ext-cryptopp/polynomi.cpp
Jeffrey Walton 81b1a18063
Change file preamble to include "originally written by Wei Dai"
We have made a fair number of changes, and we don't want WD to receive credit for issues he was not part of
2017-01-27 07:05:45 -05:00

578 lines
14 KiB
C++

// polynomi.cpp - originally written and placed in the public domain by Wei Dai
// Part of the code for polynomial evaluation and interpolation
// originally came from Hal Finney's public domain secsplit.c.
#include "pch.h"
#include "polynomi.h"
#include "secblock.h"
#include <sstream>
#include <iostream>
NAMESPACE_BEGIN(CryptoPP)
template <class T>
void PolynomialOver<T>::Randomize(RandomNumberGenerator &rng, const RandomizationParameter &parameter, const Ring &ring)
{
m_coefficients.resize(parameter.m_coefficientCount);
for (unsigned int i=0; i<m_coefficients.size(); ++i)
m_coefficients[i] = ring.RandomElement(rng, parameter.m_coefficientParameter);
}
template <class T>
void PolynomialOver<T>::FromStr(const char *str, const Ring &ring)
{
std::istringstream in((char *)str);
bool positive = true;
CoefficientType coef;
unsigned int power;
while (in)
{
std::ws(in);
if (in.peek() == 'x')
coef = ring.MultiplicativeIdentity();
else
in >> coef;
std::ws(in);
if (in.peek() == 'x')
{
in.get();
std::ws(in);
if (in.peek() == '^')
{
in.get();
in >> power;
}
else
power = 1;
}
else
power = 0;
if (!positive)
coef = ring.Inverse(coef);
SetCoefficient(power, coef, ring);
std::ws(in);
switch (in.get())
{
case '+':
positive = true;
break;
case '-':
positive = false;
break;
default:
return; // something's wrong with the input string
}
}
}
template <class T>
unsigned int PolynomialOver<T>::CoefficientCount(const Ring &ring) const
{
unsigned count = m_coefficients.size();
while (count && ring.Equal(m_coefficients[count-1], ring.Identity()))
count--;
const_cast<std::vector<CoefficientType> &>(m_coefficients).resize(count);
return count;
}
template <class T>
typename PolynomialOver<T>::CoefficientType PolynomialOver<T>::GetCoefficient(unsigned int i, const Ring &ring) const
{
return (i < m_coefficients.size()) ? m_coefficients[i] : ring.Identity();
}
template <class T>
PolynomialOver<T>& PolynomialOver<T>::operator=(const PolynomialOver<T>& t)
{
if (this != &t)
{
m_coefficients.resize(t.m_coefficients.size());
for (unsigned int i=0; i<m_coefficients.size(); i++)
m_coefficients[i] = t.m_coefficients[i];
}
return *this;
}
template <class T>
PolynomialOver<T>& PolynomialOver<T>::Accumulate(const PolynomialOver<T>& t, const Ring &ring)
{
unsigned int count = t.CoefficientCount(ring);
if (count > CoefficientCount(ring))
m_coefficients.resize(count, ring.Identity());
for (unsigned int i=0; i<count; i++)
ring.Accumulate(m_coefficients[i], t.GetCoefficient(i, ring));
return *this;
}
template <class T>
PolynomialOver<T>& PolynomialOver<T>::Reduce(const PolynomialOver<T>& t, const Ring &ring)
{
unsigned int count = t.CoefficientCount(ring);
if (count > CoefficientCount(ring))
m_coefficients.resize(count, ring.Identity());
for (unsigned int i=0; i<count; i++)
ring.Reduce(m_coefficients[i], t.GetCoefficient(i, ring));
return *this;
}
template <class T>
typename PolynomialOver<T>::CoefficientType PolynomialOver<T>::EvaluateAt(const CoefficientType &x, const Ring &ring) const
{
int degree = Degree(ring);
if (degree < 0)
return ring.Identity();
CoefficientType result = m_coefficients[degree];
for (int j=degree-1; j>=0; j--)
{
result = ring.Multiply(result, x);
