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Joan Birman

From Wikipedia, the free encyclopedia
Joan Sylvia Lyttle Birman
Born (1927-05-30) May 30, 1927 (age 97)
NationalityAmerican
Alma materB.A., Barnard College, 1948
Ph.D., Courant Institute (NYU), 1968
Known forBraid theory, knot theory
Awards
  • Chauvenet Prize
  • AAAS member
  • Sloan Fellow
  • Guggenheim Fellow
  • AMS Fellow
  • AWM Fellow
  • National Academy of Sciences member
Scientific career
FieldsMathematics
InstitutionsBarnard College, Columbia University, University of Haifa
Doctoral advisorWilhelm Magnus
Doctoral students
Websitehttp://www.math.columbia.edu/~jb/

Joan Sylvia Lyttle Birman (born May 30, 1927, in New York City[1]) is an American mathematician, specializing in low-dimensional topology. She has made contributions to the study of knots, 3-manifolds, mapping class groups of surfaces, geometric group theory, contact structures and dynamical systems. Birman is research professor emerita at Barnard College, Columbia University,[2] where she has been since 1973.

Family

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Her parents were George and Lillian Lyttle, both Jewish immigrants.[3] Her father was from Russia but grew up in Liverpool, England. Her mother was born in New York and her parents were Russian-Polish immigrants. At age 17, George emigrated to the US and became a successful dress manufacturer. He appreciated the opportunities from having a business but he wanted his daughters to focus on education. She has three children, Kenneth P. Birman, Deborah Birman Shlider, and Carl David Birman. Her late husband, Joseph Birman, was a physicist and a leading advocate for human rights for scientists.[4]

Education

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After high school, Birman entered Swarthmore College, a coeducational institution in Swarthmore, Pennsylvania, and majored in mathematics. However, she disliked living in the dorms so she transferred to Barnard College, a women's only college affiliated to Columbia University, to live at home.[3]

Birman received her B.A. (1948) in mathematics from Barnard College and an M.A. (1950) in physics from Columbia University. After working in industry from 1950 to 1960, she did a PhD in mathematics at the Courant Institute (NYU) under the supervision of Wilhelm Magnus, graduating in 1968. Her dissertation was titled Braid groups and their relationship to mapping class groups.[5]

Career

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After she earned her bachelor's degree from Barnard, Birman accepted a position at the Polytechnic Research and Development Co., which was affiliated with Brooklyn Polytechnic University. She later worked from the Technical Research Group and the W. L. Maxson Corporation.[6]

Birman's first academic position was at the Stevens Institute of Technology (1968–1973). When she joined, she was the only female professor out of 160.[7] In 1969 she published "On Braid Groups", which introduced a way to relate the mapping class group of a surface to the mapping class group of a punctured version of the same surface. Known as the Birman Exact Sequence, this has become one of the most important tools in the study of braids and surfaces.[8] During the later part of this period she published a monograph, 'Braids, links, and mapping class groups' based on a graduate course she taught as a visiting professor at Princeton University in 1971–72. This book is considered the first comprehensive treatment of braid theory, introducing the modern theory to the field, and contains the first complete proof of the Markov theorem on braids.[8]

In 1973, she joined the faculty at Barnard College, where she served as Chairman of the Mathematics Department from 1973 to 1987, 1989 to 1991, and 1995 to 1998. She was a visiting scholar at the Institute for Advanced Study in the summer of 1988.[9]

She supervised 21 doctoral students, and has a total of 50 academic descendants. Her doctoral students include Józef Przytycki.[5]

Birman was a founding editor of the journals Geometry and Topology and Algebraic and Geometric Topology. [10]

Birman was a co-founder of Mathematical Sciences Publishing, a non-profit publishing house. She was a member of the New York Academy of Sciences Human Rights of Scientists Committee.[11]

in 1990, Birman donated funds to the American Mathematical Society (AMS) to establish the Ruth Lyttle Satter Prize in Mathematics in honor of her sister, Ruth Lyttle Satter, who was a plant physiologist.[10]

In 2017, she endowed the Joan and Joseph Birman Fellowship for Women Scholars at the American Mathematical Society to support mathematical research by mid-career women.[12]

Birman was an AMS Council member at large.[13]

Work

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According to her MathSciNet author profile, Birman's scientific work includes 106 research publications and over 300 published reviews in Math Reviews. She is the author of the research monograph Braids, Links, and Mapping Class Groups.

