The symplectic cohomology of magnetic cotangent bundles
Abstract
We construct a family version of symplectic Floer cohomology for magnetic cotangent bundles, without any restrictions on the magnetic form, using the dissipative method for compactness introduced in Groman2015. As an application, we deduce that if N is a closed manifold and σ is a magnetic form that is not weakly exact, then the π1-sensitive Hofer-Zehnder capacity of any compact set in the magnetic cotangent bundle determined by σ is finite.
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