# openssl elliptic curves

I have an elliptic curve EC and I need to find such an point G of EC which coordinate is the smallest non-negative integer of all points on the curve. I need it for an implementation of ECOH hashing algorithm. I was trying to use openssl to achieve this goal but so far I haven't figure out how to find such a point. I was trying to do this:

``````EC_POINT *G = EC_POINT_new(ec);
for(int i = 1; i < 1024; i++)
{
itoa(i, str, 10);
BN_dec2bn(&x, str);
EC_POINT_set_affine_coordinates_GFp(ec, G, x, y, ctx);
if(EC_POINT_is_on_curve(ec, G, ctx))
printf("%s\n", str);
}
``````

But it only checks whether the point with the coordinates of (x, y) is on the curve or not. How can I find it?

-

First, find a generator if `ec` did not provide one. I suppose you want generator with the smallest x-coordinate. You can do something like this:

``````// Suppose you've found a generator point G, and a BIGNUM context bn_ctx
// has been created and initialized

BIGNUM x, y, x_min, y_min;
BN_init(&x); BN_init(&x_min);
BN_init(&y); BN_init(&y_min);

EC_POINT *P = EC_POINT_new(ec);
EC_POINT_copy(P,G);
EC_POINT_get_affine_coordinates_GFp(ec,P,x_min,y_min,bn_ctx);
do{
EC_POINT_get_affine_coordinates_GFp(ec,P,x,y,bn_ctx);
if (x < x_min) {
BN_copy(x_min, x);
BN_copy(y_min, y);
}
}while(!EC_POINT_is_at_infinity(ec,P));
``````

Then you'll have your generator (x,y) with smallest x-coordinate. As to how to find a generator in the first place, that's another story.

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After `x_min = x;`, the internal pointer of `x_min` and `x` will point to the same memory block. Thus further change to the internal data of `x` will reflect on `x_min` also. –  updogliu Dec 31 '13 at 6:01
@updogliu Thank you for finding my mistakes! I've fixed it with `BN_copy`. Thank you. –  ChiaraHsieh Jan 1 at 14:55
Instead of using `EC_POINT_set_affine_coordinates_GFp`, which requires both `x` and `y`, use `EC_POINT_set_compressed_coordinates_GFp`, which instead of a `y` takes a `y_bit` denoting which of the two `y` values (even or odd) to use for a given `x` (if the `x` is within the curve's domain).
Then you should be able to just loop through the first few `x` to find the coordinate with the smallest `x`, just as you're attempting to do.