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Torsion points on abelian varieties of CM-type

Alice Silverberg — 1988

Compositio Mathematica

Mordell-Weil groups of generic Abelian varieties.

Alice Silverberg — 1985

Inventiones mathematicae

Semistable reduction and torsion subgroups of abelian varieties

Alice Silverberg; Yuri G. Zarhin — 1995

Annales de l'institut Fourier

The main result of this paper implies that if an abelian variety over a field $F$ has a maximal isotropic subgroup of $n$ -torsion points all of which are defined over $F$ , and $n \geq 5$ , then the abelian variety has semistable reduction away from $n$ . This result can be viewed as an extension of Raynaud’s theorem that if an abelian variety and all its $n$ -torsion points are defined over a field $F$ and $n \geq 3$ , then the abelian variety has semistable reduction away from $n$ . We also give information about the Néron models...

Ranks of elliptic curves in families of quadratic twists.

Rubin, Karl; Silverberg, Alice — 2000

Experimental Mathematics

Rank frequencies for quadratic twists of elliptic curves.

Rubin, Karl; Silverberg, Alice — 2001

Experimental Mathematics

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