Homogeneous division polynomials for Weierstrass elliptic curves

Abstract

Starting from the classical division polynomials we construct homogeneous polynomials αn, βn, γn such that for P = (x:y:z) on an elliptic curve in Weierstrass form over an arbitrary ring we have nP = (αn(P):βn(P):γn(P)). To show that αn,βn,γn indeed have this property we use the a priori existence of such polynomials, which we deduce from the Theorem of the Cube. We then use this result to show that the equations defining the modular curve Y1(n) C computed for example by Baaziz, in fact are equations of Y1(n) over Z[1/n].