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using System;
using System.Collections;
using System.Diagnostics;
using Org.BouncyCastle.Math.EC.Multiplier;
namespace Org.BouncyCastle.Math.EC
{
/**
* base class for points on elliptic curves.
*/
public abstract class ECPoint
{
protected static ECFieldElement[] EMPTY_ZS = new ECFieldElement[0];
protected static ECFieldElement[] GetInitialZCoords(ECCurve curve)
{
// Cope with null curve, most commonly used by implicitlyCa
int coord = null == curve ? ECCurve.COORD_AFFINE : curve.CoordinateSystem;
switch (coord)
{
case ECCurve.COORD_AFFINE:
case ECCurve.COORD_LAMBDA_AFFINE:
return EMPTY_ZS;
default:
break;
}
ECFieldElement one = curve.FromBigInteger(BigInteger.One);
switch (coord)
{
case ECCurve.COORD_HOMOGENEOUS:
case ECCurve.COORD_JACOBIAN:
case ECCurve.COORD_LAMBDA_PROJECTIVE:
return new ECFieldElement[] { one };
case ECCurve.COORD_JACOBIAN_CHUDNOVSKY:
return new ECFieldElement[] { one, one, one };
case ECCurve.COORD_JACOBIAN_MODIFIED:
return new ECFieldElement[] { one, curve.A };
default:
throw new ArgumentException("unknown coordinate system");
}
}
protected internal readonly ECCurve m_curve;
protected internal readonly ECFieldElement m_x, m_y;
protected internal readonly ECFieldElement[] m_zs;
protected internal readonly bool m_withCompression;
protected internal PreCompInfo m_preCompInfo = null;
protected ECPoint(
ECCurve curve,
ECFieldElement x,
ECFieldElement y,
bool withCompression)
{
this.m_curve = curve;
this.m_x = x;
this.m_y = y;
this.m_withCompression = withCompression;
}
protected ECPoint(ECCurve curve, ECFieldElement x, ECFieldElement y, ECFieldElement[] zs)
{
this.m_curve = curve;
this.m_x = x;
this.m_y = y;
this.m_zs = zs;
}
public virtual ECCurve Curve
{
get { return m_curve; }
}
protected virtual int CurveCoordinateSystem
{
get
{
// Cope with null curve, most commonly used by implicitlyCa
return null == m_curve ? ECCurve.COORD_AFFINE : m_curve.CoordinateSystem;
}
}
public virtual ECFieldElement X
{
get { return m_x; }
}
public virtual ECFieldElement Y
{
get { return m_y; }
}
public virtual ECFieldElement GetZCoord(int index)
{
return (index < 0 || index >= m_zs.Length) ? null : m_zs[index];
}
public virtual ECFieldElement[] GetZCoords()
{
int zsLen = m_zs.Length;
if (zsLen == 0)
{
return m_zs;
}
ECFieldElement[] copy = new ECFieldElement[zsLen];
Array.Copy(m_zs, 0, copy, 0, zsLen);
return copy;
}
protected virtual void CheckNormalized()
{
if (!IsNormalized())
throw new InvalidOperationException("point not in normal form");
}
public virtual bool IsNormalized()
{
int coord = this.CurveCoordinateSystem;
return coord == ECCurve.COORD_AFFINE
|| coord == ECCurve.COORD_LAMBDA_AFFINE
|| IsInfinity;
//|| zs[0].isOne();
}
/**
* Normalization ensures that any projective coordinate is 1, and therefore that the x, y
* coordinates reflect those of the equivalent point in an affine coordinate system.