ring.Accumulate(result, m_coefficients[j]);
}
return result;
}
template <class T>
PolynomialOver<T>& PolynomialOver<T>::ShiftLeft(unsigned int n, const Ring &ring)
{
unsigned int i = CoefficientCount(ring) + n;
m_coefficients.resize(i, ring.Identity());
while (i > n)
{
i--;
m_coefficients[i] = m_coefficients[i-n];
}
while (i)
{
i--;
m_coefficients[i] = ring.Identity();
}
return *this;
}
template <class T>
PolynomialOver<T>& PolynomialOver<T>::ShiftRight(unsigned int n, const Ring &ring)
{
unsigned int count = CoefficientCount(ring);
if (count > n)
{
for (unsigned int i=0; i<count-n; i++)
m_coefficients[i] = m_coefficients[i+n];
m_coefficients.resize(count-n, ring.Identity());
}
else
m_coefficients.resize(0, ring.Identity());
return *this;
}
template <class T>
void PolynomialOver<T>::SetCoefficient(unsigned int i, const CoefficientType &value, const Ring &ring)
{
if (i >= m_coefficients.size())
m_coefficients.resize(i+1, ring.Identity());
m_coefficients[i] = value;
}
template <class T>
void PolynomialOver<T>::Negate(const Ring &ring)
{
unsigned int count = CoefficientCount(ring);
for (unsigned int i=0; i<count; i++)
m_coefficients[i] = ring.Inverse(m_coefficients[i]);
}
template <class T>
void PolynomialOver<T>::swap(PolynomialOver<T> &t)
{
m_coefficients.swap(t.m_coefficients);
}
template <class T>
bool PolynomialOver<T>::Equals(const PolynomialOver<T>& t, const Ring &ring) const
{
unsigned int count = CoefficientCount(ring);
if (count != t.CoefficientCount(ring))
return false;
for (unsigned int i=0; i<count; i++)
if (!ring.Equal(m_coefficients[i], t.m_coefficients[i]))
return false;
return true;
}
template <class T>
PolynomialOver<T> PolynomialOver<T>::Plus(const PolynomialOver<T>& t, const Ring &ring) const
{
unsigned int i;
unsigned int count = CoefficientCount(ring);
unsigned int tCount = t.CoefficientCount(ring);
if (count > tCount)
{
PolynomialOver<T> result(ring, count);
for (i=0; i<tCount; i++)
result.m_coefficients[i] = ring.Add(m_coefficients[i], t.m_coefficients[i]);
for (; i<count; i++)
result.m_coefficients[i] = m_coefficients[i];
return result;
}
else
{
PolynomialOver<T> result(ring, tCount);
for (i=0; i<count; i++)
result.m_coefficients[i] = ring.Add(m_coefficients[i], t.m_coefficients[i]);
for (; i<tCount; i++)
result.m_coefficients[i] = t.m_coefficients[i];
return result;
}
}
template <class T>
PolynomialOver<T> PolynomialOver<T>::Minus(const PolynomialOver<T>& t, const Ring &ring) const
{
unsigned int i;
unsigned int count = CoefficientCount(ring);
unsigned int tCount = t.CoefficientCount(ring);
if (count > tCount)
{
PolynomialOver<T> result(ring, count);
for (i=0; i<tCount; i++)
result.m_coefficients[i] = ring.Subtract(m_coefficients[i], t.m_coefficients[i]);
for (; i<count; i++)
result.m_coefficients[i] = m_coefficients[i];
return result;
}
else
{
PolynomialOver<T> result(ring, tCount);
for (i=0; i<count; i++)
result.m_coefficients[i] = ring.Subtract(m_coefficients[i], t.m_coefficients[i]);
for (; i<tCount; i++)
result.m_coefficients[i] = ring.Inverse(t.m_coefficients[i]);
return result;
}
}
template <class T>
PolynomialOver<T> PolynomialOver<T>::Inverse(const Ring &ring) const
{
unsigned int count = CoefficientCount(ring);
PolynomialOver<T> result(ring, count);
for (unsigned int i=0; i<count; i++)
result.m_coefficients[i] = ring.Inverse(m_coefficients[i]);
return result;
}
template <class T>
PolynomialOver<T> PolynomialOver<T>::Times(const PolynomialOver<T>& t, const Ring &ring) const
