Alexander Beilinson is the David and Mary Winton Green University Professor of Mathematics at the University of Chicago. His research interests encompass arithmetic algebraic geometry and the geometric Langlands program. Beilinson received his PhD from Lomonosov Moscow State University in 1980, advised by Yuri Ivanovich Manin. Early in his career, he was a researcher at the Landau Institute for Theoretical Physics from 1987 to 1993 and served as a professor of mathematics at the Massachusetts Institute of Technology from 1989 to 1998, often spending fall semesters there starting in 1989. He joined the University of Chicago faculty in 1998, where he holds his current endowed professorship.

Beilinson has earned prestigious awards recognizing his groundbreaking contributions to mathematics. These include the Shaw Prize in Mathematical Sciences in 2020, shared with David Kazhdan, for their huge influence on and profound contributions to representation theory and many other areas; the Wolf Prize in Mathematics in 2018, shared with Vladimir Drinfeld, for their pioneering work in algebraic geometry and representation theory; the Ostrowski Prize in 1999, shared with Helmut Hofer; and the Moscow Mathematical Society Prize in 1985. He was elected to the American Academy of Arts and Sciences in 2008 and to the National Academy of Sciences in 2017. Key publications include his early paper 'Coherent sheaves on P^n and problems in linear algebra' (1978) and 'Localisation de g-modules' with Joseph Bernstein (1981). With Vladimir Drinfeld, he authored the book Chiral Algebras (2004), which develops foundational aspects of chiral algebra theory originating in mathematical physics. Beilinson's seminal achievements feature the Beilinson conjectures on special values of L-functions and relations to algebraic cycles, the invention of perverse sheaves, and the Beilinson-Bernstein localization theorem. Together with Bernstein, he proved the Kazhdan-Lusztig conjectures and Jantzen conjectures, establishing the role of derived categories in representation theory. His introduction of motivic sheaves and advancements in derived noncommutative algebraic geometry have become indispensable tools in modern geometry, profoundly shaping arithmetic geometry, K-theory, conformal field theory, and the geometric Langlands program.

Professional Email: sasha@math.uchicago.edu