Geometry Topology Student Seminar
Wednesday, September 25, 2013 - 2:05pm
1 hour (actually 50 minutes)
The aim of this talk is to give fairly self contained proof of the following result due to Eliashberg. There is exactly one holomorphically fillable contact structure on $T^3$. If time permits we will try to indicate different notions of fillability of contact manifolds in dimension 3.