On local-global divisibility by p2 in elliptic curves
Abstract
Let p be a prime lager than 3. Let k be a number field, which does not contain the subfield of Q (ζp2) of degree p over Q. Suppose that E is an elliptic curve defined over k. We prove that the existence of a counterexample to the local-global divisibility by p2 in E, assures the existence of a k-rational point of exact order p in E. Using the Merel Theorem, we then shrunk the known set of primes for which there could be a counterexample to the local-global divisibility by p2.
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