Megumi Harada is a mathematician who works as a professor in the department of mathematics and statistics at McMaster University, where she holds a tier-two Canada Research Chair in Equivariant Symplectic and Algebraic Geometry.[1][2]
Research
Harada's research involves the symmetries of symplectic spaces and their connections to other areas of mathematics including algebraic geometry, representation theory, K-theory, and algebraic combinatorics.[3]
Education and career
Dr. Harada went to high school in the United States. Harada graduated in 1996 from Harvard University, with a bachelor's degree in mathematics.[3] She completed her doctorate in 2003 from the University of California, Berkeley. Her dissertation, The Symplectic Geometry of the Gel'fand-Cetlin-Molev Basis for Representations of Sp(2n, C), concerned symplectic geometry and was supervised by Allen Knutson.[3][4]
After postdoctoral studies at the University of Toronto, she joined the McMaster faculty in 2006.[3]
Recognition
In 2013, Harada won the Ruth I. Michler Memorial Prize of the Association for Women in Mathematics, funding her travel to Cornell University for research collaborations with Reyer Sjamar, Tara S. Holm, and Allen Knutson.[3] She was given her Canada Research Chair in 2014.[2] She is the 2018 winner of the Krieger–Nelson Prize "for her research on Newton–Okounkov bodies, Hessenberg varieties, and their relationships to symplectic geometry, combinatorics, and equivariant topology, among others".[5]
References
- ↑ Faculty, McMaster Mathematics & Statistics, archived from the original on 2019-04-21, retrieved 2017-08-17
- 1 2 "Canada Research Chair program names three McMaster recipients", McMaster Daily News, McMaster University, March 28, 2014
- 1 2 3 4 5 Megumi Harada wins Ruth I. Michler Memorial Prize, Association for Women in Mathematics, March 4, 2013
- ↑ Megumi Harada at the Mathematics Genealogy Project
- ↑ Professor Megumi Harada to receive the 2018 Krieger-Nelson Prize, Canadian Mathematical Society, February 26, 2018, retrieved 2018-03-02