Elliptic Curves Containing Sequences of Consecutive Cubes

Abstract

Let E be an elliptic curve over Q described by y2= x3+ Kx+ L where K, L ∈ Q. A set of rational points (xi,yi) ∈ E(Q) for i=1, 2, ·s, k, is said to be a sequence of consecutive cubes on E if the x-coordinates of the points xi's for i=1, 2, ·s form consecutive cubes. In this note, we show the existence of an infinite family of elliptic curves containing a length-5-term sequence of consecutive cubes. Morever, these five rational points in E (Q) are linearly independent and the rank r of E(Q) is at least 5.