George Szekeres
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| George Szekeres | |
 George Szekeres, 2001
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| Born | May 29, 1911 Budapest, Hungary |
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| Died | August 28, 2005 (aged 94) Adelaide, Australia |
| Residence |  Hungary Australia |
| Nationality | Hungarian- Australian |
| Fields | Mathematician |
| Institutions | University of Adelaide University of New South Wales |
| Alma mater | Technical University of Budapest |
| Doctoral students | John Schutz Alfred van der Poorten |
| Known for | Szekeres snark Kruskal-Szekeres coordinates Erdős–Szekeres theorem |
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Notes
Note that he has an Erdos number of one. |
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George Szekeres[1] (May 29, 1911 – August 28, 2005) was a Hungarian-Australian mathematician.
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[edit] Early years
Szekeres was born in Budapest, Hungary and received his degree in chemistry at the Technical University of Budapest. He worked six years in Budapest as an analytical chemist. He married Esther Klein in 1936. Being Jewish, the family had to escape from the Nazi persecution so Szekeres took a job in Shanghai, China. There they lived through World War II, the Japanese occupation and the beginnings of the Communist revolution. Their son, Peter, was born in Shanghai.
[edit] Career
In 1948, he was offered a position at the University of Adelaide, Australia that he gladly accepted. After all the troubles he had, he began flourishing as mathematician. A few years later, his daughter Judy was born. In 1963, the family moved to Sydney, where Szekeres took a position at University of New South Wales, and taught there until his retirement in 1975. He also devised problems for secondary school mathematics competitions run by the university where he taught and for a yearly undergraduate competition run by the Sydney University Mathematics Society.
Szekeres worked closely with many prominent mathematicians throughout his life, including Paul Erdős, Esther Szekeres (née Esther Klein), Paul Turán, Béla Bollobás, Ronald Graham, Alf van der Poorten, Miklós Laczkovich, and John Coates. He died in Adelaide, Australia.
A festschrift was held in honour of Szekeres' ninetieth birthday at the University of New South Wales in May 2001. He was made a Member of the Order of Australia (AM) in 2002.
[edit] The Happy Ending problem
The so-called Happy Ending problem is an example of how mathematics pervaded George's life. During 1933, George and several other students met frequently in Budapest to discuss mathematics. At one of these meetings, Esther Klein proposed the following problem:
- Given five points in the plane in general position, prove that four of them form a convex quadrilateral.
After allowing George, Paul Erdős, and the other students to scratch their heads for some time, Esther explained her proof. Subsequently George and Paul wrote a paper (1935) that generalises this result; it is regarded as one of the foundational works in the field of combinatorial geometry. Erdös dubbed the original problem the "Happy Ending" problem because it resulted in George and Esther's marriage in 1937.
George and Esther died within a half an hour of each other, on the same day, 28 August 2005.
[edit] See also
- Powerful number
- Szekeres snark
- Generalized continued fraction
- Kruskal-Szekeres coordinates
- Erdős–Szekeres theorem
[edit] External links
[edit] References
- ^ Pronounced sæk.ɚ.æʃ
- Giles, J. R., Wallis, J. S., "George Szekeres. With affection and respect," Journal of the Australian Mathematical Society Series A, Vol 21 (1976), No 4, pp. 385–392.
- Cowling, M., "Obituary George and Esther Szekeres," Gazette of the Australian Mathematical Society, Vol 32 (2005), No 4, pp. 221--224
- Erdos, P. and Szekeres, G., "A combinatorial problem in geometry," Compositio Math., Vol 2 (1935), pp. 463--470.
| Persondata | |
|---|---|
| NAME | Szekeres, George |
| ALTERNATIVE NAMES | |
| SHORT DESCRIPTION | Hungarian- Australian mathematician |
| DATE OF BIRTH | May 29, 1911 |
| PLACE OF BIRTH | Budapest, Hungary |
| DATE OF DEATH | August 28, 2005 |
| PLACE OF DEATH | Adelaide, Australia |