*
* @return a new ECPoint instance representing the same point, but with normalized coordinates
*/
public virtual ECPoint Normalize()
{
if (this.IsInfinity)
{
return this;
}
switch (this.CurveCoordinateSystem)
{
case ECCurve.COORD_AFFINE:
case ECCurve.COORD_LAMBDA_AFFINE:
{
return this;
}
default:
{
ECFieldElement Z1 = GetZCoord(0);
if (Z1.IsOne)
{
return this;
}
return Normalize(Z1.Invert());
}
}
}
internal virtual ECPoint Normalize(ECFieldElement zInv)
{
throw new InvalidOperationException("not a projective coordinate system");
//switch (this.CurveCoordinateSystem)
//{
// case ECCurve.COORD_HOMOGENEOUS:
// case ECCurve.COORD_LAMBDA_PROJECTIVE:
// {
// return CreateScaledPoint(zInv, zInv);
// }
// case ECCurve.COORD_JACOBIAN:
// case ECCurve.COORD_JACOBIAN_CHUDNOVSKY:
// case ECCurve.COORD_JACOBIAN_MODIFIED:
// {
// ECFieldElement zInv2 = zInv.Square(), zInv3 = zInv2.Multiply(zInv);
// return CreateScaledPoint(zInv2, zInv3);
// }
// default:
// {
// throw new InvalidOperationException("not a projective coordinate system");
// }
//}
}
public bool IsInfinity
{
get { return m_x == null && m_y == null; }
}
public bool IsCompressed
{
get { return m_withCompression; }
}
public override bool Equals(object obj)
{
return Equals(obj as ECPoint);
}
public virtual bool Equals(ECPoint other)
{
if (this == other)
return true;
if (null == other)
return false;
bool i1 = IsInfinity, i2 = other.IsInfinity;
if (i1 || i2)
{
return i1 && i2;
}
return X.Equals(other.X) && Y.Equals(other.Y);
}
public override int GetHashCode()
{
int hc = 0;
if (!IsInfinity)
{
hc ^= X.GetHashCode() * 17;
hc ^= Y.GetHashCode() * 257;
}
return hc;
}
public virtual byte[] GetEncoded()
{
return GetEncoded(m_withCompression);
}
public abstract byte[] GetEncoded(bool compressed);
protected internal abstract bool CompressionYTilde { get; }
public abstract ECPoint Add(ECPoint b);
public abstract ECPoint Subtract(ECPoint b);
public abstract ECPoint Negate();
public virtual ECPoint TimesPow2(int e)
{
if (e < 0)
throw new ArgumentException("cannot be negative", "e");
ECPoint p = this;
while (--e >= 0)
{
p = p.Twice();
}
return p;
}
public abstract ECPoint Twice();
public abstract ECPoint Multiply(BigInteger b);
public virtual ECPoint TwicePlus(ECPoint b)
{
return Twice().Add(b);
}
public virtual ECPoint ThreeTimes()
{
return TwicePlus(this);
}
}
public abstract class ECPointBase
: ECPoint
{
protected internal ECPointBase(
ECCurve curve,
ECFieldElement x,
ECFieldElement y,
bool withCompression)
: base(curve, x, y, withCompression)
{
}
/**
* return the field element encoded with point compression. (S 4.3.6)
*/
public override byte[] GetEncoded(bool compressed)
{
if (this.IsInfinity)
{
return new byte[1];
}
ECPoint normed = Normalize();
byte[] X = normed.X.GetEncoded();
if (compressed)
{
byte[] PO = new byte[X.Length + 1];
PO[0] = (byte)(normed.CompressionYTilde ? 0x03 : 0x02);
Array.Copy(X, 0, PO, 1, X.Length);
return PO;
}
byte[] Y = normed.Y.GetEncoded();
{
byte[] PO = new byte[X.Length + Y.Length + 1];
PO[0] = 0x04;
Array.Copy(X, 0, PO, 1, X.Length);
Array.Copy(Y, 0, PO, X.Length + 1, Y.Length);
return PO;
}
}
/**
* Multiplies this <code>ECPoint</code> by the given number.
* @param k The multiplicator.
* @return <code>k * this</code>.
