A formula equating open and closed Gromov-Witten invariants and its applications to mirror symmetry (Q418432)

The author proves that for the \(\mathbb{P}^{1}\) bundle \(X=\mathbb{P}(K_{Y}\oplus \mathcal{O}_{Y})\) over a toric Fano manifold \(Y\) and for any effective class \(\alpha\in H_{2}(X, \mathbb{Z})\) with \(c_{1}(\alpha)=0\), \(c_{\beta_{0}+\alpha}=GW_{0,1}^{X,h+\alpha}([\text{pt}])\), where \(\beta_{0}+\alpha \in \pi_{2}(X,L)\) (here \(L\) is a Lagrangian torus fiber in X and \(h\in H_{2}(X,\mathbb{Z})\) is the fiber class) is a Maslov index two class.NEWLINENEWLINEAs an application, the author computes the mirror superpotential for \(X\).