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比利时vs摩洛哥足彩 ,
university of california san diego

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math 211b - group actions seminar

or landesberg

yale university

non-rigidity of horocycle orbit closures in geometrically infinite surfaces

abstract:

 horospherical group actions on homogeneous spaces are famously known to be extremely rigid. in finite volume homogeneous spaces, it is a special case of ratner's theorems that all horospherical orbit closures are homogeneous. rigidity further extends in rank-one to infinite volume but geometrically finite spaces. the geometrically infinite setting is far less understood. we consider $\mathbb{z}$-covers of compact hyperbolic surfaces and show that they support quite exotic horocycle orbit closures. surprisingly, the topology of such orbit closures delicately depends on the choice of a hyperbolic metric on the covered compact surface. in particular, our constructions provide the first examples of geometrically infinite spaces where a complete description of non-trivial horocycle orbit closures is known. based on joint work with james farre and yair minsky.

 

host: brandon seward

february 16, 2023

10:00 am

 apm 7218 and zoom id 967 4109 3409
email an organizer for the password

 

research areas

ergodic theory and dynamical systems

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