Olof Hanner

Olof Hanner (7 December 1922 in Stockholm – 19 September 2015 in Gothenburg)[1][2] was a Swedish mathematician.[3][4]

Education and career

Hanner earned his Ph.D. from Stockholm University in 1952.[5] He was a professor at the University of Gothenburg from 1963 to 1989.[6]

Contributions

In a 1956 paper,[7] Hanner introduced the Hanner polytopes and the Hanner spaces having these polytopes as their metric balls. Hanner was interested in a Helly property of these shapes, later used to characterize them by Hansen & Lima (1981): unlike other convex polytopes, it is not possible to find three translated copies of a Hanner polytope that intersect pairwise but do not have a point of common intersection.[8] Subsequently, the Hanner polytopes formed a class of important examples for the Mahler conjecture[9] and for Kalai's 3d conjecture.[10] In another paper from the same year,[11] Hanner proved a set of inequalities related to the uniform convexity of Lp spaces, now known as Hanner's inequalities.

Other contributions of Hanner include (with Hans Rådström) improving Werner Fenchel's version of Carathéodory's lemma,[12][13] contributing to The Official Encyclopedia of Bridge, and doing early work on combinatorial game theory and the mathematics of the board game Go.[14][15][16] One of the many proofs of the Pythagorean theorem based on the Pythagorean tiling is sometimes called "Olof Hanner's Jigsaw Puzzle".[17]

Selected publications

References

  1. Pratesi, Franco (2004), "A Swedish pioneer of go and of its mathematical investigation" (PDF), Nordisk GoBlad (2): 9–10
  2. Who's who in Scandinavia, 1980 at Google Books
  3. "Olaf Hanner" (in Swedish). Retrieved 12 January 2016.
  4. Sjögren, Peter (2016), "Olof Hanner in memoriam" (PDF), Svenska matematikersamfundet Bulletinen (Feburari 2016): 22–24
  5. Olof Hanner at the Mathematics Genealogy Project
  6. Olof Hanner, Nationalencyklopedin, retrieved 2013-05-17.
  7. Hanner (1956a).
  8. Hansen, Allan B.; Lima, Ȧsvald (1981), "The structure of finite-dimensional Banach spaces with the 3.2. intersection property", Acta Mathematica, 146 (1-2): 1–23, MR 594626, doi:10.1007/BF02392457.
  9. Kim, Jaegil (2012), Minimal volume product near Hanner polytopes, arXiv:1212.2544Freely accessible.
  10. Kalai, Gil (1989), "The number of faces of centrally-symmetric polytopes", Graphs and Combinatorics, 5 (1): 389–391, MR 1554357, doi:10.1007/BF01788696.
  11. Hanner (1956b).
  12. Hanner & Rådström (1951).
  13. Reay, John R. (1965), Generalizations of a theorem of Carathéodory, Memoirs of the AMS, 54, MR 0188891.
  14. Hanner (1959).
  15. Raussen, Martin; Skau, Christian (March 2012), "Interview with John Milnor" (PDF), Notices of the AMS, 59 (3): 400–408, doi:10.1090/noti803.
  16. Nowakowski, Richard J. (2009), "The History of Combinatorial Game Theory", Proceedings of the Board Game Studies Colloquium XI (Lisbon, 2008) (PDF)
  17. Olof Hanner's Jigsaw Puzzle, Cut-the-Knot, retrieved 2013-05-17.
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