Congruences modulo 23 to y2=x3-23 are trivial

Abstract

We say that two elliptic curves E and F over Q are congruent modulo a prime p if their p-torsion Galois modules (over the algebraic closure of Q) are isomorphic. Such a congruence is called trivial if there is a rational isogeny between E and F with degree prime to p. A version of the Frey-Mazur conjecture states that any congruence modulo any prime p ≥ 19 is trivial. Given an elliptic curve E/Q and a prime p, it is well-known that there is a twist of the classical modular curve X(p) whose rational points describe the elliptic curves congruent to E modulo p. In this article, we apply Mazur's strategy to determine the rational points of such a twisted modular curve under certain assumptions. This involves, among others, the determination of the previously unknown Tate module of its Jacobian and new instances of the Birch and Swinnerton--Dyer conjecture (for abelian varieties not of GL2-type). In particular, we determine an explicit bound on the conductor of any elliptic curve congruent modulo p to y2=x3-p when p is prime and congruent to 5 modulo 9, and deduce that any congruence modulo 23 to y2=x3-23 is trivial.