Genus one mirror symmetry for intersection of two cubics in P5
Abstract
This paper establishes BCOV-type genus one mirror symmetry for the intersections of two cubics in P5. The proof applies previous constructions of the mirror family by the second author and computations of genus one Gromov-Witten invariants by A. Popa. The approach adapts the strategy used for hypersurfaces, as developed by the first author and collaborators, but addresses the distinct geometry involved. A key feature is a systematic usage of toric techniques and related computer aided calculations to determine seemingly otherwise inaccessible invariants.
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