On the family of elliptic curves y2=x3-m2x + (pqr)2
Abstract
In this article, we consider a family of elliptic curves defined by Em: y2= x3 -m2 x + (pqr)2 where m is a positive integer and p, q, ~and~ r are distinct odd primes and study the torsion as well the rank of Em(Q). More specifically, we proved that if m 0 3, m 0 4 ~and~ m 2 2k where k ≥ 5, then the torsion subgroup of Em(Q) is trivial and lower bound of the Q rank of this family of elliptic curves is 2.
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