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Given a closed subscheme Z of a polarized abelian variety (A, ) we define its vanishing threshold with respect to and relate it to the Seshadri constant of the ideal defining Z. As a particular case, we introduce the notion of jets-separation thresholds, which naturally arise as the vanishing threshold of the p-infinitesimal neighborhood of a point. Afterwards, by means of Fourier-Mukai methods we relate the jets-separation thresholds with the surjectivity of certain higher Gauss-Wahl maps. As a consequence we obtain a criterion for the surjectivity of those maps in terms of the Seshadri constant of the polarization.
Nelson Alvarado (Tue,) studied this question.
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