Artstein was born in Jerusalem, the daughter of mathematician Zvi Artstein, best known for his proof of Artstein's theorem. She graduated summa cum laude from Tel Aviv University in 2000, with a bachelor's degree in mathematics,[1] and completed her PhD at Tel Aviv University in 2004 under the supervision of Vitali Milman, with a dissertation on Entropy Methods.[1][3] She worked from 2004 to 2006 as a Veblen Research Instructor in Mathematics at Princeton University and as a researcher at the Institute for Advanced Study before returning to Tel Aviv as a faculty member in 2006.[1][4]
Recognition
Artstein won the Haim Nessyahu Prize in Mathematics, an annual dissertation award of the Israel Mathematical Union, in 2006.[5]
In 2008 she won the Krill Prize for Excellence in Scientific Research, from the
Wolf Foundation.[6]
In 2015 she won the Anna and Lajos Erdős Prize in Mathematics.[7] The award cited her "solution of Shannon's long standing problem on monotonicity of entropy (with K. Ball, F. Barthe and A. Naor), profound and unexpected development of the concept of duality, Legendre and Fourier transform from axiomatic viewpoint (with V. Milman) and discovery of an astonishing link between Mahler's conjecture in convexity theory and an isoperimetric-type inequality involving symplectic capacities (with R. Karasev and Y. Ostrover)".[8][9]
Selected publications
Artstein-Avidan, Shiri; Giannopoulos, Apostolos; Milman, Vitali (17 June 2015). "Asymptotic Geometric Analysis, Part I". Mathematical Surveys and Monographs. Providence, Rhode Island: American Mathematical Society. doi:10.1090/surv/202. ISBN978-1-4704-2193-9. ISSN0076-5376.
