Epsilon-non-squeezing and C0-rigidity of epsilon-symplectic embeddings

Abstract

An embedding (M1, ω1) (M2, ω2) (of symplectic manifolds of the same dimension) is called ε-symplectic if the difference * ω2 - ω1 is ε-small with respect to a fixed Riemannian metric on M1. We prove that if a sequence of ε-symplectic embeddings converges uniformly (on compact subsets) to another embedding, then the limit is E-symplectic, where the number E depends only on ε and E (ε) 0 as ε 0. This generalizes C0-rigidity of symplectic embeddings, and answers a question in topological quantum computing by Michael Freedman. As in the symplectic case, this rigidity theorem can be deduced from the existence and properties of symplectic capacities. An ε-symplectic embedding preserves capacity up to an ε-small error, and linear ε-symplectic maps can be characterized by the property that they preserve the symplectic spectrum of ellipsoids (centered at the origin) up to an error that is ε-small. We sketch an alternative proof using the shape invariant, which gives rise to an analogous characterization and rigidity theorem for ε-contact embeddings.