| Speaker: | Tomoo Matsumura (Cornell University) |
|---|---|
| Title: | Hamiltonian torus actions on orbifolds and orbifold-GKM theorem (joint work with T. Holm) |
| Date (JST): | Fri, Nov 26, 2010, 14:40 - 16:10 |
| Place: | Room 002, Mathematical Sciences Building, Komaba Campus |
| Abstract: | When a symplectic manifold M carries a Hamiltonian torus R action, the injectivity theorem states that the R-equivariant cohomology of M is a subring of the one of the fixed points and the GKM theorem allows us to compute this subring by only using the data of 1-dimensional orbits. The results in the first part of this talk are a generalization of this technique to Hamiltonian R actions on orbifolds and an application to the computation of the equivariant cohomology of toric orbifolds. In the second part, we will introduce the equivariant Chen-Ruan cohomology ring which is a symplectic invariant of the action on the orbifold and explain the injectivity/GKM theorem for this ring. |
