Local-global divisibility on algebraic tori

Abstract

We give a complete answer to the local-global divisibility problem for algebraic tori. In particular, we prove that given an odd prime p, if T is an algebraic torus of dimension r< p-1 defined over a number field k, then the local-global divisibility by any power pn holds for T(k). We also show that this bound on the dimension is best possible, by providing a counterexample of every dimension r ≥ p-1. Finally, we prove that under certain hypotheses on the number field generated by the coordinates of the pn-torsion point of T, the local-global divisibility still holds for tori of dimension less than 3(p-1).