Jack Klys
Published 2016-05-14Version 1
We present several new examples of reflection principles which apply to both class groups of number fields and picard groups of of curves over $\mathbb{P}^{1}/\mathbb{F}_{p}$. This proves a conjecture of Lemmermeyer about equality of 2-rank in subfields of $A_{4}$, up to a constant not depending on the discriminant in the number field case, and exactly in the function field case. More generally we prove similar relations for subfields of a Galois extension with group $G$ for the cases when $G$ is $S_{3}$, $S_{4}$, $A_{4}$, $D_{2l}$ and $\mathbb{Z}/l\mathbb{Z}\rtimes\mathbb{Z}/r\mathbb{Z}$. The method of proof uses sheaf cohomology on 1-dimensional schemes, which reduces to Galois module computations.
$2^\infty$-Selmer groups, $2^\infty$-class groups, and Goldfeld's conjecture
High $\ell$-torsion rank for class groups over function fields
A Classification of order $4$ class groups of $\mathbb{Q}{(\sqrt{n^2+1})}$
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