Math Papers
The Gysin exact sequence for S^1-equivariant symplectic homology
joint work with Alexandru Oancea,
Journal of Topology and Analysis 5 (2013) no 4, 361-407.
We define S1-equivariant symplectic homology for symplectically aspherical manifolds with contact boundary, using a Floer-type construction first proposed by Viterbo. We show that it is related to the usual symplectic homology by a Gysin exact sequence. As an important ingredient of the proof, we define a parametrized version of symplectic homology, corresponding to families of Hamiltonian functions indexed by a finite dimensional smooth parameter space. We define a parametrized version of the Robbin-Salamon index, which gives the grading for these new versions of symplectic homology. We indicate several applications and ramifications of our constructions.
This paper appeared in Journal of Topology and Analysis.
Back