Biography:Menachem Magidor
Menachem Magidor | |
---|---|
Magidor in 2006 | |
Born | Petah Tikva, Mandatory Palestine (now Israel) | January 24, 1946
Nationality | Israeli |
Alma mater | Hebrew University |
Known for | Mathematical logic, Set theory, Large cardinal property |
Scientific career | |
Fields | Mathematician |
Institutions | Hebrew University |
Doctoral advisor | Azriel Lévy |
Doctoral students | Moti Gitik |
President of the ASL | |
In office 1996–1998 | |
Preceded by | George Boolos |
Succeeded by | Donald A. Martin |
President of the Hebrew University of Jerusalem | |
In office 1997–2009 | |
Preceded by | Hanoch Gutfreund |
Succeeded by | Menachem Ben-Sasson |
President of the DLMPST/IUHPST | |
In office 2016–2019 | |
Preceded by | Elliott Sober |
Succeeded by | Nancy Cartwright |
Menachem Magidor (Hebrew: מנחם מגידור; born January 24, 1946) is an Israeli mathematician who specializes in mathematical logic, in particular set theory. He served as president of the Hebrew University of Jerusalem, was president of the Association for Symbolic Logic from 1996 to 1998 and as president of the Division for Logic, Methodology and Philosophy of Science and Technology of the International Union for History and Philosophy of Science (DLMPST/IUHPS) from 2016 to 2019. In 2016 he was elected an honorary foreign member of the American Academy of Arts and Sciences. In 2018 he received the Solomon Bublick Award.
Biography
Menachem Magidor was born in Petah Tikva, Israel. He received his Ph.D. in 1973 from the Hebrew University of Jerusalem. His thesis, On Super Compact Cardinals, was written under the supervision of Azriel Lévy.[1] He served as president of the Hebrew University of Jerusalem from 1997 to 2009, following Hanoch Gutfreund and succeeded by Menachem Ben-Sasson.[2] The Oxford philosopher Ofra Magidor is his daughter.
Mathematical theories
Magidor obtained several important consistency results on powers of singular cardinals substantially developing the method of forcing. He generalized the Prikry forcing in order to change the cofinality of a large cardinal to a predetermined regular cardinal. He proved that the least strongly compact cardinal can be equal to the least measurable cardinal or to the least supercompact cardinal (but not at the same time). Assuming consistency of huge cardinals he constructed models (1977) of set theory with first examples of nonregular ultrafilters over very small cardinals (related to the famous Guilmann–Keisler problem concerning existence of nonregular ultrafilters), even with the example of jumping cardinality of ultrapowers. He proved consistent that [math]\displaystyle{ \aleph_\omega }[/math] is strong limit, but [math]\displaystyle{ 2^{\aleph_\omega}=\aleph_{\omega+2} }[/math]. He even strengthened the condition that [math]\displaystyle{ \aleph_\omega }[/math] is strong limit to that generalised continuum hypothesis holds below [math]\displaystyle{ \aleph_\omega }[/math]. This constituted a negative solution to the singular cardinals hypothesis. Both proofs used the consistency of very large cardinals. Magidor, Matthew Foreman, and Saharon Shelah formulated and proved the consistency of Martin's maximum, a provably maximal form of Martin's axiom. Magidor also gave a simple proof of the Jensen and the Dodd-Jensen covering lemmas. He proved that if 0# does not exist then every primitive recursive closed set of ordinals is the union of countably many sets in [math]\displaystyle{ L }[/math].
Selected published works
- Magidor, Menachem (1977). "On the singular cardinals problem. I". Israel Journal of Mathematics 28 (1–2): 1–31. doi:10.1007/BF02759779.
- Magidor, Menachem (1977). "On the singular cardinals problem. II". Annals of Mathematics. 2 106 (3): 517–547. doi:10.2307/1971065.
- Foreman, Matthew; Magidor, Menachem; Shelah, Saharon (1988). "Martin's maximum, saturated ideals, and nonregular ultrafilters. I". Annals of Mathematics. 2 127 (1): 1–47. doi:10.2307/1971415.
- Foreman, Matthew; Magidor, Menachem; Shelah, Saharon (1988). "Martin's maximum, saturated ideals, and nonregular ultrafilters". Annals of Mathematics. 2 127 (3): 521–545. doi:10.2307/2007004.
- Foreman, Matthew; Magidor, Menachem (1995). "Large cardinals and definable counterexamples to the continuum hypothesis". Annals of Pure and Applied Logic 76 (1): 47–97. doi:10.1016/0168-0072(94)00031-W.
References
- ↑ Menachem Magidor at the Mathematics Genealogy Project
- ↑ "Office of the President | האוניברסיטה העברית בירושלים | The Hebrew University of Jerusalem". New.huji.ac.il. 2017-09-01. https://new.huji.ac.il/en/page/454. Retrieved 2020-02-18.
Academic offices | ||
---|---|---|
Preceded by Elliott Sober |
President of the Division for Logic, Methodology and Philosophy of Science and Technology of the International Union for History and Philosophy of Science and Technology (DLMPST/IUHPST) 2016-2019 |
Succeeded by Nancy Cartwright |
Original source: https://en.wikipedia.org/wiki/Menachem Magidor.
Read more |