Title: Properties of the strong unstable foliation.
Speaker: Davi Obata (University of Chicago)
Speaker's URL: http://math.uchicago.edu/~davi.obata/
Abstract: The understanding of invariant foliations is very important in the theory of uniformly and partially hyperbolic dynamics. The main theme of this talk is to study transitive Anosov (or uniformly hyperbolic) systems having a decomposition of the form E^s + E^c + E^u, where E^c expands uniformly. There are two foliations that we will consider, the (center)unstable foliation W^{cs} and the strong unstable foliation W^u, tangent to E^c + E^u and E^u, respectively.
The foliation W^{cu} is very well understood. It is known that the foliation is minimal, i.e. every leaf is dense, and that there is only one ergodic invariant measure "compatible" with that foliation, the so-called SRB measure. However, the strong unstable foliation is not well understood. In this talk, I will survey some recent progress in the direction of understanding topological and ergodic properties of the strong unstable foliation and how this is related to measure rigidity for u-Gibbs measures.
Properties of the strong unstable foliation
March 23, 2023
3:00PM - 4:00PM
MW 154
Add to Calendar
2023-03-23 15:00:00
2023-03-23 16:00:00
Properties of the strong unstable foliation
Title: Properties of the strong unstable foliation.
Speaker: Davi Obata (University of Chicago)
Speaker's URL: http://math.uchicago.edu/~davi.obata/
Abstract: The understanding of invariant foliations is very important in the theory of uniformly and partially hyperbolic dynamics. The main theme of this talk is to study transitive Anosov (or uniformly hyperbolic) systems having a decomposition of the form E^s + E^c + E^u, where E^c expands uniformly. There are two foliations that we will consider, the (center)unstable foliation W^{cs} and the strong unstable foliation W^u, tangent to E^c + E^u and E^u, respectively.
The foliation W^{cu} is very well understood. It is known that the foliation is minimal, i.e. every leaf is dense, and that there is only one ergodic invariant measure "compatible" with that foliation, the so-called SRB measure. However, the strong unstable foliation is not well understood. In this talk, I will survey some recent progress in the direction of understanding topological and ergodic properties of the strong unstable foliation and how this is related to measure rigidity for u-Gibbs measures.
MW 154
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ascwebservices@osu.edu
America/New_York
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Date Range
Add to Calendar
2023-03-23 15:00:00
2023-03-23 16:00:00
Properties of the strong unstable foliation
Title: Properties of the strong unstable foliation.
Speaker: Davi Obata (University of Chicago)
Speaker's URL: http://math.uchicago.edu/~davi.obata/
Abstract: The understanding of invariant foliations is very important in the theory of uniformly and partially hyperbolic dynamics. The main theme of this talk is to study transitive Anosov (or uniformly hyperbolic) systems having a decomposition of the form E^s + E^c + E^u, where E^c expands uniformly. There are two foliations that we will consider, the (center)unstable foliation W^{cs} and the strong unstable foliation W^u, tangent to E^c + E^u and E^u, respectively.
The foliation W^{cu} is very well understood. It is known that the foliation is minimal, i.e. every leaf is dense, and that there is only one ergodic invariant measure "compatible" with that foliation, the so-called SRB measure. However, the strong unstable foliation is not well understood. In this talk, I will survey some recent progress in the direction of understanding topological and ergodic properties of the strong unstable foliation and how this is related to measure rigidity for u-Gibbs measures.
MW 154
Department of Mathematics
math@osu.edu
America/New_York
public