{
if (IsZero(ring) || t.IsZero(ring))
return PolynomialOver<T>();
unsigned int count1 = CoefficientCount(ring), count2 = t.CoefficientCount(ring);
PolynomialOver<T> result(ring, count1 + count2 - 1);
for (unsigned int i=0; i<count1; i++)
for (unsigned int j=0; j<count2; j++)
ring.Accumulate(result.m_coefficients[i+j], ring.Multiply(m_coefficients[i], t.m_coefficients[j]));
return result;
}
template <class T>
PolynomialOver<T> PolynomialOver<T>::DividedBy(const PolynomialOver<T>& t, const Ring &ring) const
{
PolynomialOver<T> remainder, quotient;
Divide(remainder, quotient, *this, t, ring);
return quotient;
}
template <class T>
PolynomialOver<T> PolynomialOver<T>::Modulo(const PolynomialOver<T>& t, const Ring &ring) const
{
PolynomialOver<T> remainder, quotient;
Divide(remainder, quotient, *this, t, ring);
return remainder;
}
template <class T>
PolynomialOver<T> PolynomialOver<T>::MultiplicativeInverse(const Ring &ring) const
{
return Degree(ring)==0 ? ring.MultiplicativeInverse(m_coefficients[0]) : ring.Identity();
}
template <class T>
bool PolynomialOver<T>::IsUnit(const Ring &ring) const
{
return Degree(ring)==0 && ring.IsUnit(m_coefficients[0]);
}
template <class T>
std::istream& PolynomialOver<T>::Input(std::istream &in, const Ring &ring)
{
char c;
unsigned int length = 0;
SecBlock<char> str(length + 16);
bool paren = false;
std::ws(in);
if (in.peek() == '(')
{
paren = true;
in.get();
}
do
{
in.read(&c, 1);
str[length++] = c;
if (length >= str.size())
str.Grow(length + 16);
}
// if we started with a left paren, then read until we find a right paren,
// otherwise read until the end of the line
while (in && ((paren && c != ')') || (!paren && c != '\n')));
str[length-1] = '\0';
*this = PolynomialOver<T>(str, ring);
return in;
}
template <class T>
std::ostream& PolynomialOver<T>::Output(std::ostream &out, const Ring &ring) const
{
unsigned int i = CoefficientCount(ring);
if (i)
{
bool firstTerm = true;
while (i--)
{
if (m_coefficients[i] != ring.Identity())
{
if (firstTerm)
{
firstTerm = false;
if (!i || !ring.Equal(m_coefficients[i], ring.MultiplicativeIdentity()))
out << m_coefficients[i];
}
else
{
CoefficientType inverse = ring.Inverse(m_coefficients[i]);
std::ostringstream pstr, nstr;
pstr << m_coefficients[i];
nstr << inverse;
if (pstr.str().size() <= nstr.str().size())
{
out << " + ";
if (!i || !ring.Equal(m_coefficients[i], ring.MultiplicativeIdentity()))
out << m_coefficients[i];
}
else
{
out << " - ";
if (!i || !ring.Equal(inverse, ring.MultiplicativeIdentity()))
out << inverse;
}
}
switch (i)
{
case 0:
break;
case 1:
out << "x";
break;
default:
out << "x^" << i;
}
}
}
}
else
{
out << ring.Identity();
}
return out;
}
template <class T>
void PolynomialOver<T>::Divide(PolynomialOver<T> &r, PolynomialOver<T> &q, const PolynomialOver<T> &a, const PolynomialOver<T> &d, const Ring &ring)
{
unsigned int i = a.CoefficientCount(ring);
const int dDegree = d.Degree(ring);
if (dDegree < 0)
throw DivideByZero();
r = a;
q.m_coefficients.resize(STDMAX(0, int(i - dDegree)));
while (i > (unsigned int)dDegree)
{
--i;
q.m_coefficients[i-dDegree] = ring.Divide(r.m_coefficients[i], d.m_coefficients[dDegree]);
for (int j=0; j<=dDegree; j++)
ring.Reduce(r.m_coefficients[i-dDegree+j], ring.Multiply(q.m_coefficients[i-dDegree], d.m_coefficients[j]));
}
r.CoefficientCount(ring); // resize r.m_coefficients
}
// ********************************************************
