Orderability, contact non-squeezing, and Rabinowitz Floer homology

TL;DR

This paper establishes orderability of certain Liouville fillable contact manifolds with non-zero Rabinowitz Floer homology and introduces a contact capacity to prove non-squeezing results, extending classical symplectic non-squeezing theorems.

Contribution

It demonstrates orderability for a new class of contact manifolds and constructs a contact capacity for periodic or prequantization spaces, leading to generalized non-squeezing theorems.

Findings

Orderability of Liouville fillable contact manifolds with non-zero Rabinowitz Floer homology.

Construction of a contact capacity for specific contact manifolds.

Proof of a general non-squeezing result extending classical symplectic results.

Abstract

We study Liouville fillable contact manifolds $(\Sigma,\xi)$ with non-zero Rabinowitz Floer homology and assign spectral numbers to paths of contactomorphisms. As a consequence we prove that $\widetilde{\mathrm{Cont}_0}(\Sigma,\xi)$ is orderable in the sense of Eliashberg and Polterovich. This provides a new class of orderable contact manifolds. If the contact manifold is in addition periodic or a prequantization space $M \times S^1$ for $M$ a Liouville manifold, then we construct a contact capacity. This can be used to prove a general non-squeezing result, which amongst other examples in particular recovers the beautiful non-squeezing results from [EKP06].