Gromov-Witten invariants of varieties with holomorphic 2-forms

Abstract

We show that a holomorphic two-form θ on a smooth algebraic variety X localizes the virtual fundamental class of the moduli of stable maps (X,β) to the locus where θ degenerates; it then enables us to define the localized GW-invariant, an algebro-geometric analogue of the local invariant of Lee and Parker in symplectic geometry, which coincides with the ordinary GW-invariant when X is proper. It is deformation invariant. Using this, we prove formulas for low degree GW-invariants of minimal general type surfaces with pg>0 conjectured by Maulik and Pandharipande.