Haim Hanani

Haim Hanani ((1912-09-11)11 September 1912 as Chaim Chojnacki 8 April 1991)[1] was a Polish-born Israeli mathematician, known for his contributions to combinatorial design theory, in particular for the theory of pairwise balanced designs and for the proof of an existence theorem for Steiner quadruple systems.[2][3] He is also known for the Hanani–Tutte theorem on odd crossings in non-planar graphs.

Haim Hanani (Chaim Chojnacki)
Born(1912-09-11)11 September 1912
Died8 April 1991(1991-04-08) (aged 78)
Alma materHebrew University
Scientific career
FieldsMathematics
ThesisA contribution to the four color problem (1938)

Life

Hanani (Chojnacki) was born in Poland, studied in Vienna and Warsaw, and graduated with an M.A. from the University of Warsaw in 1934. He emigrated to the British Mandate of Palestine, later to become Israel, in 1935 and in 1938 received the first Ph.D. in Mathematics from the Hebrew University of Jerusalem.

In 1955 he was appointed to the faculty at Technion Institute of Technology and from 1969 to 1973 he served as the rector of Ben-Gurion University in Beersheba. In 1980 he was awarded the title of Professor Emeritus at that institution.[2]

His early research led to the proof of the theorem devised by Richard M. Wilson on pairwise balance designs.[2]

He wrote scholarly papers with Andries Brouwer, Paul Erdős, Alexander Schrijver, and Richard M. Wilson, among others.[4]

His papers were published in journals such as Discrete Mathematics, the Journal of Combinatorial Theory, the European Journal of Combinatorics, and the American Mathematical Monthly.[2]

Academic papers

References

  1. BnF: Haim Hanani (1912-1991)
  2. Hartman, A. (1989). Combinatorial Designs: A Tribute to Haim Hanani. Annals of Discrete Mathematics. Elsevier Science. ISBN 9780444881151. LCCN lc89023148.
  3. "Notices of the AMS" (PDF). 42 (6). American Mathematical Society. 1995: 686. {{cite journal}}: Cite journal requires |journal= (help)
  4. "Haim Hanani List of Publications". Leibniz-Zentrum für Informatik. Retrieved 10 November 2012.
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