Gunther Cornelissen
Published 1999-08-31, updated 1999-09-01Version 2
Let G be the separable Galois group of a finite field F of characteristic p, and X/F an imaginary hyperelliptic curve such that G acts transitively on its set W(X) of Weierstrass points. The existence of a G-invariant 2-torsion point on the Jacobian J(X) of X depends only on the parity of |W(X)|, but for large enough |F|, there exist two such curves X and X' with |W(X)|=|W(X')|, such that J(X) has (and J(X') does not have) a G-invariant 4-torsion point. The problem is equivalent to a study of the 2-,4- and 8-rank of the class number of the maximal order in the function field of such curves, and is investigated via the 2-primary class field tower. Contrary to the case of number fields, the ambiguous class depends on the discriminant, and a governing field for the 8-rank of such function fields is not known.
Comments: 10 pages, LaTeX, uses `a4'
The $4$-rank of class groups of $K(\sqrt{n})$
Bounds for the $\ell$-torsion in class groups
Average bounds for the $\ell$-torsion in class groups of cyclic extensions
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