Minimal Cohomology Classes and Jacobians

Abstract

We show that on the Jacobian (JC,θ) of a smooth curve C of genus g, any effective cycle in JC with cohomology class θd/d! is a translate of Wg-d(C) or -Wg-d(C). We then use this result to prove that for 1<d<g, the Jacobian locus ( the locus of intermediate Jacobians of cubic threefolds) is an irreducible component of the set of principally polarized abelian varieties of dimension g for which θd/d! ( θ3/3!) is the class of an effective algebraic cycle. Moreover, on the intermediate Jacobian of a generic cubic threefold, θ2/2! is not the class of an effective algebraic cycle.

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