Disk-like surfaces of section and symplectic capacities
Abstract
We prove that the cylindrical capacity of a dynamically convex domain in R4 agrees with the least symplectic area of a disk-like global surface of section of the Reeb flow on the boundary of the domain. Moreover, we prove the strong Viterbo conjecture for all convex domains in R4 which are sufficiently C3 close to the round ball. This generalizes a result of Abbondandolo-Bramham-Hryniewicz-Salom\~ao establishing a systolic inequality for such domains.
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