On the sums of two cubes

Abstract

We solve the equation f(x,y)3 + g(x,y)3 = x3 + y3 for homogeneous f, g ∈ C(x,y), completing an investigation begun by Vi\`ete in 1591. The usual addition law for elliptic curves and composition give rise to two binary operations on the set of solutions. We show that a particular subset of the set of solutions is ring-isomorphic to Z[e2 π i / 3].