Torsion of Abelian varieties over solvable extensions of number fields
Abstract
Let K be a number field, and let A be an Abelian variety over K which has no CM isogeny-factors over K. We prove that A has only finitely many torsion points over the maximal n-step-solvable extension of K for any n and only finitely many torsion points of prime order over the maximal prosolvable extension of K.
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