A quasi-isometric embedding into the group of Hamiltonian diffeomorphisms with Hofer's metric

Abstract

We construct an embedding of [0,1]∞ into Ham(M, ω), the group of Hamiltonian diffeomorphisms of a suitable closed symplectic manifold (M, ω). We then prove that is in fact a quasi-isometry. After imposing further assumptions on (M, ω), we adapt our methods to construct a similar embedding of R [0,1]∞ into either Ham(M, ω) or Ham(M, ω), the universal cover of Ham(M, ω). Along the way, we prove results related to the filtered Floer chain complexes of radially symmetric Hamiltonians. Our proofs rely heavily on a continuity result for barcodes (as presented in the work of M. Usher and J. Zhang) associated to filtered Floer homology viewed as a persistence module.