I'm writing a small project of elliptic curve cryptography, and the program works well when I use affine coordinate system, which means each point is represented by 2 coordinates (x',y').

Now I'm trying to replace affine coordinate system by jacobian coordinate system in which each point is represented by 3 coordinates (x,y,z), x' = x/z² and y' = y/z³.

**First of all, I'd like to know how to transform affine coordinates to jacobian coordinates**. In some tutorials, people uses the formula: (x,y) = (x,y,1)
which means the z-coordinate is always set to one. But I'm not sure if it's correct.

Then for points additions over elliptic curve, to calculate P(x1,y1,z1) + Q(x2,y2,z2) = R(x3,y3,z3). I've used the following formulas in my program :

*
u1 = x1.z2²*

u2 = x2.z1²

s1 = y1.z2³

s2 = y2.z1³

h = u2 - u1

r = s2 - s1

x3 = r² - h³ - 2.u1.h²

y3 = r.(u1.h² - x3) - s1.h³

*z3 = z1.z2.h
*

But when I test my program, I get some negative coordinates e.g. (-2854978200,-5344897546224,578). And when I try to convert the result back to affine coordinate system with the formular (x'=x/z²,y'=y/z³), I get (-8545, -27679), actually the x coordinate is -8545.689.... the jacobian x coordinate isn't divisible by z².

So I'd like to know, **what should I do if the coordinates are not integers** ? **and if they're negative** ? I've tried to MOD with the field size of my curve, but the result isn't correct either.

Thank you in advance for any comments ;)

Best regards.

================ update : 06/12/2011 11:50 ================

Thanks a lot Paulo.

I think now I start to understand how it works. So the point using jacobian coordinates `(x,y,1)`

is correct, but not unique. All points satisfying `(a^2.x,a^3.y,a)`

are equivalent. And in my program the curve is defined in a prime field, so when I calculate `u1, u2, s1, s2 ...`

**I should apply MOD p to each variable?**

And for transforming the final result back to affine coordinates, e.g. the x coordinate, in fact it is not a division, **it's a modular inverse?** For example, my curve is defined in a finite prime field `p=11`

, and I have a point using jacobian coordinates `(15,3,2)`

, to transform jacobian x coordinate to affine x coordinate, I have to calculate `2^2 = 4 => x = 4^-1 mod p => x = 3`

, and `15.3 mod p = 1`

, **so the affine x coordinate is 1, is that right?**

================ update : 06/12/2011 17:00 ================

The objective of jacobian coordinates is to avoid the division during addition.

But as Thomas Pornin said, when we calculate `P1 + P2 = P3`

, there are some special cases to handle.

- P1 and P2 are both infinite:
`P3=infinite`

. - P1 is infinite:
`P3=P2`

. - P2 is infinite:
`P3=P1`

. - P1 and P2 have the same x coordinate, but different y coordinates or both y coordinates equal 0:
`P3=infinite`

. - P1 and P2 have different x coordinate:
`Addition formula`

. - P1 and P2 have same coordinates:
`Doubling formula`

.

And here's prototypes of my C functions:

`jac_addition(jacobian *, point *, jacobian *);`

`jac_doubling(jacobian *, jacobian *);`

`point`

is a structure representing a point defined in affine coordinate system, and `jacobian`

for jacobian system.

The problem is when I handle those special cases, espacially the 4th one, I still have convert both points back to affine coordinates, or I can't campare their coordinates, which means I still have to calculate the division.

Is their any idea to solve this problem please ?

Thanks in advance.