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A homology theory for tropical cycles on integral affine manifolds and a perfect pairing

Published 27 Feb 2020 in math.AG, math.GT, and math.SG | (2002.12290v2)

Abstract: We introduce a cap product pairing for homology and cohomology of tropical cycles on integral affine manifolds with singularities. We show the pairing is perfect over $\mathbb{Q}$ in degree one when the manifold has at worst symple singularities. By joint work with Siebert, the pairing computes period integrals and its perfectness implies the versality of canonical Calabi-Yau degenerations. We also give an intersection theoretic application for Strominger-Yau-Zaslow fibrations. The treatment of the cap product and Poincar\'e-Lefschetz by simplicial methods for constructible sheaves might be of independent interest.

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