17T7 is a Galois group over the rationals

Publikation: Arbeitspapier/PreprintPreprint

Autoren

  • Raymond van Bommel
  • Edgar Costa
  • Noam D. Elkies
  • Timo Keller
  • Sam Schiavone
  • John Voight

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OriginalspracheEnglisch
PublikationsstatusElektronisch veröffentlicht (E-Pub) - 12 Nov. 2024

Abstract

We prove that the transitive permutation group 17T7, isomorphic to a split extension of $C_2$ by $\mathrm{PSL}_2(\mathbb{F}_{16})$, is a Galois group over the rationals. The group arises from the field of definition of the 2-torsion on an abelian fourfold with real multiplication defined over a real quadratic field. We find such fourfolds using Hilbert modular forms. Finally, building upon work of Demb\'el\'e, we show how to conjecturally reconstruct a period matrix for an abelian variety attached to a Hilbert modular form; we then use this to exhibit an explicit degree 17 polynomial with Galois group 17T7.

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17T7 is a Galois group over the rationals. / Bommel, Raymond van; Costa, Edgar; Elkies, Noam D. et al.
2024.

Publikation: Arbeitspapier/PreprintPreprint

Bommel, RV, Costa, E, Elkies, ND, Keller, T, Schiavone, S & Voight, J 2024 '17T7 is a Galois group over the rationals'.
Bommel, R. V., Costa, E., Elkies, N. D., Keller, T., Schiavone, S., & Voight, J. (2024). 17T7 is a Galois group over the rationals. Vorabveröffentlichung online.
Bommel RV, Costa E, Elkies ND, Keller T, Schiavone S, Voight J. 17T7 is a Galois group over the rationals. 2024 Nov 12. Epub 2024 Nov 12.
Bommel, Raymond van ; Costa, Edgar ; Elkies, Noam D. et al. / 17T7 is a Galois group over the rationals. 2024.
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abstract = " We prove that the transitive permutation group 17T7, isomorphic to a split extension of $C_2$ by $\mathrm{PSL}_2(\mathbb{F}_{16})$, is a Galois group over the rationals. The group arises from the field of definition of the 2-torsion on an abelian fourfold with real multiplication defined over a real quadratic field. We find such fourfolds using Hilbert modular forms. Finally, building upon work of Demb\'el\'e, we show how to conjecturally reconstruct a period matrix for an abelian variety attached to a Hilbert modular form; we then use this to exhibit an explicit degree 17 polynomial with Galois group 17T7. ",
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AU - Bommel, Raymond van

AU - Costa, Edgar

AU - Elkies, Noam D.

AU - Keller, Timo

AU - Schiavone, Sam

AU - Voight, John

N1 - 23 pages, comments welcome

PY - 2024/11/12

Y1 - 2024/11/12

N2 - We prove that the transitive permutation group 17T7, isomorphic to a split extension of $C_2$ by $\mathrm{PSL}_2(\mathbb{F}_{16})$, is a Galois group over the rationals. The group arises from the field of definition of the 2-torsion on an abelian fourfold with real multiplication defined over a real quadratic field. We find such fourfolds using Hilbert modular forms. Finally, building upon work of Demb\'el\'e, we show how to conjecturally reconstruct a period matrix for an abelian variety attached to a Hilbert modular form; we then use this to exhibit an explicit degree 17 polynomial with Galois group 17T7.

AB - We prove that the transitive permutation group 17T7, isomorphic to a split extension of $C_2$ by $\mathrm{PSL}_2(\mathbb{F}_{16})$, is a Galois group over the rationals. The group arises from the field of definition of the 2-torsion on an abelian fourfold with real multiplication defined over a real quadratic field. We find such fourfolds using Hilbert modular forms. Finally, building upon work of Demb\'el\'e, we show how to conjecturally reconstruct a period matrix for an abelian variety attached to a Hilbert modular form; we then use this to exhibit an explicit degree 17 polynomial with Galois group 17T7.

KW - math.NT

KW - 12F12 (Primary) 11F80, 11F41, 14G10 (Secondary)

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BT - 17T7 is a Galois group over the rationals

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