Skeletons of Prym varieties and Brill--Noether theory

Y. Len, M. Ulirsch, ArXiv:1902.09410 (2019).

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We show that the non-Archimedean skeleton of the Prym variety associated to an unramified double cover of an algebraic curve is naturally isomorphic (as a principally polarized tropical abelian variety) to the tropical Prym variety of the associated tropical double cover. This confirms a conjecture by Jensen and the first author. We prove a new upper bound on the dimension of the Prym-Brill-Noether locus for generic unramified double covers of curves with fixed even gonality on the base. Our methods also give a new proof of the classical Prym-Brill-Noether Theorem for generic unramified double covers that is originally due to Welters and Bertram.
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arXiv:1902.09410
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Len Y, Ulirsch M. Skeletons of Prym varieties and Brill--Noether theory. arXiv:190209410. Published online 2019.
Len, Y., & Ulirsch, M. (2019). Skeletons of Prym varieties and Brill--Noether theory. ArXiv:1902.09410.
@article{Len_Ulirsch_2019, title={Skeletons of Prym varieties and Brill--Noether theory}, journal={arXiv:1902.09410}, author={Len, Yoav and Ulirsch, Martin}, year={2019} }
Len, Yoav, and Martin Ulirsch. “Skeletons of Prym Varieties and Brill--Noether Theory.” ArXiv:1902.09410, 2019.
Y. Len and M. Ulirsch, “Skeletons of Prym varieties and Brill--Noether theory,” arXiv:1902.09410, 2019.
Len, Yoav, and Martin Ulirsch. “Skeletons of Prym Varieties and Brill--Noether Theory.” ArXiv:1902.09410, 2019.

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