Divisibility of torsion subgroups of abelian surfaces over number fields
Abstract
Let A be a 2-dimensional abelian variety defined over a number field K. Fix a prime number and suppose \#A(Fp) 0 2 for a set of primes p ⊂ OK of density 1. When =2 Serre has shown that there does not necessarily exist a K-isogenous A' such that \#A'(K)tors 0 4. We extend those results to all odd and classify the abelian varieties that fail this divisibility principle for torsion in terms of the image of the mod-2 representation.
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