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author | Peter Dettman <peter.dettman@bouncycastle.org> | 2014-01-31 14:08:21 +0700 |
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committer | Peter Dettman <peter.dettman@bouncycastle.org> | 2014-01-31 14:08:21 +0700 |
commit | 32227c12d110f33e5dd52544868d7092735fd029 (patch) | |
tree | 4bb89bffee1ea50c8527fb567b9527c628a349c3 /crypto/src/math/ec/custom/sec/SecP192R1Point.cs | |
parent | Refactoring (diff) | |
download | BouncyCastle.NET-ed25519-32227c12d110f33e5dd52544868d7092735fd029.tar.xz |
Add custom curves for secp192k1 and secp192r1 (P-192)
Diffstat (limited to 'crypto/src/math/ec/custom/sec/SecP192R1Point.cs')
-rw-r--r-- | crypto/src/math/ec/custom/sec/SecP192R1Point.cs | 288 |
1 files changed, 288 insertions, 0 deletions
diff --git a/crypto/src/math/ec/custom/sec/SecP192R1Point.cs b/crypto/src/math/ec/custom/sec/SecP192R1Point.cs new file mode 100644 index 000000000..0dd81f0c7 --- /dev/null +++ b/crypto/src/math/ec/custom/sec/SecP192R1Point.cs @@ -0,0 +1,288 @@ +using System; + +namespace Org.BouncyCastle.Math.EC.Custom.Sec +{ + internal class SecP192R1Point + : ECPointBase + { + /** + * Create a point which encodes with point compression. + * + * @param curve + * the curve to use + * @param x + * affine x co-ordinate + * @param y + * affine y co-ordinate + * + * @deprecated Use ECCurve.createPoint to construct points + */ + public SecP192R1Point(ECCurve curve, ECFieldElement x, ECFieldElement y) + : this(curve, x, y, false) + { + } + + /** + * Create a point that encodes with or without point compresion. + * + * @param curve + * the curve to use + * @param x + * affine x co-ordinate + * @param y + * affine y co-ordinate + * @param withCompression + * if true encode with point compression + * + * @deprecated per-point compression property will be removed, refer + * {@link #getEncoded(bool)} + */ + public SecP192R1Point(ECCurve curve, ECFieldElement x, ECFieldElement y, bool withCompression) + : base(curve, x, y, withCompression) + { + if ((x == null) != (y == null)) + throw new ArgumentException("Exactly one of the field elements is null"); + } + + internal SecP192R1Point(ECCurve curve, ECFieldElement x, ECFieldElement y, ECFieldElement[] zs, bool withCompression) + : base(curve, x, y, zs, withCompression) + { + } + + protected override ECPoint Detach() + { + return new SecP192R1Point(null, AffineXCoord, AffineYCoord); + } + + protected internal override bool CompressionYTilde + { + get { return this.AffineYCoord.TestBitZero(); } + } + + public override ECPoint Add(ECPoint b) + { + if (this.IsInfinity) + return b; + if (b.IsInfinity) + return this; + if (this == b) + return Twice(); + + ECCurve curve = this.Curve; + + SecP192R1FieldElement X1 = (SecP192R1FieldElement)this.RawXCoord, Y1 = (SecP192R1FieldElement)this.RawYCoord; + SecP192R1FieldElement X2 = (SecP192R1FieldElement)b.RawXCoord, Y2 = (SecP192R1FieldElement)b.RawYCoord; + + SecP192R1FieldElement Z1 = (SecP192R1FieldElement)this.RawZCoords[0]; + SecP192R1FieldElement Z2 = (SecP192R1FieldElement)b.RawZCoords[0]; + + uint[] tt1 = Nat192.CreateExt(); + uint[] tt2 = Nat192.CreateExt(); + uint[] t3 = Nat192.Create(); + uint[] t4 = Nat192.Create(); + + bool Z1IsOne = Z1.IsOne; + uint[] U2, S2; + if (Z1IsOne) + { + U2 = X2.x; + S2 = Y2.x; + } + else + { + S2 = t3; + SecP192R1Field.Square(Z1.x, S2); + + U2 = tt2; + SecP192R1Field.Multiply(S2, X2.x, U2); + + SecP192R1Field.Multiply(S2, Z1.x, S2); + SecP192R1Field.Multiply(S2, Y2.x, S2); + } + + bool Z2IsOne = Z2.IsOne; + uint[] U1, S1; + if (Z2IsOne) + { + U1 = X1.x; + S1 = Y1.x; + } + else + { + S1 = t4; + SecP192R1Field.Square(Z2.x, S1); + + U1 = tt1; + SecP192R1Field.Multiply(S1, X1.x, U1); + + SecP192R1Field.Multiply(S1, Z2.x, S1); + SecP192R1Field.Multiply(S1, Y1.x, S1); + } + + uint[] H = Nat192.Create(); + SecP192R1Field.Subtract(U1, U2, H); + + uint[] R = tt2; + SecP192R1Field.Subtract(S1, S2, R); + + // Check if b == this or b == -this + if (Nat192.IsZero(H)) + { + if (Nat192.IsZero(R)) + { + // this == b, i.e. this must be doubled + return this.Twice(); + } + + // this == -b, i.e. the result is the point at infinity + return curve.Infinity; + } + + uint[] HSquared = t3; + SecP192R1Field.Square(H, HSquared); + + uint[] G = Nat192.Create(); + SecP192R1Field.Multiply(HSquared, H, G); + + uint[] V = t3; + SecP192R1Field.Multiply(HSquared, U1, V); + + Nat192.Mul(S1, G, tt1); + + SecP192R1FieldElement X3 = new SecP192R1FieldElement(t4); + SecP192R1Field.Square(R, X3.x); + SecP192R1Field.Add(X3.x, G, X3.x); + SecP192R1Field.Subtract(X3.x, V, X3.x); + SecP192R1Field.Subtract(X3.x, V, X3.x); + + SecP192R1FieldElement Y3 = new SecP192R1FieldElement(G); + SecP192R1Field.Subtract(V, X3.x, Y3.x); + Nat192.Mul(Y3.x, R, tt2); + SecP192R1Field.SubtractExt(tt2, tt1, tt2); + SecP192R1Field.Reduce(tt2, Y3.x); + + SecP192R1FieldElement Z3 = new SecP192R1FieldElement(H); + if (!Z1IsOne) + { + SecP192R1Field.Multiply(Z3.x, Z1.x, Z3.x); + } + if (!Z2IsOne) + { + SecP192R1Field.Multiply(Z3.x, Z2.x, Z3.x); + } + + ECFieldElement[] zs = new ECFieldElement[] { Z3 }; + + return new SecP192R1Point(curve, X3, Y3, zs, IsCompressed); + } + + public override ECPoint Twice() + { + if (this.IsInfinity) + return this; + + ECCurve curve = this.Curve; + + SecP192R1FieldElement Y1 = (SecP192R1FieldElement)this.RawYCoord; + if (Y1.IsZero) + return curve.Infinity; + + SecP192R1FieldElement X1 = (SecP192R1FieldElement)this.RawXCoord, Z1 = (SecP192R1FieldElement)this.RawZCoords[0]; + + uint[] t1 = Nat192.Create(); + uint[] t2 = Nat192.Create(); + + uint[] Y1Squared = Nat192.Create(); + SecP192R1Field.Square(Y1.x, Y1Squared); + + uint[] T = Nat192.Create(); + SecP192R1Field.Square(Y1Squared, T); + + bool Z1IsOne = Z1.IsOne; + + uint[] Z1Squared = Z1.x; + if (!Z1IsOne) + { + Z1Squared = t2; + SecP192R1Field.Square(Z1.x, Z1Squared); + } + + SecP192R1Field.Subtract(X1.x, Z1Squared, t1); + + uint[] M = t2; + SecP192R1Field.Add(X1.x, Z1Squared, M); + SecP192R1Field.Multiply(M, t1, M); + SecP192R1Field.Twice(M, t1); + SecP192R1Field.Add(M, t1, M); + + uint[] S = Y1Squared; + SecP192R1Field.Multiply(Y1Squared, X1.x, S); + SecP192R1Field.Twice(S, S); + SecP192R1Field.Twice(S, S); + + SecP192R1Field.Twice(T, t1); + SecP192R1Field.Twice(t1, t1); + SecP192R1Field.Twice(t1, t1); + + SecP192R1FieldElement X3 = new SecP192R1FieldElement(T); + SecP192R1Field.Square(M, X3.x); + SecP192R1Field.Subtract(X3.x, S, X3.x); + SecP192R1Field.Subtract(X3.x, S, X3.x); + + SecP192R1FieldElement Y3 = new SecP192R1FieldElement(S); + SecP192R1Field.Subtract(S, X3.x, Y3.x); + SecP192R1Field.Multiply(Y3.x, M, Y3.x); + SecP192R1Field.Subtract(Y3.x, t1, Y3.x); + + SecP192R1FieldElement Z3 = new SecP192R1FieldElement(M); + SecP192R1Field.Twice(Y1.x, Z3.x); + if (!Z1IsOne) + { + SecP192R1Field.Multiply(Z3.x, Z1.x, Z3.x); + } + + return new SecP192R1Point(curve, X3, Y3, new ECFieldElement[] { Z3 }, IsCompressed); + } + + public override ECPoint TwicePlus(ECPoint b) + { + if (this == b) + return ThreeTimes(); + if (this.IsInfinity) + return b; + if (b.IsInfinity) + return Twice(); + + ECFieldElement Y1 = this.RawYCoord; + if (Y1.IsZero) + return b; + + return Twice().Add(b); + } + + public override ECPoint ThreeTimes() + { + if (this.IsInfinity || this.RawYCoord.IsZero) + return this; + + // NOTE: Be careful about recursions between TwicePlus and ThreeTimes + return Twice().Add(this); + } + + public override ECPoint Subtract(ECPoint b) + { + if (b.IsInfinity) + return this; + + return Add(b.Negate()); + } + + public override ECPoint Negate() + { + if (IsInfinity) + return this; + + return new SecP192R1Point(Curve, RawXCoord, RawYCoord.Negate(), RawZCoords, IsCompressed); + } + } +} |