Biography:Sabir Gusein-Zade

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Short description: Russian mathematician (born 1950)
Sabir Gusein-Zade (2010), El Escorial

Sabir Medgidovich Gusein-Zade (Russian: Сабир Меджидович Гусейн-Заде; born 29 July 1950 in Moscow[1]) is a Russian mathematician and a specialist in singularity theory and its applications.[2]

He studied at Moscow State University, where he earned his Ph.D. in 1975 under the joint supervision of Sergei Novikov and Vladimir Arnold.[3] Before entering the university, he had earned a gold medal at the International Mathematical Olympiad.[2]

Gusein-Zade co-authored with V. I. Arnold and A. N. Varchenko the textbook Singularities of Differentiable Maps (published in English by Birkhäuser).[2]

A professor in both the Moscow State University and the Independent University of Moscow, Gusein-Zade also serves as co-editor-in-chief for the Moscow Mathematical Journal.[4] He shares credit with Norbert A'Campo for results on the singularities of plane curves.[5][6][7]

Selected publications

References

  1. Home page of Sabir Gusein-Zade
  2. 2.0 2.1 2.2 Artemov, S. B.; Belavin, A. A.; Buchstaber, V. M.; Esterov, A. I.; Feigin, B. L.; Ginzburg, V. A.; Gorsky, E. A.; Ilyashenko, Yu. S. et al. (2010), "Sabir Medgidovich Gusein-Zade", Moscow Mathematical Journal 10 (4), http://www.ams.org/distribution/mmj/vol10-4-2010/gusein-zade.html .
  3. Sabir Gusein-Zade at the Mathematics Genealogy Project
  4. Editorial Board (2011), "Sabir Gusein-Zade – 60", TWMS Journal of Pure and Applied Mathematics 2 (1): 161, http://static.bsu.az/w24/sabir%20huseinzade60.pdf .
  5. Singular Points of Plane Curves, London Mathematical Society Student Texts, 63, Cambridge University Press, Cambridge, 2004, p. 152, doi:10.1017/CBO9780511617560, ISBN 978-0-521-83904-4, https://books.google.com/books?id=8kjDbkf2iHUC&pg=PA152, "An important result, due independently to A'Campo and Gusein-Zade, asserts that every plane curve singularity is equisingular to one defined over [math]\displaystyle{ \mathbb R }[/math] and admitting a real morsification [math]\displaystyle{ f_t }[/math] with only 3 critical values" .
  6. Plane Algebraic Curves, Modern Birkhäuser Classics, Basel: Birkhäuser, 1986, p. vii, doi:10.1007/978-3-0348-5097-1, ISBN 978-3-0348-0492-9, https://books.google.com/books?id=KLtvNQMVOEYC&pg=PR7, "I would have liked to introduce the beautiful results of A'Campo and Gusein-Zade on the computation of the monodromy groups of plane curves" . Translated from the German original by John Stillwell, 2012 reprint of the 1986 edition.
  7. Rieger, J. H. (2005), "M-deformations of [math]\displaystyle{ \mathcal{A} }[/math]-simple [math]\displaystyle{ \Sigma^{n-p+1} }[/math]-germs from [math]\displaystyle{ \mathbb R^n }[/math] to [math]\displaystyle{ \mathbb R^p, n\ge p }[/math]", Mathematical Proceedings of the Cambridge Philosophical Society 139 (2): 333–349, doi:10.1017/S0305004105008625, "For map-germs very little is known about the existence of M-deformations beyond the classical result by A’Campo and Gusein–Zade that plane curve-germs always have M-deformations." 

External links