Jean Gillibert
Published 2018-07-08Version 1
Let $C$ be a hyperelliptic curve defined over $\mathbb{Q}$, whose Weierstrass points are defined over extensions of $\mathbb{Q}$ of degree at most three, and at least one of them is rational. Generalizing a result of R. Soleng (in the case of elliptic curves), we prove that any line bundle of degree $0$ on $C$ which is not torsion can be specialised into ideal classes of imaginary quadratic fields whose order can be made arbitrarily large. This gives a positive answer, for such curves, to a question by Agboola and Pappas.
Comments: 28 pages, LaTeX
On the exponents of class groups of some families of imaginary quadratic fields
$2^\infty$-Selmer groups, $2^\infty$-class groups, and Goldfeld's conjecture
Imaginary quadratic fields k with Cl_2(k) = (2,2^m) and Rank Cl_2(k^1) = 2
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