Shinobu Hosono, Hiromichi Takagi
Published 2011-01-14, updated 2012-07-02Version 2
Studying the mirror symmetry of a Calabi-Yau threefold $X$ of the Reye congruence in $\mP^4$, we conjecture that $X$ has a non-trivial Fourier-Mukai partner $Y$. We construct $Y$ as the double cover of a determinantal quintic in $\mP^4$ branched over a curve. We also calculate BPS numbers of both $X$ and $Y$ (and also a related Calabi-Yau complete intersection $\tilde X_0$) using mirror symmetry.
Comments: 27 pages, typos corrected, minor changes, to appear in J.Alg.Geom
Mirror symmetry for P^2 and tropical geometry
Torus Fibrations of Calabi-Yau Hypersurfaces in Toric Varieties and Mirror Symmetry
Diffeomorphisms and families of Fourier-Mukai transforms in mirror symmetry
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