Epsilon-non-squeezing and $C^0$-rigidity of epsilon-symplectic embeddings

TL;DR

The paper proves that sequences of nearly symplectic embeddings converge to embeddings that are close to being symplectic, extending $C^0$-rigidity results and addressing questions relevant to topological quantum computing.

Contribution

It establishes $E$-symplectic limits of $ ext{ extepsilon}$-symplectic embeddings and links this to symplectic capacities, generalizing known rigidity theorems.

Findings

Sequences of $ ext{ extepsilon}$-symplectic embeddings converge to $E$-symplectic embeddings.

$ ext{ extepsilon}$-symplectic embeddings approximately preserve symplectic capacities.

Characterization of linear $ ext{ extepsilon}$-symplectic maps via the symplectic spectrum.

Abstract

An embedding $\varphi \colon (M_1, \omega_1) \to (M_2, \omega_2)$ (of symplectic manifolds of the same dimension) is called $\epsilon$-symplectic if the difference $\varphi^* \omega_2 - \omega_1$ is $\epsilon$-small with respect to a fixed Riemannian metric on $M_1$. We prove that if a sequence of $\epsilon$-symplectic embeddings converges uniformly (on compact subsets) to another embedding, then the limit is $E$-symplectic, where the number $E$ depends only on $\epsilon$ and $E (\epsilon) \to 0$ as $\epsilon \to 0$. This generalizes $C^0$-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 $\epsilon$-symplectic embedding preserves capacity up to an $\epsilon$-small error, and linear $\epsilon$-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 $\epsilon$-small. We sketch an alternative proof using the shape invariant, which gives rise to an analogous characterization and rigidity theorem for $\epsilon$-contact embeddings.