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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.

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Not every elliptic curve group has a generator. Some are cyclic, but others are the product of two cyclic groups. But the question is really too mathematical for stack overflow. You can already avoid these tricky mathematics by using one of the predefined curves in FIPS 186-3. May I ask: what are you trying to do? –  JamesKPolk Apr 30 '12 at 22:18
@GregS, Thank you for the 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
Yes, I am sure. Not every elliptic curve is cyclic. As I said, the discussion is too mathematical for SO. Whether or not a point generates the curve group is not significant anyway. What matters is the order of the group generated by the point. –  JamesKPolk May 1 '12 at 22:32
@GregS, OK then. Remains to discover how to choose a point on curve with a prime order. Thanks again. –  ted May 2 '12 at 2:51
Seems like a generator may be selected randomly and then multiplied by the cofactor = (curve cardinality)/(point order), where cardinality is a number of the points on the curve. –  ted May 2 '12 at 3:04

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