The group of Hamiltonian homeomorphisms and continuous Hamiltonian flows
Abstract
In this paper, we study the dynamical aspects of the Hamiltonian homeomorphism group Hameo(M,ω) which was introduced by M\"uller and the author. We introduce the notion of autonomous continuous Hamiltonian flows and extend the well-known conservation of energy to such flows. The definitions of the Hofer length and of the spectral invariants a are extended to continuous Hamiltonian paths, and the Hofer norm and the spectral norm γ:Ham(M,ω) + are generalized to the corresponding intrinsic norms on Hameo(M,ω) respectively. Using these extensions, we also extend the construction of Entov-Polterovich's Calabi quasi-morphism on S2 to the space of continuous Hamiltonian paths. We also discuss a conjecture concerning extendability of Entov-Polterovich's quasi-morphism and its relation to the extendability of Calabi homomorphism on the disc to Hameo(D2, D2), and their implication towards the simpleness question on the area preserving homeomorphism groups of the disc D2 and of the sphere S2.
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