Irreducibility criteria for the preimages of a transverse variety under endomorphisms of products of elliptic curves

Research output: Working paper/PreprintPreprint

Authors

  • Riccardo Pengo
  • Evelina Viada

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Details

Original languageEnglish
Publication statusE-pub ahead of print - 31 Oct 2023

Abstract

We provide two different proofs of an irreducibility criterion for the preimages of a transverse subvariety of a product of elliptic curves under a diagonal endomorphism of sufficiently large degree. For curves, we present an arithmetic proof of the aforementioned irreducibility result, which enlightens connections to methods used in the context of the Torsion Anomalous Conjecture. On the other hand, we generalize the result for higher dimensional varieties using a more geometric approach. Finally, we give some applications of these results. More precisely, we establish the irreducibility of some explicit families of polynomials, we provide new estimates for the normalized heights of certain intersections and images, and we give new lower bounds for the essential minima of preimages.

Keywords

    math.AG, math.NT, 11G50, 14G40, 14K12

Cite this

Irreducibility criteria for the preimages of a transverse variety under endomorphisms of products of elliptic curves. / Pengo, Riccardo; Viada, Evelina.
2023.

Research output: Working paper/PreprintPreprint

Pengo R, Viada E. Irreducibility criteria for the preimages of a transverse variety under endomorphisms of products of elliptic curves. 2023 Oct 31. Epub 2023 Oct 31. doi: 10.48550/arXiv.2310.20665
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