Local mirror symmetry of curves: Yukawa couplings and genus 1
Abstract
We continue our study of equivariant local mirror symmetry of curves, i.e. mirror symmetry for Xk=O(k)+O(-2-k) over P1 with torus action (lambda1,lambda2) on the bundle. For the antidiagonal action lambda1=-lambda2, we find closed formulas for the mirror map and a rational B model Yukawa coupling for all k. Moreover, we give a simple closed form for the B model genus 1 Gromov-Witten potential. For the diagonal action lambda1=lambda2, we argue that the mirror symmetry computation is equivalent to that of the projective bundle P(O+O(k)+O(-2-k)) over P1. Finally, we outline the computation of equivariant Gromov-Witten invariants for An singularities and toric tree examples via mirror symmetry.
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