On Hodge numbers of complete intersections and Landau--Ginzburg models
Abstract
We prove that the Hodge number h1,N-1(X) of an N-dimensional (N≥slant 3) Fano complete intersection X is less by one then the number of irreducible components of the central fiber of (any) Calabi--Yau compactification of Givental's Landau--Ginzburg model for X.
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