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Mayer–Vietoris property for relative symplecticcohomology

Umut Varolgunes

2021Geometry & Topology13 citationsDOIOpen Access PDF

Abstract

In this paper, we construct a Hamiltonian Floer theory based invariant called relative symplectic cohomology, which assigns a module over the Novikov ring to compact subsets of closed symplectic manifolds. We show the existence of restriction maps, and prove some basic properties. Our main contribution is to identify a natural geometric situation in which relative symplectic cohomology of two subsets satisfy the Mayer-Vietoris property. This is tailored to work under certain integrability assumptions, the weakest of which introduces a new geometric object called a barrier - roughly, a one parameter family of rank 2 coisotropic submanifolds. The proof uses a deformation argument in which the topological energy zero (i.e. constant) Floer solutions are the main actors.

Topics & Concepts

MathematicsSymplectic geometrySymplectomorphismSymplectic manifoldQuantum cohomologyPure mathematicsSymplectic representationMoment mapSymplectic vector spaceGromov–Witten invariantSymplectic matrixInvariant (physics)Floer homologyCohomologyHamiltonian mechanicsHamiltonian systemAlgebra over a fieldProperty (philosophy)Symplectic groupRank (graph theory)Hamiltonian (control theory)Discrete mathematicsMathematical analysisGeometric and Algebraic TopologyHomotopy and Cohomology in Algebraic TopologyGeometric Analysis and Curvature Flows
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