Gromov-Witten Invariants and Mirror Symmetry For Non-Fano Varieties Via Tropical Disks
Abstract
Under mirror symmetry a non-Fano variety X corresponds to an instanton corrected Hori-Vafa potential W. The classical period of W equals the regularized quantum period of X, which is a generating function for descendant Gromov-Witten invariants. These periods define closed mirror maps relating complex with symplectic parameters and open mirror maps relating coordinates on the mirror curves. We interpret the corrections to W by broken lines in a scattering diagram, so that W is the primitive theta function 1. We show that, after wall crossing to infinity and application of the closed mirror map, W=1 is equal to the open mirror map. By tropical correspondence, 1 is a generating function for 2-marked logarithmic Gromov-Witten invariants, which are algebraic analogues of counts of Maslov index 2 disks. This generalizes the predictions of mirror symmetry to the non-Fano case.
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