A geometric approach to elliptic curves with torsion groups Z/10Z, Z/12Z, Z/14Z, and Z/16Z

Halbeisen, Lorenz; Hungerbühler, Norbert; Shamsi Zargar, Arman; Voznyy, Maksym

doi:10.21857/ydkx2coje9

Rad Hrvatske akademije znanosti i umjetnosti. Matematičke znanosti, No. 555=27, 2023.

Izvorni znanstveni članak

A geometric approach to elliptic curves with torsion groups Z/10Z, Z/12Z, Z/14Z, and Z/16Z

Lorenz Halbeisen ; Department of Mathematics, ETH Zentrum Rämistrasse 101, 8092 Zürich, Switzerland
Norbert Hungerbühler orcid.org/0000-0001-6191-0022 ; Department of Mathematics, ETH Zentrum Rämistrasse 101, 8092 Zürich, Switzerland
Arman Shamsi Zargar ; Department of Mathematics and Applications, University of Mohaghegh Ardabili, Ardabil, Iran
Maksym Voznyy orcid.org/0000-0001-5649-8416 ; Department of Technology, Stephen Leacock CI, Toronto District School Board, Toronto, Canada

Puni tekst: engleski pdf 714 Kb

str. 87-109

preuzimanja: 131

citiraj

APA 6th Edition

Halbeisen, L., Hungerbühler, N., Shamsi Zargar, A. i Voznyy, M. (2023). A geometric approach to elliptic curves with torsion groups Z/10Z, Z/12Z, Z/14Z, and Z/16Z. Rad Hrvatske akademije znanosti i umjetnosti. Matematičke znanosti, (555=27), 87-109. https://doi.org/10.21857/ydkx2coje9

MLA 8th Edition

Halbeisen, Lorenz, et al. "A geometric approach to elliptic curves with torsion groups Z/10Z, Z/12Z, Z/14Z, and Z/16Z." Rad Hrvatske akademije znanosti i umjetnosti. Matematičke znanosti, vol. , br. 555=27, 2023, str. 87-109. https://doi.org/10.21857/ydkx2coje9. Citirano 09.05.2024.

Chicago 17th Edition

Halbeisen, Lorenz, Norbert Hungerbühler, Arman Shamsi Zargar i Maksym Voznyy. "A geometric approach to elliptic curves with torsion groups Z/10Z, Z/12Z, Z/14Z, and Z/16Z." Rad Hrvatske akademije znanosti i umjetnosti. Matematičke znanosti , br. 555=27 (2023): 87-109. https://doi.org/10.21857/ydkx2coje9

Harvard

Halbeisen, L., et al. (2023). 'A geometric approach to elliptic curves with torsion groups Z/10Z, Z/12Z, Z/14Z, and Z/16Z', Rad Hrvatske akademije znanosti i umjetnosti. Matematičke znanosti, (555=27), str. 87-109. https://doi.org/10.21857/ydkx2coje9

Vancouver

Halbeisen L, Hungerbühler N, Shamsi Zargar A, Voznyy M. A geometric approach to elliptic curves with torsion groups Z/10Z, Z/12Z, Z/14Z, and Z/16Z. Rad Hrvatske akademije znanosti i umjetnosti. Matematičke znanosti [Internet]. 2023 [pristupljeno 09.05.2024.];(555=27):87-109. https://doi.org/10.21857/ydkx2coje9

IEEE

L. Halbeisen, N. Hungerbühler, A. Shamsi Zargar i M. Voznyy, "A geometric approach to elliptic curves with torsion groups Z/10Z, Z/12Z, Z/14Z, and Z/16Z", Rad Hrvatske akademije znanosti i umjetnosti. Matematičke znanosti, vol., br. 555=27, str. 87-109, 2023. [Online]. https://doi.org/10.21857/ydkx2coje9

Sažetak

We give new parametrisations of elliptic curves in Weierstrass normal form y2 = x3 + ax2 + bx with torsion groups Z/10Z and Z/12Z over Q, and with Z/14Z and Z/16Z over quadratic fields. Even though the parametrisations are equivalent to those given by Kubert and Rabarison, respectively, with the new parametrisations we found three infinite families of elliptic curves with torsion group Z/12Z and positive rank. Furthermore, we found elliptic curves with torsion group Z/14Z and rank 3 - which is a new record for such curves - as well as some new elliptic curves with torsion group Z/16Z and rank 3.

Ključne riječi

Elliptic curve; parametrisation; quadratic field; rank; torsion group

Hrčak ID:

307488

URI

https://hrcak.srce.hr/307488

Datum izdavanja:

25.8.2023.

Posjeta: 204 *

Prijava i registracija

Rad Hrvatske akademije znanosti i umjetnosti. Matematičke znanosti, No. 555=27, 2023.

Sažetak

Ključne riječi

Hrčak ID:

URI

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