// helper function for Interpolate() and InterpolateAt()
template <class T>
void RingOfPolynomialsOver<T>::CalculateAlpha(std::vector<CoefficientType> &alpha, const CoefficientType x[], const CoefficientType y[], unsigned int n) const
{
for (unsigned int j=0; j<n; ++j)
alpha[j] = y[j];
for (unsigned int k=1; k<n; ++k)
{
for (unsigned int j=n-1; j>=k; --j)
{
m_ring.Reduce(alpha[j], alpha[j-1]);
CoefficientType d = m_ring.Subtract(x[j], x[j-k]);
if (!m_ring.IsUnit(d))
throw InterpolationFailed();
alpha[j] = m_ring.Divide(alpha[j], d);
}
}
}
template <class T>
typename RingOfPolynomialsOver<T>::Element RingOfPolynomialsOver<T>::Interpolate(const CoefficientType x[], const CoefficientType y[], unsigned int n) const
{
CRYPTOPP_ASSERT(n > 0);
std::vector<CoefficientType> alpha(n);
CalculateAlpha(alpha, x, y, n);
std::vector<CoefficientType> coefficients((size_t)n, m_ring.Identity());
coefficients[0] = alpha[n-1];
for (int j=n-2; j>=0; --j)
{
for (unsigned int i=n-j-1; i>0; i--)
coefficients[i] = m_ring.Subtract(coefficients[i-1], m_ring.Multiply(coefficients[i], x[j]));
coefficients[0] = m_ring.Subtract(alpha[j], m_ring.Multiply(coefficients[0], x[j]));
}
return PolynomialOver<T>(coefficients.begin(), coefficients.end());
}
template <class T>
typename RingOfPolynomialsOver<T>::CoefficientType RingOfPolynomialsOver<T>::InterpolateAt(const CoefficientType &position, const CoefficientType x[], const CoefficientType y[], unsigned int n) const
{
CRYPTOPP_ASSERT(n > 0);
std::vector<CoefficientType> alpha(n);
CalculateAlpha(alpha, x, y, n);
CoefficientType result = alpha[n-1];
for (int j=n-2; j>=0; --j)
{
result = m_ring.Multiply(result, m_ring.Subtract(position, x[j]));
m_ring.Accumulate(result, alpha[j]);
}
return result;
}
template <class Ring, class Element>
void PrepareBulkPolynomialInterpolation(const Ring &ring, Element *w, const Element x[], unsigned int n)
{
for (unsigned int i=0; i<n; i++)
{
Element t = ring.MultiplicativeIdentity();
for (unsigned int j=0; j<n; j++)
if (i != j)
t = ring.Multiply(t, ring.Subtract(x[i], x[j]));
w[i] = ring.MultiplicativeInverse(t);
}
}
template <class Ring, class Element>
void PrepareBulkPolynomialInterpolationAt(const Ring &ring, Element *v, const Element &position, const Element x[], const Element w[], unsigned int n)
{
CRYPTOPP_ASSERT(n > 0);
std::vector<Element> a(2*n-1);
unsigned int i;
for (i=0; i<n; i++)
a[n-1+i] = ring.Subtract(position, x[i]);
for (i=n-1; i>1; i--)
a[i-1] = ring.Multiply(a[2*i], a[2*i-1]);
a[0] = ring.MultiplicativeIdentity();
for (i=0; i<n-1; i++)
{
std::swap(a[2*i+1], a[2*i+2]);
a[2*i+1] = ring.Multiply(a[i], a[2*i+1]);
a[2*i+2] = ring.Multiply(a[i], a[2*i+2]);
}
for (i=0; i<n; i++)
v[i] = ring.Multiply(a[n-1+i], w[i]);
}
template <class Ring, class Element>
Element BulkPolynomialInterpolateAt(const Ring &ring, const Element y[], const Element v[], unsigned int n)
{
Element result = ring.Identity();
for (unsigned int i=0; i<n; i++)
ring.Accumulate(result, ring.Multiply(y[i], v[i]));
return result;
}
// ********************************************************
template <class T, int instance>
const PolynomialOverFixedRing<T, instance> &PolynomialOverFixedRing<T, instance>::Zero()
{
return Singleton<ThisType>().Ref();
}
template <class T, int instance>
const PolynomialOverFixedRing<T, instance> &PolynomialOverFixedRing<T, instance>::One()
{
return Singleton<ThisType, NewOnePolynomial>().Ref();
}
NAMESPACE_END