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Title:
S-arithmetic Diophantine approximation

Speaker:
Shreyasi Datta

Abstract:
Diophantine approximation deals with quantitative and qualitative aspects of approximating numbers by rationals. A major breakthrough by Kleinbock and Margulis in 1998 was to study Diophantine approximations for manifolds using homogeneous dynamics. After giving an overview of recent developments in this subject, I will talk about Diophantine approximation in the S-arithmetic set-up, where S is a finite set of valuations of rationals.

Link:
https://www.ias.edu/video/s-arithmetic-diophantine-approximation