*/
public override ECPoint Multiply(
BigInteger k)
{
if (k.SignValue < 0)
throw new ArgumentException("The multiplicator cannot be negative", "k");
if (this.IsInfinity)
return this;
if (k.SignValue == 0)
return Curve.Infinity;
return Curve.GetMultiplier().Multiply(this, k);
}
}
/**
* Elliptic curve points over Fp
*/
public class FpPoint
: 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
*/
public FpPoint(
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
*/
public FpPoint(
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");
}
protected internal override bool CompressionYTilde
{
get { return this.Y.TestBitZero(); }
}
// B.3 pg 62
public override ECPoint Add(
ECPoint b)
{
if (this.IsInfinity)
{
return b;
}
if (b.IsInfinity)
{
return this;
}
if (this == b)
{
return Twice();
}
ECFieldElement X1 = this.X, Y1 = this.Y;
ECFieldElement X2 = b.X, Y2 = b.Y;
ECFieldElement dx = X2.Subtract(X1), dy = Y2.Subtract(Y1);
if (dx.IsZero)
{
if (dy.IsZero)
{
// this == b, i.e. this must be doubled
return Twice();
}
// this == -b, i.e. the result is the point at infinity
return Curve.Infinity;
}
ECFieldElement gamma = dy.Divide(dx);
ECFieldElement X3 = gamma.Square().Subtract(X1).Subtract(X2);
ECFieldElement Y3 = gamma.Multiply(X1.Subtract(X3)).Subtract(Y1);
return new FpPoint(Curve, X3, Y3, IsCompressed);
}
// B.3 pg 62
public override ECPoint Twice()
{
if (this.IsInfinity)
{
return this;
}
ECFieldElement Y1 = this.Y;
if (Y1.IsZero)
{
return Curve.Infinity;
}
ECFieldElement X1 = this.X;
ECFieldElement X1Squared = X1.Square();
ECFieldElement gamma = Three(X1Squared).Add(this.Curve.A).Divide(Two(Y1));
ECFieldElement X3 = gamma.Square().Subtract(Two(X1));
ECFieldElement Y3 = gamma.Multiply(X1.Subtract(X3)).Subtract(Y1);
return new FpPoint(Curve, X3, Y3, 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.Y;
if (Y1.IsZero)
{
return b;
}
ECFieldElement X1 = this.X;
ECFieldElement X2 = b.X, Y2 = b.Y;
ECFieldElement dx = X2.Subtract(X1), dy = Y2.Subtract(Y1);
if (dx.IsZero)
{
if (dy.IsZero)
{
// this == b i.e. the result is 3P
return ThreeTimes();
}
// this == -b, i.e. the result is P
return this;
}
/*
* Optimized calculation of 2P + Q, as described in "Trading Inversions for
* Multiplications in Elliptic Curve Cryptography", by Ciet, Joye, Lauter, Montgomery.
*/
ECFieldElement X = dx.Square(), Y = dy.Square();
ECFieldElement d = X.Multiply(Two(X1).Add(X2)).Subtract(Y);
if (d.IsZero)
{
return Curve.Infinity;
}
ECFieldElement D = d.Multiply(dx);
ECFieldElement I = D.Invert();
ECFieldElement L1 = d.Multiply(I).Multiply(dy);
ECFieldElement L2 = Two(Y1).Multiply(X).Multiply(dx).Multiply(I).Subtract(L1);
ECFieldElement X4 = (L2.Subtract(L1)).Multiply(L1.Add(L2)).Add(X2);
ECFieldElement Y4 = (X1.Subtract(X4)).Multiply(L2).Subtract(Y1);
return new FpPoint(Curve, X4, Y4, IsCompressed);
}
public override ECPoint ThreeTimes()
{
if (IsInfinity || this.Y.IsZero)
{
return this;
}
ECFieldElement X1 = this.X, Y1 = this.Y;
ECFieldElement _2Y1 = Two(Y1);
ECFieldElement X = _2Y1.Square();
ECFieldElement Z = Three(X1.Square()).Add(Curve.A);
ECFieldElement Y = Z.Square();
