Sara Billey Explained

Sara Billey
Birth Date:6 February 1968
Birth Place:Alva, Oklahoma
Nationality:American
Fields:Mathematics
Workplaces:University of Washington
Alma Mater:Massachusetts Institute of Technology
University of California, San Diego
Doctoral Advisor:Adriano Garsia
Mark Haiman
Awards:Presidential Early Career Award for Scientists and Engineers[1]

Sara Cosette Billey (born February 6, 1968, in Alva, Oklahoma, United States) is an American mathematician working in algebraic combinatorics. She is known for her contributions on Schubert polynomials, singular loci of Schubert varieties, Kostant polynomials, and Kazhdan–Lusztig polynomials[2] often using computer verified proofs. She is currently a professor of mathematics at the University of Washington.

Billey did her undergraduate studies at the Massachusetts Institute of Technology, graduating in 1990.[3] She earned her Ph.D. in mathematics in 1994 from the University of California, San Diego, under the joint supervision of Adriano Garsia and Mark Haiman. She returned to MIT as a postdoctoral researcher with Richard P. Stanley, and continued there as an assistant and associate professor until 2003, when she moved to the University of Washington.[3]

In 2012, she became a fellow of the American Mathematical Society.[4] She also was an AMS Council member at large from 2005 to 2007.[5]

Publications

Selected books

Selected articles

External links

Notes and References

  1. Web site: The Presidential Early Career Award for Scientists and Engineers: Recipient Details:Sara Billey. NSF.
  2. Web site: Billey, Sara C.. MathSciNet. en. 2017-04-10.
  3. Web site: Curriculum vitae. September 26, 2017. 2018-04-30.
  4. Web site: List of Fellows of the American Mathematical Society. American Mathematical Society. July 31, 2015. https://web.archive.org/web/20150626101726/http://www.ams.org/profession/fellows-list. June 26, 2015.
  5. Web site: AMS Committees . 2023-03-29 . American Mathematical Society . en.
  6. Review of Singular loci of Schubert varieties by Michel Brion (2001),