Lagrangian Intersections and the spectral norm in convex-at-infinity symplectic manifolds
Abstract
Given a compact Lagrangian L in a semipositive convex-at-infinity symplectic manifold W, we establish a cup-length estimate for the action values of L associated to a Hamiltonian isotopy whose spectral norm is smaller than some (L). When L is rational, this implies a cup-length estimate on the number of intersection points. This Chekanov-type result generalizes a theorem of Kislev and Shelukhin proving non-displaceability in the case when W is closed and monotone. The method of proof is to deform the pair-of-pants product on Hamiltonian Floer cohomology using the Lagrangian L.
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