ECFieldElement d = Three(X1).Multiply(X).Subtract(Y);
if (d.IsZero)
{
return Curve.Infinity;
}
ECFieldElement D = d.Multiply(_2Y1);
ECFieldElement I = D.Invert();
ECFieldElement L1 = d.Multiply(I).Multiply(Z);
ECFieldElement L2 = X.Square().Multiply(I).Subtract(L1);
ECFieldElement X4 = (L2.Subtract(L1)).Multiply(L1.Add(L2)).Add(X1);
ECFieldElement Y4 = (X1.Subtract(X4)).Multiply(L2).Subtract(Y1);
return new FpPoint(Curve, X4, Y4, IsCompressed);
}
protected virtual ECFieldElement Two(ECFieldElement x)
{
return x.Add(x);
}
protected virtual ECFieldElement Three(ECFieldElement x)
{
return Two(x).Add(x);
}
protected virtual ECFieldElement Four(ECFieldElement x)
{
return Two(Two(x));
}
protected virtual ECFieldElement Eight(ECFieldElement x)
{
return Four(Two(x));
}
protected virtual ECFieldElement DoubleProductFromSquares(ECFieldElement a, ECFieldElement b,
ECFieldElement aSquared, ECFieldElement bSquared)
{
/*
* NOTE: If squaring in the field is faster than multiplication, then this is a quicker
* way to calculate 2.A.B, if A^2 and B^2 are already known.
*/
return a.Add(b).Square().Subtract(aSquared).Subtract(bSquared);
}
// D.3.2 pg 102 (see Note:)
public override ECPoint Subtract(
ECPoint b)
{
if (b.IsInfinity)
return this;
// Add -b
return Add(b.Negate());
}
public override ECPoint Negate()
{
if (IsInfinity)
{
return this;
}
ECCurve curve = this.Curve;
//int coord = curve.CoordinateSystem;
//if (ECCurve.COORD_AFFINE != coord)
//{
// return new FpPoint(curve, X, Y.Negate(), this.m_zs, IsCompressed);
//}
return new FpPoint(curve, X, Y.Negate(), IsCompressed);
}
}
/**
* Elliptic curve points over F2m
*/
public class F2mPoint
: ECPointBase
{
/**
* @param curve base curve
* @param x x point
* @param y y point
*/
public F2mPoint(
ECCurve curve,
ECFieldElement x,
ECFieldElement y)
: this(curve, x, y, false)
{
}
/**
* @param curve base curve
* @param x x point
* @param y y point
* @param withCompression true if encode with point compression.
*/
public F2mPoint(
ECCurve curve,
ECFieldElement x,
ECFieldElement y,
bool withCompression)
: base(curve, x, y, withCompression)
{
if ((x != null && y == null) || (x == null && y != null))
{
throw new ArgumentException("Exactly one of the field elements is null");
}
if (x != null)
{
// Check if x and y are elements of the same field
F2mFieldElement.CheckFieldElements(x, y);
// Check if x and a are elements of the same field
F2mFieldElement.CheckFieldElements(x, curve.A);
}
}
/**
* Constructor for point at infinity
*/
[Obsolete("Use ECCurve.Infinity property")]
public F2mPoint(
ECCurve curve)
: this(curve, null, null)
{
}
protected internal override bool CompressionYTilde
{
get
{
// X9.62 4.2.2 and 4.3.6:
// if x = 0 then ypTilde := 0, else ypTilde is the rightmost
// bit of y * x^(-1)
return !this.X.IsZero && this.Y.Divide(this.X).TestBitZero();
}
}
/**
* Check, if two <code>ECPoint</code>s can be added or subtracted.
* @param a The first <code>ECPoint</code> to check.
* @param b The second <code>ECPoint</code> to check.
* @throws IllegalArgumentException if <code>a</code> and <code>b</code>
* cannot be added.
