MATH Seminar
| Title: Contact geometry, open books and monodromy |
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| Colloquium: Topology |
| Speaker: John Etnyre of Georgia Tech |
| Contact: Aaron Abrams, abrams@mathcs.emory.edu |
| Date: 2009-04-06 at 3:00PM |
| Venue: W306 |
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| Abstract: Recall that an open book decomposition of a 3-manifold M is a link L in M whose complement fibers over the circle with fiber a Seifert surface for L. Giroux's correspondence relates open book decompositions of a manifold M to contact structures on M. This correspondence has been fundamental to our understanding of contact geometry. An intriguing question raised by this correspondence is how geometric properties of a contact structure are reflected in the monodromy map describing the open book decomposition. In this talk I will show that there are several interesting monoids in the mapping class group that are related to various properties of a contact structure (like being Stein fillable, weakly fillable, . . .). I will also show that there are open book decompositions of Stein fillable contact structures whose monodromy cannot be factored as a product of positive Dehn twists. This is joint work with Jeremy Van Horn-Morris and Ken Baker. |
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