Recognition

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In 1974, Birman was selected as a Sloan Research Fellow by the Alfred P. Sloan Foundation.[14] In 1987, she was selected by the Association for Women in Mathematics to be a Noether Lecturer; this lecture honors women who have made fundamental and sustained contributions to the mathematical sciences.[15] In 1994, she was selected as a Guggenheim Foundation Fellow by the John Simon Guggenheim Memorial Foundation.[16] In 1996, the Mathematical Association of America awarded Birman the Chauvenet Prize, "the highest award for mathematical expository writing" for her 1993 essay New Points of View in Knot Theory.[17]

In 2003, Birman was elected to the European Academy of Sciences.[18] In 2005, she won the New York City Mayor's Award for Excellence in Science and Technology.[1]

Birman received an honorary doctorate from the Technion Israel Institute of Technology.[10]

In 2012, Birman was elected to the American Academy of Arts and Sciences[19][20] In 2013, she became a fellow of the American Mathematical Society in the inaugural class.[21]

In 2013 the Association for Women in Mathematics established the Joan & Joseph Birman Research Prize in Topology and Geometry,[22] first awarded in 2015.

In 2015, Birman was named an honorary member of the London Mathematical Society.[23]

The Association for Women in Mathematics included her in the 2020 class of AWM Fellows for "her groundbreaking research connecting diverse fields, and for her award-winning expository writing; for continuously supporting women in mathematics as an active mentor and a research role model; and for sponsoring multiple prize initiatives for women".[24]

In 2021, Birman was elected to the National Academy of Sciences.[25]

She is included in a deck of playing cards featuring notable women mathematicians published by the Association of Women in Mathematics.[26]

Selected publications

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  • Birman, Joan S.; Hilden, Hugh M. (1973). "On Isotopies of Homeomorphisms of Riemann Surfaces". Annals of Mathematics. 97 (3): 424–439. CiteSeerX 10.1.1.309.7235. doi:10.2307/1970830. JSTOR 1970830. S2CID 17300671.
  • "Heegaard splittings of branched coverings of 𝑆³". Transactions of the American Mathematical Society. 213: 315–352. 1975.
  • Birman, Joan S.; Lubotzky, Alex; McCarthy, John (1983). "Abelian and solvable subgroups of the mapping class groups". Duke Mathematical Journal. 50 (4): 1107–1120. doi:10.1215/S0012-7094-83-05046-9.
  • Birman, Joan S.; Williams, R.F. (1983). "Knotted periodic orbits in dynamical systems—I: Lorenz's equation". Topology. 22: 47–82. doi:10.1016/0040-9383(83)90045-9.
  • Birman, Joan S. (1985). "On the Jones polynomial of closed 3-braids". Inventiones Mathematicae. 81 (2): 287–294. Bibcode:1985InMat..81..287B. doi:10.1007/BF01389053. S2CID 123023534.
  • Birman, Joan S.; Wenzl, Hans (1989). "Braids, link polynomials and a new algebra". Transactions of the American Mathematical Society. 313: 249–273. doi:10.1090/S0002-9947-1989-0992598-X.
  • Birman, Joan S.; Menasco, William W. (1990). "Studying links via closed braids IV: composite links and split links". Inventiones Mathematicae. 102: 115–139. arXiv:math/0407403. Bibcode:1990InMat.102..115B. doi:10.1007/BF01233423. S2CID 189830532.
  • Birman, Joan S.; Lin, Xiao-Song (1993). "Knot polynomials and Vassiliev's invariants". Inventiones Mathematicae. 111: 225–270. Bibcode:1993InMat.111..225B. doi:10.1007/BF01231287. S2CID 122687215.
  • Birman, Joan; Ko, Ki Hyoung; Lee, Sang Jin (1998). "A New Approach to the Word and Conjugacy Problems in the Braid Groups". Advances in Mathematics. 139 (2): 322–353. arXiv:math/9712211. doi:10.1006/aima.1998.1761. S2CID 1079633.
  • Birman, Joan S.; Wrinkle, Nancy C. (2000). "On Transversally Simple Knots". Journal of Differential Geometry. 55 (2): 325–354. arXiv:math/9910170. doi:10.4310/jdg/1090340880. S2CID 16145645.
  • Birman, Joan S.; Ko, Ki Hyoung; Lee, Sang Jin (2001). "The Infimum, Supremum, and Geodesic Length of a Braid Conjugacy Class". Advances in Mathematics. 164: 41–56. arXiv:math/0003125. doi:10.1006/aima.2001.2010. S2CID 15513091.
  • Birman, Joan; Margalit, Dan; Menasco, William (2016). "Efficient geodesics and an effective algorithm for distance in the complex of curves". Mathematische Annalen. 366 (3–4): 1253–1279. arXiv:1408.4133. doi:10.1007/s00208-015-1357-y. S2CID 119321516.
  • Braids, links and mapping class groups. Annals of Mathematical Studies. Princeton University Press. 1975. ISBN 978-0691081496. MR 0375281. Retrieved 20 February 2021.[27]

