Recovering contact forms from boundary data

Abstract

Let X be a compact smooth manifold with boundary. The paper deals with contact 1-forms β on X, whose Reeb vector fields vβ admit Lyapunov functions f. We tackle the question: how to recover X and β from the appropriate data along the boundary ∂ X? We describe such boundary data and prove that they allow for a reconstruction of the pair (X, β), up to a diffeomorphism of X. We use the term ``holography" for the reconstruction. We say that objects or structures inside X are holographic, if they can be reconstructed from their vβ-flow induced ``shadows" on the boundary ∂ X. We also introduce numerical invariants that measure how ``wrinkled" the boundary ∂ X is with respect to the vβ-flow and study their holographic properties under the contact forms preserving embeddings of equidimensional contact manifolds with boundary. We get some ``non-squeezing results" about such contact embedding, which are reminiscent of Gromov's non-squeezing theorem in symplectic geometry.