`G(Gx, Gy)`

-- which is also called **generator** -- is a point on Elliptic Curve (*EC*) on Finite field. Finite field size = `p`

-- prime modulus.

Say we have an *EC(Fp)*: `y**2 = x**3 + ax + b (mod p)`

How should the point `G`

be selected on it?

Does every point has to be found on *EC(Fp)* and then chosen one of those?

Or `Gx`

\ `Gy`

have to be somehow specific?

The only thing i know: `G`

's order must be a prime number.

*P.S.*
Sorry for my English and Thank you.

`FIPS 186-3`

. Found there:"value of G should be generated canonically (verifiably random)." Are you sure about:"Not every elliptic curve group has a generator"? # about the question in the end: trying to implement curve generation for ECDSA; – ted May 1 '12 at 19:41`cofactor`

= (curve cardinality)/(point order), where cardinality is a number of the points on the curve. – ted May 2 '12 at 3:04