Presented By: Department of Mathematics
RTG Working Seminar on Geometry, Dynamics and Topology
Strictly Convex Divisible Domains II
We will continue the proof of Benoist's theorem (A properly convex divisible domain is Gromov hyperbolic if and only if it is strictly convex if and only if the boundary is C^1). Time permitting we will discuss another result of Benoist showing that strictly convex divisible domains behave like negatively curved manifolds, namely that every element has a unique axis (i.e. is proximal). Speaker(s): Wouter Van Limbeek (University of Michigan)
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