• Speaker: Dusa McDuff
  • Time: 2:00-3:00
  • Abstract: The ellipsoidal capacity function $c_X(z)$ of a symplectic four-manifold $X$ measures how much the form on $X$ must be dilated in order for it to admit an embedded ellipsoid of eccentricity $z$. In most cases there are just finitely many obstructions to such an embedding besides the volume. If there are infinitely many obstructions, $X$ is said to have a staircase. This talk will give an almost complete description of these staircases when $X$ is a Hirzebruch surface $H_b$ formed by blowing up the projective plane with weight $b$. There is an interweaving, recursively defined, family of obstructions that show there is an open dense set of shape parameters $b$ that are blocked, i.e., have no staircase, and an uncountable number of other values of $b$ that do admit staircases. Moreover, there are interesting symmetries that act on the set of staircases. This is joint work with Nicki Magill and Morgan Weiler.