See also

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References

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  1. ^ a b Larry Riddle. "Joan S. Birman", Biographies of Women Mathematicians, at Agnes Scott College
  2. ^ "Home Page for Joan S. Birman". www.math.columbia.edu. Retrieved 2020-11-06.
  3. ^ a b "Birman biography". www-history.mcs.st-andrews.ac.uk. Retrieved 2017-09-23.
  4. ^ "Joseph L. Birman (1927–2016)". www.aps.org. Retrieved 2018-04-02.
  5. ^ a b Joan Sylvia Lyttle Birman at the Mathematics Genealogy Project
  6. ^ "Autobiography by Joan S. Birman". Celbratio Mathematica. Mathematical Sciences Research Institute. Retrieved 20 February 2021.
  7. ^ "Working at Their Full Potential: The Impact of the AMS Birman Fellowship" (PDF). American Mathematical Society. March 7, 2022. Retrieved October 20, 2022.
  8. ^ a b Margalit, Dan (2019). "The Mathematics of Joan Birman" (PDF). AMS Notices. 66 (3).
  9. ^ Institute for Advanced Study: A Community of Scholars
  10. ^ a b c Jackson, Allyn; Traynor, Lisa (January 2007). "Interview with Joan Birman" (PDF). Notices of the American Mathematical Society. 54 (1): 20–29. Retrieved 20 February 2021.
  11. ^ Lam, Wai-TIng (Jul–Aug 2009). "The Charm of Topology Dr. Joan Birman: Mathematics is very beautiful". Newsletter of the Association for Women in Mathematics. 39 (4): 6–7.
  12. ^ "American Mathematical Society – The Joan and Joseph Birman Fellowship for Women Scholars". www.ams.org. Retrieved 2018-04-02.
  13. ^ "AMS Committees". American Mathematical Society. Retrieved 2023-03-27.
  14. ^ "Alfred P. Sloan Foundation Past Fellows". Alfred P. Sloan Foundation. Archived from the original on 14 March 2018. Retrieved 20 February 2021.
  15. ^ "Noether Lectures 1987 Lecturer: Joan S. Birman". Association for Women in Mathematics. Retrieved 10 April 2021.
  16. ^ "Joan S. Birman". John Simon Guggenheim Foundation. Retrieved 2021-02-20.
  17. ^ Birman, Joan (1993). "New Points of View in Knot Theory". Bull. Amer. Math. Soc. (N.S.). 28 (2): 253–287. arXiv:math/9304209. Bibcode:1993math......4209B. doi:10.1090/s0273-0979-1993-00389-6. S2CID 17229952.
  18. ^ "Joan S. Birman". European Academy of Sciences. Retrieved 2021-02-20.
  19. ^ "Prof. Joan S. Birman '48 elected to the American Academy of Arts and Sciences". Barnard College. 2012-04-17. Retrieved 2021-02-20.
  20. ^ "Joan S. Lyttle Birman". American Academy of Arts & Sciences. 2021-02-09. Retrieved 2021-02-20.
  21. ^ List of Fellows of the American Mathematical Society, retrieved 2012-11-10.
  22. ^ "AWM Birman Research Prize". Association for Women in Mathematics (AWM). Retrieved 2022-12-01.
  23. ^ "Honorary Members 2015". Bulletin of the London Mathematical Society. 48 (3): 548–556. 2016-03-28. doi:10.1112/blms/bdw014. ISSN 0024-6093. S2CID 247694394.
  24. ^ 2020 Class of AWM Fellows, Association for Women in Mathematics, retrieved 2019-11-08
  25. ^ "2021 NAS Election". National Academy of Sciences. Retrieved 26 April 2021.
  26. ^ "Mathematicians of EvenQuads Deck 1". awm-math.org. Retrieved 2022-06-18.
  27. ^ Magnus, W. (1976). "Review: Braids, links and mapping class groups by Joan S. Birman" (PDF). Bull. Amer. Math. Soc. 82: 42–45. doi:10.1090/s0002-9904-1976-13937-7.
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