Instantaneous Hamiltonian displaceability and arbitrary symplectic squeezability for critically negligible sets

Abstract

We call a metric space s-negligible iff its s-dimensional Hausdorff measure vanishes. We show that every countably m-rectifiable subset of R2n can be displaced from every (2n-m)-negligible subset by a Hamiltonian diffeomorphism that is arbitrarily C∞-close to the identity. As a consequence, every countably n-rectifiable and n-negligible subset of R2n is arbitrarily symplectically squeezable. Both results are sharp w.r.t. the parameter s in the s-negligibility assumption. The proof of our squeezing result uses folding. Potentially, our folding method can be modified to show that the Gromov width of B2n1 A equals π for every countably (n-1)-rectifiable closed subset A of the open unit ball B2n1. This means that A is not a barrier.