A sextic diophantine chain and a related Mordell curve

Abstract

In this paper we obtain parametric as well as numerical solutions of the sextic diophantine chain φ(x1,\,y1,\,z1)=φ(x2,\,y2,\,z2)=φ(x3,\,y3,\,z3)=k where φ(x,\,y,\,z) is a sextic form defined by φ(x,\,y,\,z) =x6+y6+z6-2x3y3-2x3z3-2y3z3 and k is an integer. Each numerical solution of such a sextic chain yields, in general, nine rational points on the Mordell curve y2=x3+k/4. While all of these nine points are not independent in the group of rational points of the Mordell curve, we have constructed a parameterized family of Mordell curves of generic rank ≥ 6 using the aforementioned parametric solution of the sextic diophantine chain. Similarly, the numerical solutions of the sextic chain yield additional examples of Mordell curves whose rank is ≥ 6.