arXiv:2006.07987 Abstract | arXiv Analytics

arXiv:2006.07987 [math.NT]Abstract References Reviews Resources

High $\ell$-torsion rank for class groups over function fields

Published 2020-06-14Version 1

We prove that in the function field setting, $\ell$-torsion in the class groups of quadratic fields can be arbitrarily large. In fact, we explicitly produce a family whose $\ell$-rank growth matches the growth in the setting of genus theory, which might be best possible. We do this by specifically focusing on the Artin-Schreir curves $y^2=x^q-x$.

Comments: 5 pages, comments welcome!

Categories: math.NT, math.AG

Keywords: class groups, torsion rank, rank growth matches, quadratic fields, genus theory

Related articles: Most relevant | Search more

arXiv:2412.20080 [math.NT] (Published 2024-12-28)

Parameterized families of quadratic fields with $n$-rank at least 2

Azizul Hoque, Srinivas Kotyada

arXiv:1111.2475 [math.NT] (Published 2011-11-10)

Nontorsion Points of Low Height on Elliptic Curves over Quadratic Fields

Graeme Taylor

arXiv:2412.07701 [math.NT] (Published 2024-12-10, updated 2025-01-05)

$\ell$-Torsion in Class Groups via Dirichlet $L$-functions

D. R. Heath-Brown

arXiv Analytics

arXiv:2006.07987 [math.NT]Abstract References Reviews Resources

High $\ell$-torsion rank for class groups over function fields

Links

Toolbox

arXiv:2006.07987 [math.NT]AbstractReferencesReviewsResources

High $\ell$-torsion rank for class groups over function fields

Links

Toolbox

arXiv:2006.07987 [math.NT]Abstract References Reviews Resources