Elliptic Curve Cryptography

Abstract

The rational points on singular cubic curves and on non-singular cubic curves behave differently. The set of rational points on a non-singular cubic curve is finitely generated but the group of rational points on singular curve is not finitely generated. An elliptic curve is a non-singular cubic curve of genus one in two variables over a eld K with points having coordinates in eld K together with a special point,point at in nity O. he rational points on singular cubic curves and on non-singular cubic curves behave differently. The set of rational points on a non-singular cubic curve is nitely generated but the group of rational points on singular curve is not nitely generated.