The defect of a cubic threefold and applications to intermediate Jacobian fibrations

Abstract

The defect of a cubic threefold X with isolated singularities is a global invariant that measures the failure of Q-factoriality. We compute the defect for such cubics in terms of topological data about the curve of lines through a singular point. We express the mixed Hodge structure on the middle cohomology of X in terms of both the defect and local invariants of the singularities. We then relate the defect to various geometric properties of X: in particular, we show that a cubic threefold is not Q-factorial if and only if it contains either a plane or a cubic scroll. We relate the defect to existence of compactified intermediate Jacobian fibrations with irreducible fibers associated to a cubic fourfold.

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