From Equivariant Blow-Ups to Modular Symbols
Part of the beauty of mathematics is the interplay between its different branches. In this lecture, Maxim Kontsevich will talk about a recent discovery of an unexpected relation between questions in birational algebraic geometry and the theory of automorphic forms. Computer experiments with an easy-looking system of equations played an essential role in the discovery.
Kontsevich’s recent work on this topic has been with Yuri Tschinkel and Vasily Pestun. At the origin of this work was a question of constructing birational invariants of algebraic varieties endowed with an action of a finite group (e.g., a cyclic group generated by an automorphism of finite order). Based on a simple ansatz that ignores almost all non-trivial geometric information except spectra of group action at fixed points, they arrived at an overdetermined system of linear equations. To their surprise, the system has sporadic non-trivial solutions giving, for instance, an invariant of 3-dimensional manifolds with a birational automorphism of order 43. The existence of such a solution is explained by the existence of a certain arithmetic object (a motive, or an automorphic form).
About the Speaker
Kontsevich was born in 1964 in the USSR. He studied mathematics at Moscow State University where he was a student of Israel Gelfand. In 1992, he received his Ph.D. from the University of Bonn in Germany. Don Zagier served as his thesis advisor. For one year, he was a professor at the University of California, Berkeley. Since 1995, he has been a permanent professor at the Institut des Hautes Etudes Scientifiques in Bures-sur-Yvette, France. Kontsevich works in many areas of modern mathematics and mathematical physics and has received numerous prizes, including the Fields Medal in 1998.
TEA: 4:15-5:00pm
LECTURE: 5:00-6:15pm
When: Wed., Nov. 13, 2019 at 5:00 pm
Where: Simons Foundation
160 Fifth Ave., 2nd Floor
646-654-0066
Price: Free
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Part of the beauty of mathematics is the interplay between its different branches. In this lecture, Maxim Kontsevich will talk about a recent discovery of an unexpected relation between questions in birational algebraic geometry and the theory of automorphic forms. Computer experiments with an easy-looking system of equations played an essential role in the discovery.
Kontsevich’s recent work on this topic has been with Yuri Tschinkel and Vasily Pestun. At the origin of this work was a question of constructing birational invariants of algebraic varieties endowed with an action of a finite group (e.g., a cyclic group generated by an automorphism of finite order). Based on a simple ansatz that ignores almost all non-trivial geometric information except spectra of group action at fixed points, they arrived at an overdetermined system of linear equations. To their surprise, the system has sporadic non-trivial solutions giving, for instance, an invariant of 3-dimensional manifolds with a birational automorphism of order 43. The existence of such a solution is explained by the existence of a certain arithmetic object (a motive, or an automorphic form).
About the Speaker
Kontsevich was born in 1964 in the USSR. He studied mathematics at Moscow State University where he was a student of Israel Gelfand. In 1992, he received his Ph.D. from the University of Bonn in Germany. Don Zagier served as his thesis advisor. For one year, he was a professor at the University of California, Berkeley. Since 1995, he has been a permanent professor at the Institut des Hautes Etudes Scientifiques in Bures-sur-Yvette, France. Kontsevich works in many areas of modern mathematics and mathematical physics and has received numerous prizes, including the Fields Medal in 1998.
TEA: 4:15-5:00pm
LECTURE: 5:00-6:15pm
Buy tickets/get more info now