Hamiltonian fragmentation in dimension four with application to spectral estimators

Abstract

We prove a new Hamiltonian extension and consequently a fragmentation result in dimension 4 for the symplectic manifold D2× D2. Polterovich and Shelukhin have recently constructed a family of functionals on the space of time dependent Hamiltonian functions on S2(1) × S2(a) for certain rational 0 < a < 1, called Lagrangian spectral estimators. Using our fragmentation result we prove that the restriction of their functionals to the subdomain D2(c) × D2(a) is a uniformly C0-continuous functional where 0 < c < 1. As an application of our results, we show that the complement of a Hofer ball in the group of compactly supported Hamiltonian diffeomorphisms of D2(c)× D2(a) contains a C0-open subset. Finally, we show that the aforementioned group equipped with the Hofer distance admits an isometric embedding of an infinite dimensional flat space for suitable values of parameters c and a.