public BigInteger ModPow(
BigInteger exponent,
BigInteger m) {
if (m.sign < 1)
throw new ArithmeticException("Modulus must be positive");
if (m.Equals(One))
return Zero;
if (exponent.sign == 0)
return One;
if (sign == 0)
return Zero;
int[] zVal = null;
int[] yAccum = null;
int[] yVal;
// Montgomery exponentiation is only possible if the modulus is odd,
// but AFAIK, this is always the case for crypto algo's
bool useMonty = ((m.magnitude[m.magnitude.Length - 1] & 1) == 1);
long mQ = 0;
if (useMonty) {
mQ = m.GetMQuote();
// tmp = this * R mod m
BigInteger tmp = ShiftLeft(32 * m.magnitude.Length).Mod(m);
zVal = tmp.magnitude;
useMonty = (zVal.Length <= m.magnitude.Length);
if (useMonty) {
yAccum = new int[m.magnitude.Length + 1];
if (zVal.Length < m.magnitude.Length) {
int[] longZ = new int[m.magnitude.Length];
zVal.CopyTo(longZ, longZ.Length - zVal.Length);
zVal = longZ;
}
}
}
if (!useMonty) {
if (magnitude.Length <= m.magnitude.Length) {
//zAccum = new int[m.magnitude.Length * 2];
zVal = new int[m.magnitude.Length];
magnitude.CopyTo(zVal, zVal.Length - magnitude.Length);
}
else {
//
// in normal practice we'll never see this...
//
BigInteger tmp = Remainder(m);
//zAccum = new int[m.magnitude.Length * 2];
zVal = new int[m.magnitude.Length];
tmp.magnitude.CopyTo(zVal, zVal.Length - tmp.magnitude.Length);
}
yAccum = new int[m.magnitude.Length * 2];
}
yVal = new int[m.magnitude.Length];
//
// from LSW to MSW
//
for (int i = 0; i < exponent.magnitude.Length; i++) {
int v = exponent.magnitude[i];
int bits = 0;
if (i == 0) {
while (v > 0) {
v <<= 1;
bits++;
}
//
// first time in initialise y
//
zVal.CopyTo(yVal, 0);
v <<= 1;
bits++;
}
while (v != 0) {
if (useMonty) {
// Montgomery square algo doesn't exist, and a normal
// square followed by a Montgomery reduction proved to
// be almost as heavy as a Montgomery mulitply.
MultiplyMonty(yAccum, yVal, yVal, m.magnitude, mQ);
}
else {
Square(yAccum, yVal);
Remainder(yAccum, m.magnitude);
Array.Copy(yAccum, yAccum.Length - yVal.Length, yVal, 0, yVal.Length);
ZeroOut(yAccum);
}
bits++;
if (v < 0) {
if (useMonty) {
MultiplyMonty(yAccum, yVal, zVal, m.magnitude, mQ);
}
else {
Multiply(yAccum, yVal, zVal);
Remainder(yAccum, m.magnitude);
Array.Copy(yAccum, yAccum.Length - yVal.Length, yVal, 0,
yVal.Length);
ZeroOut(yAccum);
}
}
v <<= 1;
}
while (bits < 32) {
if (useMonty) {
MultiplyMonty(yAccum, yVal, yVal, m.magnitude, mQ);
}
else {
Square(yAccum, yVal);
Remainder(yAccum, m.magnitude);
Array.Copy(yAccum, yAccum.Length - yVal.Length, yVal, 0, yVal.Length);
ZeroOut(yAccum);
}
bits++;
}
}
if (useMonty) {
// Return y * R^(-1) mod m by doing y * 1 * R^(-1) mod m
ZeroOut(zVal);
zVal[zVal.Length - 1] = 1;
MultiplyMonty(yAccum, yVal, zVal, m.magnitude, mQ);
}
BigInteger result = new BigInteger(1, yVal, true);
return exponent.sign > 0
? result
: result.ModInverse(m);
}
