Complex multipliction by \((1+\sqrt{-19})/2\) (Q802623)

The authors consider the elliptic curves \(E_ D: y^ 2=x^ 3-2^ 3.19.D^ 2.x-2.19^ 2.D^ 3\) over \({\mathbb{Q}}\) having the full ring R of integers of the quadratic imaginary field \(K={\mathbb{Q}}(\sqrt{-19})\) as their ring of endomorphisms, where D denotes a square-free rational integer. They use Stark's method of continued fractions [cf. \textit{H. M. Stark} in Modular Functions Variable I, Proc. internat. Summer School, Univ. Antwerp 1972, Lect. Notes Math. 320, 153-174 (1973; Zbl 0259.10026)] to compute an explicit formula for complex multiplication of \(E_ D\) by the non-unit of smallest norm \((1+\sqrt{-19})/2\) in R. This supplements earlier calculations of the least named author concerning the elliptic curves with complex multiplication by the full ring of integers of \({\mathbb{Q}}(\sqrt{-m})\) for \(m=1, 2, 3, 7, 11\) and leaves the cases of \(m=43, 65\) and 163 undone. As an application, one can compute the \(\sqrt{-19}\)-division points on \(E_ D\) which the authors intend to carry out in connection with a new cubic character sum in a forthcoming paper.