Construction of spectral invariants of Hamiltonian paths on closed symplectic manifolds
Abstract
In this paper, we develop a mini-max theory of the action functional over the semi-infinite cycles via the chain level Floer homology theory and construct spectral invariants of Hamiltonian diffeomorphisms on arbitrary, especially on non-exact and non-rational, compact symplectic manifold (M,ω). To each given time dependent Hamiltonian function H and quantum cohomology class 0 ≠ a ∈ QH*(M), we associate an invariant (H;a) which varies continuously over H in the C0-topology. This is obtained as the mini-max value over the semi-infinite cycles whose homology class is `dual' to the given quantum cohomology class a on the covering space 0(M) of the contractible loop space 0(M). We call them the Novikov Floer cycles. We apply the spectral invariants to the study of Hamiltonian diffeomorphisms in sequels of this paper.
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