Products of Jacobians as Prym-Tyurin varieties
Abstract
Let X1, ..., Xm denote smooth projective curves of genus gi ≥ 2 over an algebraically closed field of characteristic 0 and let n denote any integer at least equal to 1+i=1m gi. We show that the product JX1 × ... × JXm of the corresponding Jacobian varieties admits the structure of a Prym-Tyurin variety of exponent nm-1. This exponent is considerably smaller than the exponent of the structure of a Prym-Tyurin variety known to exist for an arbitrary principally polarized abelian variety. Moreover it is given by explicit correspondences.
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