Mirror symmetry and open/closed correspondence for the projective line
Abstract
We study the open/closed correspondence for the projective line via mirror symmetry. More explicitly, we establish a correspondence between the generating function of disk Gromov-Witten invariants of the complex projective line P1 with boundary condition specified by an S1-invariant Lagrangian sub-manifold L and the asymptotic expansion of the I-function of a toric surface S.
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