Friday, March 29, 2019 2:30 pm
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2:30 pm
EDT (GMT -04:00)
Martin Pinsonnault, Western University
"Stability of Symplectomorphism Groups of Small Rational Surfaces"
Let $(X_k,\omega_k)$ be the symplectic blow-up of the projective plane at $k$ balls, $0\leq k\leq 8$, of capacities $c_1,\ldots, c_k$. After reviewing some facts on Kahler cones and curve cones of tamed almost complex structures, we will give sufficient conditions on two sets of capacities $\{c_i\}$ and $\{c_i’\}$ for the associated symplectomorphism groups to be homotopy equivalent. In particular, we will explain when those groups are homotopy equivalent to stabilisers of points in $(X_{k-1}, \omega_{k-1})$. We will discuss some corollaries for the spaces of symplectic balls.
MC 5403