The Dani Correspondence and Its Applications in Diophantine Approximation - Lecture 1
Simons Semester on Dynamics via YouTube
Overview
Explore a lecture on the Dani Correspondence and its applications in mathematics, focusing on the intersection of Diophantine approximation and ergodic theory. Learn how rational numbers' density within the real line can be quantified, starting with Dirichlet's fundamental theorem on quadratic rate approximation. Discover how Schmidt and Davenport's ideas from the 1960s, later formalized by Dani in 1985, revolutionized the field by connecting Diophantine properties to orbital behavior in dynamical systems. Examine the evolution of these mathematical concepts and their modern applications in understanding long-term behavioral patterns of certain orbits, while gaining insights into recent developments that build upon this dynamic reformulation.
Syllabus
Reynold Fregoli (Universität Zürich), lecture 1
Taught by
Simons Semester on Dynamics