# Point subtraction in elliptic curve cryptography

I want to do point subtraction on an elliptic curve on a prime field. I tried taking the points to be subtracted as `(x,-y log(p))` but my answer doesn't seem to match.

This is how I tried to do the subtraction:

`````` s9=point_addition(s6.a,s6.b,((s8.a)%211) ,-((s8.b)%211));
``````

here `s9`, `s6` and `s8` are all structures with two `int`.

and this is my function which does the point addition:

``````structure point_addition(int x1, int y1, int x2, int y2)
{
int s,xL,yL;
if((x1-x2)!=0)
{
if ((((y1-y2)/(x1-x2)) % 211)>0)
s=(((y1-y2)/(x1-x2)) % 211);
else
s=(((y1-y2)/(x1-x2)) % 211) + 211;
if ((((s*s)-(x1+x2)) % 211)>0)
xL= (((s*s)-(x1+x2)) % 211) ;
else
xL= (((s*s)-(x1+x2)) % 211) + 211;
if(((-y1+s*(x1-x2)) % 211)>0)
yL= ((-y1+s*(x1-xL)) % 211);
else
yL= ((-y1+s*(x1-x2)) % 211) + 211;
}
else
{
xL= 198 ;
yL= 139;
}

s7.a= xL;
s7.b= yL;

return s7 ;
}
``````

The programs doesn't seem to give me the correct co-ordinates Please help me with this coding for elliptic curve cryptography.

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Don't forget to tag the language you are performing the calculation in Jowin, if only to increase the number of views. I've guessed C, but you can re-edit your question to change that. –  owlstead Mar 16 at 15:21
Jowin, "division" mod p means you have to compute a modular inverse. `s=(((y1-y2)/(x1-x2)) % 211)` is not the correct way to do it. –  GregS Mar 16 at 15:27
GregS, I see I have to edit my code to do division with modular inverse method.. but I wonder how even with normal division Whatever points I got were on the elliptic curve!.. Thanks a lot for your answer! and In my program an infinity point has to be considered for the ellipse what point can I take for that? –  Jowin Sathianesan Mar 17 at 9:21

See GregS's comment about division mod p. You need to find the inverse of the denominator and then multiply. To calculate the modular inverse you could use the extended euclidean algorithm.

Also the way you're negating the y coordinate then adding 211 later is a bit odd. Best to keep field elements in the proper range when passing as arguments, e.g. to obtain -y mod p, use p-y.

And I assume this is just a learning exercise since you're using a very small field :)

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Could you please elaborate I feel that p-y is what I am finding to replace -y mod(p) in my program Correct me if I am wrong on this. –  Jowin Sathianesan Mar 17 at 9:18
Yes I think it's ok in your case. I'm just saying that using different representations of the same field element is asking for trouble. Say you passed x1=210 and x2=-1 to point_addition.The check if((x1-x2)!=0) would not work. –  Frank Mar 17 at 11:29