The stringy Euler number of Calabi-Yau hypersurfaces in toric varieties and the Mavlyutov duality

Abstract

We show that minimal models of nondegenerated hypersufaces defined by Laurent polynomials with a d-dimensional Newton polytope are Calabi-Yau varieties X if and only if the Fine interior of consists of a single lattice point. We give a combinatorial formula for computing the stringy Euler number of X. This formula allows to test mirror symmetry in cases when is not a reflexive polytope. In particular we apply this formula to pairs of lattice polytopes (, ) that appear in the Mavlyutov's generalization of the polar duality for reflexive polytopes. Some examples of Mavlyutov's dual pairs (, ) show that the stringy Euler numbers of the corresponding Calabi-Yau varieties X and X may not satisfy the expected topological mirror symmetry test: e st(X) = (-1)d-1 e st(X). This shows the necessity of an additional condition on Mavlyutov's pairs (, ).