An Improved Bound Towards a Conjecture of Serre on Surjective Galois Representations

Abstract

Suppose that E is an elliptic curve defined over Q without complex multiplication and with conductor N. For each positive integer m, the action of the absolute Galois group GQ=Gal(Q/Q) on the torsion points over Q gives rise to a representation of GQ. A celebrated paper of Serre shows that this representation is surjective for all sufficiently large primes; the other primes are termed exceptional. Serre conjectures that there are no exceptional primes >37 for any non CM elliptic curve over Q. The best result in this direction is due to Cojocaru, who proves that the largest exceptional prime 0ε N1+ε. In this paper we lower the exponent on the bound to obtain 0ε N01/4+ε, where N0 is the product of primes of bad reduction. If E has no places of multiplicative reduction, then we have 0εN1/8+ε. Assuming the Frey-Szpiro conjecture, we have that 0εN1/8+ε in general. Our main methods include the Rankin-Selberg method and the classical work on distribution of quadratic residues.