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Title:
Symplectic homology for cobordisms

Speaker:
Alexandru Oancea

Abstract:
Symplectic homology for a Liouville cobordism (possibly filled at the negative end) generalizes simultaneously the symplectic homology of Liouville domains and the Rabinowitz-Floer homology of their boundaries. I intend to explain a conceptual framework within which one can understand it, and give a sample application which shows how it can be used in order to obstruct cobordisms between contact manifolds. Based on joint work with Kai Cieliebak and Peter Albers.

Link:
https://www.ias.edu/video/puias/2017/0223-AlexandruOancea