Seminar 3.20.14 Burago
Title: Just so stories (R. Kipling) Speaker: Dima Burago, Penn State Seminar Type: Ergodic Theory and Probability Abstract: This is not a usual type of a seminar talk, though I have given several...
View ArticleColloquium 4.3.14 Eskin
Title: The SL(2,R) action on moduli space Speaker: Alex Eskin, University of Chicago Abstract: We prove some ergodic-theoretic rigidity properties of the action of SL(2; R) on the moduli space of...
View ArticleSeminar 4.17.14 Glasscock
Title: A Dimension for Subsets of Z^d and a Related Marstrand Theorem Speaker: Daniel Glasscock, The Ohio State University
View ArticleSeminar 5.14.14 Van Strien
Title: Dynamics on random networks Speaker: Sebastian Van Strien, Imperial College, London Seminar Type: Ergodic Theory/Probability Abstract: Networks in which some nodes are highly connected and...
View ArticleSeminar 5.29.14 Son
Title: Joint ergodicity along generalized linear functions Speaker: Younghwan Son, Weizmann Institute (Israel)
View ArticleSeminar 6.25.14 Adams
Title: A Case of Anything Goes in Infinite Ergodic Theory Speaker: Terry Adams, US DoD Seminar Type: Ergodic Theory/Probability Abstract: Dynamical systems are well studied in the finite measure...
View ArticleSeminar 8.21.14 Climenhaga
Title: “Tower constructions from specification properties” Speaker: Vaughn Climenhaga (Houston) Abstract: Given a dynamical system with some hyperbolicity, the equilibrium states associated to...
View ArticleSeminar 8.28.14 Melbourne
Speaker: Ian Melbourne (Warwick) Title: Mixing for dynamical systems with infinite measure Abstract: We describe results on mixing for a large class of dynamical systems (both discrete and continuous...
View ArticleSeminar Fall 2014
Here is our complete program for Fall 2014: August 21: Vaughn Climenhaga (Houston) August 28: Ian Melbourne (Warwick, UK) Sept 11: Ilya Vinogradov (Bristol, UK) Sept 18: Lei Yang (Yale) Sept 25:...
View ArticleSeminar 9.11.14 Vinogradov
Speaker: Ilya Vinogradov (Bristol, UK) Title: Effective Ratner Theorem for ASL(2, R) and the gaps of the sequence \sqrt n modulo 1 Abstract: Let G=SL(2,\R)\ltimes R^2 and Gamma=SL(2,Z)\ltimes Z^2....
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