On Silverman's conjecture for a family of elliptic curves

Abstract

Let E be an elliptic curve over Q with the given Weierstrass equation y2=x3+ax+b. If D is a squarefree integer, then let E(D) denote the D-quadratic twist of E that is given by E(D): y2=x3+aD2x+bD3. Let E(D)(Q) be the group of Q-rational points of E(D). It is conjectured by J. Silverman that there are infinitely many primes p for which E(p)(Q) has positive rank, and there are infinitely many primes q for which E(q)(Q) has rank 0. In this paper, assuming the parity conjecture, we show that for infinitely many primes p, the elliptic curve En(p): y2=x3-np2x has odd rank and for infinitely many primes p, En(p)(Q) has even rank, where n is a positive integer that can be written as biquadrates sums in two different ways, i.e., n=u4+v4=r4+s4, where u, v, r, s are positive integers such that (u,v)=(r,s)=1. More precisely, we prove that: if n can be written in two different ways as biquartic sums and p is prime, then under the assumption of the parity conjecture En(p)(Q) has odd rank (and so a positive rank) as long as n is odd and p5, 78 or n is even and p14. In the end, we also compute the ranks of some specific values of n and p explicitly.