Local points on twists of X(p) with applications

Abstract

Let E/ Q be an elliptic curve and p ≥ 3 a prime. The modular curve XE-(p) parametrizes elliptic curves with p-torsion modules anti-symplectically isomorphic to E[p]. We give a complete classification of when XE-(p)( Q) is non-empty, for all primes ≠ p; our result also includes =p in most cases when E is semistable at p. We give two different applications. First, we classify CM curves E/ Q where the modular curve XE-(p) is a counterexample to the Hasse principle for infinitely many p. Assuming the Frey--Mazur conjecture, we prove that for at least 60\% of rational elliptic curves E, the modular curve XE-(p) is a counterexample to the Hasse principle for at least 50\% of primes p. Secondly, we introduce a new technique to the elimination stage of the modular method and apply it to show that x3+y3=5α zp has no non-trivial primitive solutions for various primes p satisfying (α/p)=-1. Moreover, as a by-product of our work, we simplify the assumptions of several local symplectic criteria due to the first author and Alain Kraus.