Applications of the square sieve to a conjecture of Lang and Trotter for a pair of elliptic curves over the rationals

Abstract

Let E be an elliptic curve over Q. Let p be a prime of good reduction for E. Then, for a prime p ≠ , the Frobenius automorphism associated to p (unique up to conjugation) acts on the -adic Tate module of E. The characteristic polynomial of the Frobenius automorphism has rational integer coefficients and is independent of . Its splitting field is called the Frobenius field of E at p. Let E1 and E2 be two elliptic curves defined over Q that are non-isogenous over Q and also without complex multiplication over Q. In analogy with the well-known Lang-Trotter conjecture for a single elliptic curve, it is natural to consider the asymptotic behaviour of the function that counts the number of primes p ≤ x such that the Frobenius fields of E1 and E2 at p coincide. In this short note, using Heath-Brown's square sieve, we provide both conditional (upon the Generalized Riemann Hypothesis) and unconditional upper bounds.