Characterizing symplectic capacities on ellipsoids
Abstract
It is a long-standing conjecture that all symplectic capacities which are equal to the Gromov width for ellipsoids coincide on a class of convex domains in R2n. It is known that they coincide for monotone toric domains in all dimensions. In this paper, we study whether requiring a capacity to be equal to the kth Ekeland-Hofer capacity for all ellipsoids can characterize it on a class of domains. We prove that for k=n=2, this holds for convex toric domains, but not for all monotone toric domains. We also prove that for k=n 3, this does not hold even for convex toric domains.
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