Comparison of spectral invariants in Lagrangian and Hamiltonian Floer theory
Abstract
We compare spectral invariants in periodical orbits and Lagrangian Floer homology case, for closed symplectic manifold P and its closed Lagrangian submanifolds L, when ω|π2(P,L)=0, and μ|π2(P,L)=0. From this result, we derive a corollary considering comparison of Hofer's distance in periodic orbits and Lagrangian case. We also define a product HF*(H) HF*(L,φ1H(L)) HF*(L,φ1H(L)) and prove subadditivity of invariants with respect to this product.
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