Elliptic Curves with positive rank and no integral points

Abstract

We consider all odd fundamental discriminants D 2 3 and their mirror discriminants D' = -3D, and we study the family of elliptic curves ED': y2 = x3 + 16D'. We denote by r3(D) and r3(D') the rank of the 3-part of the ideal class group of Q(D) and Q(D') respectively. We show that every curve in the subfamily of elliptic curves ED' with r3(D) = r3(D') + 1 for D < 0 (respectively, with r3(D) = r3(D') for D > 0) cannot have any integral points, and this is proved unconditionally. By employing results of Satg\'e and by assuming finiteness of the 3-primary part of their Tate-Shafarevich group, we show that the curves ED' must have odd rank when D < 0 and even rank when D > 0. This result is particularly interesting for the case of D < 0 since every curve ED' with r3(D) = r3(D') + 1 has infinitely many rational points - assuming finiteness of the 3-primary part of their Tate-Shafarevich group - yet no integral points. We obtain an unconditional result on the existence of elliptic curves with non-trivial rank and no integral points, by defining a parametrised family of such curves with no integral points but with a parametrised rational point, which we prove that it is of infinite order.