What question did this study set out to answer?

This research aims to establish a new characterization of Jacobians using Tannakian formalism and explore the validity of the Schottky conjecture.

June 10, 2026Open Access

Singularities of theta divisors and the Tannakian Schottky problem

Key Points

This research aims to establish a new characterization of Jacobians using Tannakian formalism and explore the validity of the Schottky conjecture.
Utilized Tannakian formalism to attach a reductive group to principally polarized abelian varieties.
Investigated the characteristics of singular varieties to establish a connection to Jacobians.
Demonstrated validity of the Tannakian Schottky conjecture for bielliptic Prym locus across all dimensions.
Provided a novel characterization of Jacobians based on Tannakian data and characteristic classes.
Confirmed the Tannakian Schottky conjecture up to dimension 5.
Demonstrated the conjecture's validity on the bielliptic Prym locus in all dimensions.

Abstract

Abstract With the Tannakian formalism, one can attach to any principally polarized abelian variety a reductive group, along with a representation. We obtain a completely new characterization of Jacobians relying on this Tannakian data and certain characteristic classes for singular varieties. As a corollary, we show that the Tannakian Schottky conjecture holds in dimension up to 5. More generally, we show that the Tannakian Schottky conjecture holds on the bielliptic Prym locus in all dimensions. This provides the first non-trivial cases of this conjecture.

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Cite This Study

Constantin Podelski (Mon,) studied this question.

synapsesocial.com/papers/6a28fecb6f82f25be989beb3 https://doi.org/https://doi.org/10.1007/s00208-026-03508-3

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