On local-global divisibility by pn in elliptic curves

Abstract

Let p be a prime number and let k be a number field, which does not contain the field Q (ζp + ζp). Let E be an elliptic curve defined over k. We prove that if there are no k-rational torsion points of exact order p on , then the local-global principle holds for divisibility by pn, with n a natural number. As a consequence of the deep theorem of Merel, for p larger than a constant depending only on the degree of k, there are no counterexamples to the local-global divisibility principle. Nice and deep works give explicit small constants for elliptic curves defined over a number field of degree at most 5 over $Q.