Effective classes and Lagrangian tori in symplectic four-manifolds
classification
🧮 math.SG
keywords
effectiveclassclasseslagrangiansymplectictorialmostclosed
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An effective class in a closed symplectic four-manifold $(X, \omega)$ is a two-dimensional homology class which is realized by a $J$-holomorphic cycle for every tamed almost complex structure $J$. We prove that effective classes are orthogonal to Lagrangian tori in $H_2 (X ; \Bbb{Z})$.
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