December 3, 2020
3:00PM - 4:00PM
Zoom (email the organizers for a link)
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2020-12-03 16:00:00
2020-12-03 17:00:00
Ergodic Theory Seminar - Nikos Frantzikinakis
Title: Furstenberg Systems of Bounded Sequences
Speaker: Nikos Frantzikinakis - University of Crete
Abstract: Furstenberg systems are measure preserving systems that are used to model statistical properties of bounded sequences of complex numbers. They offer a different viewpoint for a variety of problems for which progress can be made by a partial or complete description of suitably chosen Furstenberg systems. In this lecture I will give several examples of this principle and in the process we will see several structural properties of Furstenberg systems arising from smooth functions and bounded multiplicative functions.
Zoom (email the organizers for a link)
OSU ASC Drupal 8
ascwebservices@osu.edu
America/New_York
public
Date Range
Add to Calendar
2020-12-03 15:00:00
2020-12-03 16:00:00
Ergodic Theory Seminar - Nikos Frantzikinakis
Title: Furstenberg Systems of Bounded Sequences
Speaker: Nikos Frantzikinakis - University of Crete
Abstract: Furstenberg systems are measure preserving systems that are used to model statistical properties of bounded sequences of complex numbers. They offer a different viewpoint for a variety of problems for which progress can be made by a partial or complete description of suitably chosen Furstenberg systems. In this lecture I will give several examples of this principle and in the process we will see several structural properties of Furstenberg systems arising from smooth functions and bounded multiplicative functions.
Zoom (email the organizers for a link)
Department of Mathematics
math@osu.edu
America/New_York
public
Title: Furstenberg Systems of Bounded Sequences
Speaker: Nikos Frantzikinakis - University of Crete
Abstract: Furstenberg systems are measure preserving systems that are used to model statistical properties of bounded sequences of complex numbers. They offer a different viewpoint for a variety of problems for which progress can be made by a partial or complete description of suitably chosen Furstenberg systems. In this lecture I will give several examples of this principle and in the process we will see several structural properties of Furstenberg systems arising from smooth functions and bounded multiplicative functions.