# Elliptic curve addition in Jacobian coordinates

I try to add two points on an elliptic curve over a prime field, converting these points from affine/to-affine coordinates, but do not manage to get a correct result (the curve I am testing has a=0). Anyone can see what's wrong?

``````// From Affine
BigInteger X1=P.x;
BigInteger Y1=P.y;
BigInteger Z1=BigInteger.ONE;

BigInteger X2=Q.x;
BigInteger Y2=Q.y;
BigInteger Z2=BigInteger.ONE;

// Point addition in Jacobian coordinates for a=0
BigInteger Z1Z1 = Z1.multiply(Z1);
BigInteger Z2Z2 = Z2.multiply(Z2);
BigInteger U1   = X1.multiply(Z2Z2);
BigInteger U2   = X2.multiply(Z1Z1);
BigInteger S1   = Y1.multiply(Z2).multiply(Z2Z2);
BigInteger S2   = Y2.multiply(Z1).multiply(Z1Z1);
BigInteger H    = U2.subtract(U1);
BigInteger J    = H.multiply(I);
BigInteger V    = U1.multiply(I);
To verify... `BigInteger.ONE == 1`, is that correct? So `Z1Z1 = Z1^2=1=Z2Z2=Z2^2=1`... Then `U1=X1`, `U2=X2`, `S1=Y1`, and so on... am I missing something? –  abiessu Jan 30 '14 at 17:18
The division can't be right. You need to compute the multiplicative inverse modulo `FIELD`. This operation is quite expensive, and should only be performed once at the end of a scalar multiplication, not after each doubling/addition. Use `z^{-1} = ModPow(z, FIELD-2, FIELD)` –  CodesInChaos Jan 30 '14 at 17:24