Symplectic capacities from positive S1-equivariant symplectic homology

Abstract

We use positive S1-equivariant symplectic homology to define a sequence of symplectic capacities ck for star-shaped domains in R2n. These capacities are conjecturally equal to the Ekeland-Hofer capacities, but they satisfy axioms which allow them to be computed in many more examples. In particular, we give combinatorial formulas for the capacities ck of any "convex toric domain" or "concave toric domain". As an application, we determine optimal symplectic embeddings of a cube into any convex or concave toric domain. We also extend the capacities ck to functions of Liouville domains which are almost but not quite symplectic capacities.