Dual Polyhedra and Mirror Symmetry for Calabi-Yau Hypersurfaces in Toric Varieties
Abstract
We consider families F() consisting of complex (n-1)-dimensional projective algebraic compactifications of -regular affine hypersurfaces Zf defined by Laurent polynomials f with a fixed n-dimensional Newton polyhedron in n-dimensional algebraic torus T =( C*)n. If the family F() defined by a Newton polyhedron consists of (n-1)-dimensional Calabi-Yau varieties, then the dual, or polar, polyhedron * in the dual space defines another family F(*) of Calabi-Yau varieties, so that we obtain the remarkable duality between two different families of Calabi-Yau varieties. It is shown that the properties of this duality coincide with the properties of Mirror Symmetry discovered by physicists for Calabi-Yau 3-folds. Our method allows to construct many new examples of Calabi-Yau 3-folds and new candidats for their mirrors which were previously unknown for physicists. We conjecture that there exists an isomorphism between two conformal field theories corresponding to Calabi-Yau varieties from two families F() and F(*).
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