Spectral numbers and manifolds with boundary
Abstract
We consider a smooth submanifold N with a smooth boundary in an ambient closed manifold M and assign a spectral invariant c(α,H) to every singular homological class α∈ H*(N) and a Hamiltonian H defined on the cotangent bundle T*M. We also derive certain properties of spectral numbers, for example we prove that spectral invariants c(H,N) associated to the whole Floer homology HF*(H,N:M) of the submanifold N, are limits of the decreasing nested family of open sets.
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