Enumerative Geometry of Quantum Periods

Abstract

We interpret the q-refined theta function 1 of a log Calabi-Yau surface (P,E) as a natural q-refinement of the open mirror map, defined by quantum periods of mirror curves for outer Aganagic-Vafa branes on the local Calabi-Yau KP. The series coefficients are all-genus logarithmic two-point invariants, directly extending the relation found in [GRZ]. Yet we find an explicit discrepancy at higher genus in the relation to open Gromov-Witten invariants of the Aganagic-Vafa brane. Using a degeneration argument, we express the difference in terms of relative invariants of an elliptic curve. With π: P → P the toric blow up of a point, we use the Topological Vertex [AKMV] to show a correspondence between open invariants of KP and closed invariants of KP generalizing a variant of [CLLT][LLW] to arbitrary genus and winding. We also equate winding-1, open-BPS invariants with closed Gopakumar-Vafa invariants.

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