Multiple Polylogarithms, Algebraic K-Theory, and the Steinberg Module
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Explore a special seminar lecture where Daniil Rudenko from the University of Chicago delves into the fascinating connections between multiple polylogarithms, algebraic K-theory, and the Steinberg module. Discover how multiple polylogarithms serve as a nexus linking diverse mathematical domains including hyperbolic polytope volumes, scissors congruence, algebraic K-theory, and zeta function special values. Learn about recent advances in the Goncharov program that leverage the relationship between multiple polylogarithms and the Steinberg module. The presentation covers collaborative research with Steven Charlton and Danylo Radchenko, as well as ongoing work with Alexander Kupers and Ismael Sierra. This 69-minute advanced mathematics lecture from the Institute for Advanced Study provides valuable insights into cutting-edge research at the intersection of several mathematical fields.
Syllabus
Multiple Polylogarithms, Algebraic K-Theory, and the Steinberg Module - Daniil Rudenko
Taught by
Institute for Advanced Study