Biography:Nikolai V. Ivanov

From HandWiki
Nikolai V. Ivanov
Born1954 (age 69–70)
NationalityRussia
Alma materSteklov Mathematical Institute
Known forContributions to Teichmüller theory
Scientific career
FieldsMathematics
InstitutionsMichigan State University
Doctoral advisorVladimir Abramovich Rokhlin
InfluencesJean Dieudonné

Nikolai V. Ivanov (in Russian: Николай Владимирович Иванов, born 1954) is a Russia n mathematician who works on topology, geometry and group theory (particularly, modular Teichmüller groups).[1] He is a professor at Michigan State University.[2]

He obtained his Ph.D. under the guidance of Vladimir Abramovich Rokhlin in 1980 at the Steklov Mathematical Institute.[3]

According to Google Scholar, on 5 July 2020, Ivanov's works had received 2,376 citations and his h-index was 22.[2]

He is a fellow of the American Mathematical Society since 2012.[4]

He is the author of the 1992 book Subgroups of Teichmüller Modular Groups.[5]

Among his contributions to mathematics are his classification of subgroups of surface mapping class groups,[6] and the establishment that surface mapping class groups satisfy the Tits alternative.[7]

Selected publications

  • "Automorphisms of complexes of curves and of Teichmuller spaces" (1997), International Mathematics Research Notices 14, pp. 651–666.
  • with John D. McCarthy: "On injective homomorphisms between Teichmüller modular groups I" (1999), Inventiones mathematicae 135 (2), pp. 425–486.
  • "On the homology stability for Teichmüller modular groups: closed surfaces and twisted coefficients" (1993), Contemporary Mathematics 150, pp. 149–149.

References

  1. Mathematical Association of America, Monthly 118: "Arnol’d, the Jacobi Identity, and Orthocenters", p. 65.
  2. 2.0 2.1 Nikolai V. Ivanov publications indexed by Google Scholar
  3. Nikolai V. Ivanov at the Mathematics Genealogy Project
  4. List of Fellows of the American Mathematical Society
  5. Review by Francis Bonahon: Bull. Amer. Math. Soc. 30 (1994), 138–142.
  6. Handel & Mosher: Subgroup classification in Out(Fn)
  7. Leininger & Margalit: Two generator subgroups of the pure braid group

External links