English

Elliptic Curves from Sextics

Algebraic Geometry 2016-09-07 v3

Abstract

Let N\mathcal N be the moduli space of sextics with 3 (3,4)-cusps. The quotient moduli space N/G{\mathcal N}/G is one-dimensional and consists of two components, Ntorus/G{\mathcal N}_{torus}/G and Ngen/G{\mathcal N}_{gen}/G. By quadratic transformations, they are transformed into one-parameter families CsC_s and DsD_s of cubic curves respectively. We study the Mordell-Weil torsion groups of cubic curves CsC_s over \bfQ\bfQ and DsD_s over \bfQ(3)\bfQ(\sqrt{-3}) respectively. We show that CsC_{s} has the torsion group Z/3Z\bf Z/3\bf Z for a generic sQs\in \bf Q and it also contains subfamilies which coincide with the universal families given by Kubert with the torsion groups Z/6Z\bf Z/6\bf Z, Z/6Z+Z/2Z\bf Z/6\bf Z+\bf Z/2\bf Z, Z/9Z\bf Z/9\bf Z or Z/12Z\bf Z/12\bf Z. The cubic curves DsD_s has torsion Z/3Z+Z/3Z\bf Z/3\bf Z+\bf Z/3\bf Z generically but also Z/3Z+Z/6Z\bf Z/3\bf Z+\bf Z/6\bf Z for a subfamily which is parametrized by Q(3) \bf Q(\sqrt{-3}) .

Keywords

Cite

@article{arxiv.math/9912041,
  title  = {Elliptic Curves from Sextics},
  author = {Mutsuo Oka},
  journal= {arXiv preprint arXiv:math/9912041},
  year   = {2016}
}

Comments

A remark is added. (after replace mistake). 16 pages