On a family of elliptic curves of rank at least 2

Abstract

Let Cm : y2 = x3 - m2x +p2q2 be a family of elliptic curves over Q, where m is a positive integer and p, q are distinct odd primes. We study the torsion part and the rank of Cm(Q). More specifically, we prove that the torsion subgroup of Cm(Q) is trivial and the Q-rank of this family is at least 2, whenever m 0 4 and m 2 64 with neither p nor q divides m.