SMS scnews item created by Stephan Tillmann at Tue 17 May 2016 0921
Type: Seminar
Modified: Tue 17 May 2016 0922
Distribution: World
Expiry: 16 Aug 2016
Calendar1: 25 May 2016 1200-1300
CalLoc1: Carslaw 535A
CalTitle1: Abundant Quasi-Fuchsian Surfaces in Cusped Hyperbolic 3-Manifolds
Auth: tillmann@p710.pc (assumed)

# Abundant Quasi-Fuchsian Surfaces in Cusped Hyperbolic 3-Manifolds

### Daryl Cooper (UCSB)

Wednesday 25 May 2016 from 12:00–13:00 in Carslaw 535A

Abstract: Suppose $$M$$ is a finite volume hyperbolic 3-manifold with at least one cusp. Given two disjoint hyperbolic planes $$P$$,$$P'$$ in hyperbolic 3-space $$H$$ there is a closed quasi-Fuchsian surface in $$M$$ and a pre-image in $$H$$ that separates $$P$$ from $$P'$$. This result is due to Kahn and Markovic when M is closed. Joint work with David Futer.