Olga Kharlampovich (born March 25, 1960, in Sverdlovsk[1][2]) is a Russian-Canadian mathematician working in the area of group theory. She is the Mary P. Dolciani Professor of Mathematics at the CUNY Graduate Center and Hunter College.

Contributions

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Kharlampovich is known for her example of a finitely presented 3-step solvable group with unsolvable word problem (solution of the Novikov–Adian problem)[pub 1] and for the solution together with A. Myasnikov of the Tarski conjecture (from 1945) about equivalence of first-order theories of finitely generated non-abelian free groups[pub 2] (also solved by Zlil Sela[3]) and decidability of this common theory.

Algebraic geometry for groups, introduced by Baumslag, Myasnikov, Remeslennikov,[4] and Kharlampovich[pub 3] [pub 4] became one of the new research directions in combinatorial group theory.

Education and career

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She received her Ph.D. from the Leningrad State University in 1984 (her doctoral advisor was Lev Shevrin) and Russian “Doctor of Science” in 1990 from the Moscow Steklov Institute of Mathematics.[5]

Prior to her current appointment at CUNY, she held a position at Ural State University, Ekaterinburg, Russia, and was a Professor of Mathematics at McGill University, Montreal, Canada, where she had been working since 1990.

As of August 2011 she moved to Hunter College of the City University of New York as the Mary P. Dolciani Professor of Mathematics, where she is the inaugural holder of the first endowed professorship in the Department of Mathematics and Statistics.

Recognition

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For her undergraduate work on the Novikov–Adian problem she was awarded in 1981 a Medal from the Soviet Academy of Sciences. She received an Ural Mathematical Society Award in 1984 for the solution of the Malcev–Kargapolov problem posed in 1965 about the algorithmic decidability of the universal theory of the class of all finite nilpotent groups.

Kharlampovich was awarded in 1996 the Krieger–Nelson Prize of the Canadian Mathematical Society for her work on algorithmic problems in varieties of groups and Lie algebras (the description of this work can be found in the survey paper with Sapir[pub 5] and on the prize web site). She was awarded the 2015 Mal'cev Prize for the series of works on fundamental model-theoretic problems in algebra.[6]

She was elected a Fellow of the American Mathematical Society in the 2020 class "for contributions to algorithmic and geometric group theory, algebra and logic."[7]

Selected publications

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  1. ^ O. Kharlampovich, "A finitely presented solvable group with unsolvable word problem", Izvest. Ak. Nauk, Ser. Mat. (Soviet Math., Izvestia) 45, 4 (1981), pages 852–873.
  2. ^ O. Kharlampovich, and A. Myasnikov. "Elementary theory of free non-abelian groups." Journal of Algebra, volume 302 (2006), no. 2, pages 451–552.
  3. ^ O. Kharlampovich, A. Myasnikov, Irreducible affine varieties over a free group. I: Irreducibility of quadratic equations and nullstellensatz, Journal of Algebra, V. 200, pages 492–516 (1998),
  4. ^ O. Kharlampovich, A. Myasnikov, Irreducible affine varieties over a free group. II: Systems in row-echelon form and description of residually free groups, Journal of Algebra, V. 200, pages 517–570 (1998).
  5. ^ O. Kharlampovich and M. Sapir, Algorithmic problems in varieties, a survey, International Journal of Algebra and Computation, (1995), # 12, pages 379–602.

References

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  1. ^ Ural State University biographies, Ural State University, accessed March 26, 2019.
  2. ^ Birth year from ISNI authority control file, retrieved 2018-11-28.
  3. ^ Z. Sela, "Diophantine geometry over groups. VI. The elementary theory of a free group", Geometric and Functional Analysis 16 (3): pages 707–730, (2006).
  4. ^ G. Baumslag, A. Miasnikov, V. N. Remeslennikov. Algebraic geometry over groups I. Algebraic sets and ideal theory. Journal of Algebra. 1999, 219, pages 16–79.
  5. ^ "Olga Kharlampovich Curriculum Vitae" (PDF). Retrieved 2024-03-02.
  6. ^ http://www.ras.ru/about/awards/awdlist.aspx?awdid=64
  7. ^ 2020 Class of the Fellows of the AMS, American Mathematical Society, retrieved 2019-11-03
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