel, M. (in en). Handbook of Algebra. 6. Oxford: Elsevier. p. 70. ISBN 978-0-08-093281-1. 
  11. Friedlander, Eric; Grayson, Daniel R. (18 July 2005) (in en). Handbook of K-Theory. Berlin: Springer Science & Business Media. pp. 539–577. ISBN 978-3-540-23019-9. https://books.google.com/books?id=Xxg3L20qMeUC. 
  12. Witt 1998, pp. 328–329.
  13. Edixhoven, Bas; Couveignes, Jean-Marc (20 June 2011) (in en). Computational Aspects of Modular Forms and Galois Representations: How One Can Compute in Polynomial Time the Value of Ramanujan's Tau at a Prime (AM-176). Princeton: Princeton University Press. p. 46. ISBN 978-0-691-14201-2. 

Bibliography

External links



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