Moduli of J-Holomorphic Curves with Lagrangian Boundary Conditions and Open Gromov-Witten Invariants for an S1-Equivariant Pair
Abstract
Let (X,ω) be a symplectic manifold, J be an ω-tame almost complex structure, and L be a Lagrangian submanifold. The stable compactification of the moduli space of parametrized J-holomorphic curves in X with boundary in L (with prescribed topological data) is compact and Hausdorff in Gromov's C∞-topology. We construct a Kuranishi structure with corners in the sense of Fukaya and Ono. This Kuranishi structure is orientable if L is spin. In the special case where the expected dimension of the moduli space is zero, and there is an S1 action on the pair (X,L) which preserves J and acts freely on L, we define the Euler number for this S1 equivariant pair and the prescribed topological data. We conjecture that this rational number is the one computed by localization techniques using the given S1 action.
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