Rational torsion points on abelian surfaces with quaternionic multiplication
Abstract
Let A be an abelian surface over Q whose geometric endomorphism ring is a maximal order in a non-split quaternion algebra. Inspired by Mazur's theorem for elliptic curves, we show that the torsion subgroup of A(Q) is 12-torsion and has order at most 18. Under the additional assumption that A is of GL2-type, we give a complete classification of the possible torsion subgroups of A(Q).
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