*/
private static void CheckPoints(
ECPoint a,
ECPoint b)
{
// Check, if points are on the same curve
if (!a.Curve.Equals(b.Curve))
throw new ArgumentException("Only points on the same curve can be added or subtracted");
// F2mFieldElement.CheckFieldElements(a.x, b.x);
}
/* (non-Javadoc)
* @see org.bouncycastle.math.ec.ECPoint#add(org.bouncycastle.math.ec.ECPoint)
*/
public override ECPoint Add(ECPoint b)
{
CheckPoints(this, b);
return AddSimple((F2mPoint) b);
}
/**
* Adds another <code>ECPoints.F2m</code> to <code>this</code> without
* checking if both points are on the same curve. Used by multiplication
* algorithms, because there all points are a multiple of the same point
* and hence the checks can be omitted.
* @param b The other <code>ECPoints.F2m</code> to add to
* <code>this</code>.
* @return <code>this + b</code>
*/
internal F2mPoint AddSimple(F2mPoint b)
{
if (this.IsInfinity)
return b;
if (b.IsInfinity)
return this;
F2mFieldElement x2 = (F2mFieldElement) b.X;
F2mFieldElement y2 = (F2mFieldElement) b.Y;
// Check if b == this or b == -this
if (this.X.Equals(x2))
{
// this == b, i.e. this must be doubled
if (this.Y.Equals(y2))
return (F2mPoint) this.Twice();
// this = -other, i.e. the result is the point at infinity
return (F2mPoint) Curve.Infinity;
}
ECFieldElement xSum = this.X.Add(x2);
F2mFieldElement lambda
= (F2mFieldElement)(this.Y.Add(y2)).Divide(xSum);
F2mFieldElement x3
= (F2mFieldElement)lambda.Square().Add(lambda).Add(xSum).Add(Curve.A);
F2mFieldElement y3
= (F2mFieldElement)lambda.Multiply(this.X.Add(x3)).Add(x3).Add(this.Y);
return new F2mPoint(Curve, x3, y3, IsCompressed);
}
/* (non-Javadoc)
* @see org.bouncycastle.math.ec.ECPoint#subtract(org.bouncycastle.math.ec.ECPoint)
*/
public override ECPoint Subtract(
ECPoint b)
{
CheckPoints(this, b);
return SubtractSimple((F2mPoint) b);
}
/**
* Subtracts another <code>ECPoints.F2m</code> from <code>this</code>
* without checking if both points are on the same curve. Used by
* multiplication algorithms, because there all points are a multiple
* of the same point and hence the checks can be omitted.
* @param b The other <code>ECPoints.F2m</code> to subtract from
* <code>this</code>.
* @return <code>this - b</code>
*/
internal F2mPoint SubtractSimple(
F2mPoint b)
{
if (b.IsInfinity)
return this;
// Add -b
return AddSimple((F2mPoint) b.Negate());
}
/* (non-Javadoc)
* @see Org.BouncyCastle.Math.EC.ECPoint#twice()
*/
public override ECPoint Twice()
{
// Twice identity element (point at infinity) is identity
if (this.IsInfinity)
return this;
// if x1 == 0, then (x1, y1) == (x1, x1 + y1)
// and hence this = -this and thus 2(x1, y1) == infinity
if (this.X.IsZero)
{
return Curve.Infinity;
}
F2mFieldElement lambda = (F2mFieldElement) this.X.Add(this.Y.Divide(this.X));
F2mFieldElement x2 = (F2mFieldElement)lambda.Square().Add(lambda).Add(Curve.A);
ECFieldElement ONE = Curve.FromBigInteger(BigInteger.One);
F2mFieldElement y2 = (F2mFieldElement)this.X.Square().Add(
x2.Multiply(lambda.Add(ONE)));
return new F2mPoint(Curve, x2, y2, IsCompressed);
}
public override ECPoint Negate()
{
if (IsInfinity)
{
return this;
}
ECFieldElement X1 = this.X;
if (X1.IsZero)
{
return this;
}
return new F2mPoint(Curve, X1, X1.Add(this.Y), IsCompressed);
}
}
}
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