Visible to Intel only — GUID: GUID-88FB90AD-59D7-4F28-8718-BFFE52AA2693
Visible to Intel only — GUID: GUID-88FB90AD-59D7-4F28-8718-BFFE52AA2693
NIST Recommended Elliptic Curve Functions
Elliptic Curve Notation
There are several kinds of defining equation for elliptic curves, but this section deals with Weierstrass equations. For the prime finite field GF(p), p>3, the Weierstrass equation is E : y2= x3+ a*x + b, where a and b are integers modulo p. Number of points on the elliptic curve E is denoted by #E.
For purpose of cryptography some additional parameters are presented:
n - prime divisor of #E and the order of point G
G - the point on curve E generated subgroup of the order n
The set of p, a, b, n and G parameters are Elliptic Curve (EC) domain parameter. This section deals with three NIST recommended Elliptic Curves those domain parameters are known and published in [SEC2] (Standards for Efficient Cryptography Group, “Recommended Elliptic Curve Domain Parameters”, SEC 2, September 2000).
Elliptic Curve Key Pair
Private key is a positive integer u in the range [1, n-1]. Public key V, which is the point on elliptic curve E, where V = [u]*G. In cryptography, there are two types of key pairs: regular (or longterm) and ephemeral (or nonce - number that can only be used once). From the math point of view, they are similar.
ECDSA signature generation
Input:
The EC domain parameters p, a, b, n and G
The signer’s regular u and ephemeral k private keys
The message representative, which is an integer f>=0
Output: The signature, which is a pair of integers (r, s), where r and s belongs the range [1. r-1].
Operation:
Compute an ephemeral public key K = [k]G. Let K = (x, y)
Compute an integer r = x mod n
Compute an integer s = (k-1)*(f + u*r) mod n
Return (r, s) as signature
ECDHE generation of shared secret
Input:
The EC domain parameters p, a, b, n and G
The own ephemeral private key u
The party’s ephemeral public key W
Output: The derived shared secret value z, which is the GF(p) field element
Operation:
Compute an EC point P = [u]W, P=(xp, yp)
Let z = xp
Return shared secret z