org.bouncycastle.pqc.math.ntru.Polynomial Maven / Gradle / Ivy
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package org.bouncycastle.pqc.math.ntru;
import org.bouncycastle.pqc.math.ntru.parameters.NTRUParameterSet;
/**
* Polynomial for {@link org.bouncycastle.pqc.crypto.ntru}.
*/
public abstract class Polynomial
{
/**
* An array of coefficients
*/
// TODO: maybe the maths library needs to move.
public short[] coeffs;
protected NTRUParameterSet params;
public Polynomial(NTRUParameterSet params)
{
this.coeffs = new short[params.n()];
this.params = params;
}
/**
* @param x
* @param y
* @return -1 if x<0 and y<0; otherwise return 0
*
* theory: if x and y are negative, MSB is 1. shifting right by 15 bits will produce 0xffff
*/
// defined in poly_r2_inv.c and poly_s3_inv.c. both functions are identical
static short bothNegativeMask(short x, short y)
{
return (short)((x & y) >>> 15);
}
// defined in poly_mod.c
static short mod3(short a)
{
return (short)((a & 0xffff) % 3);
}
// defined in poly_s3_inv.c
static byte mod3(byte a)
{
return (byte)((a & 0xff) % 3);
}
// defined in poly.h
static int modQ(int x, int q)
{
return x % q;
}
// Defined in poly_mod.c
public void mod3PhiN()
{
int n = this.params.n();
for (int i = 0; i < n; i++)
{
this.coeffs[i] = mod3((short)(this.coeffs[i] + 2 * this.coeffs[n - 1]));
}
}
// Defined in poly_mod.c
public void modQPhiN()
{
int n = this.params.n();
for (int i = 0; i < n; i++)
{
this.coeffs[i] = (short)(this.coeffs[i] - this.coeffs[n - 1]);
}
}
/**
* Pack Sq polynomial as a byte array
*
* @param len array length of packed polynomial
* @return
* @see NTRU specification section 1.8.5
*/
// defined in packq.c
public abstract byte[] sqToBytes(int len);
/**
* Unpack a Sq polynomial
*
* @param a byte array of packed polynomial
* @see NTRU specification section 1.8.6
*/
// defined in packq.c
public abstract void sqFromBytes(byte[] a);
/**
* Pack a Rq0 polynomial as a byte array
*
* @param len array length of packed polynomial
* @return
* @see NTRU specification section 1.8.3
*/
// defined in packq.c
public byte[] rqSumZeroToBytes(int len)
{
return this.sqToBytes(len);
}
/**
* Unpack a Rq0 polynomial
*
* @param a byte array of packed polynomial
* @see NTRU specification section 1.8.4
*/
// defined in packq.c
public void rqSumZeroFromBytes(byte[] a)
{
int n = this.coeffs.length;
this.sqFromBytes(a);
this.coeffs[n - 1] = 0;
for (int i = 0; i < params.packDegree(); i++)
{
this.coeffs[n - 1] -= this.coeffs[i];
}
}
/**
* Pack an S3 polynomial as a byte array
*
* @param messageSize array length of packed polynomial
* @return
* @see NTRU specification section 1.8.7
*/
// defined in pack3.c
public byte[] s3ToBytes(int messageSize)
{
byte[] msg = new byte[messageSize];
byte c;
for (int i = 0; i < params.packDegree() / 5; i++)
{
c = (byte)(this.coeffs[5 * i + 4] & 255);
c = (byte)(3 * c + this.coeffs[5 * i + 3] & 255);
c = (byte)(3 * c + this.coeffs[5 * i + 2] & 255);
c = (byte)(3 * c + this.coeffs[5 * i + 1] & 255);
c = (byte)(3 * c + this.coeffs[5 * i + 0] & 255);
msg[i] = c;
}
// if 5 does not divide NTRU_N-1
if (params.packDegree() > (params.packDegree() / 5) * 5)
{
int i = params.packDegree() / 5;
c = 0;
for (int j = params.packDegree() - (5 * i) - 1; j >= 0; j--)
{
c = (byte)(3 * c + this.coeffs[5 * i + j] & 255);
}
msg[i] = c;
}
return msg;
}
/**
* Unpack a S3 polynomial
*
* @param msg byte array of packed polynomial
* @see NTRU specification section 1.8.8
*/
// defined in pack3.c
public void s3FromBytes(byte[] msg)
{
int n = this.coeffs.length;
byte c;
for (int i = 0; i < params.packDegree() / 5; i++)
{
c = msg[i];
this.coeffs[5 * i + 0] = c;
this.coeffs[5 * i + 1] = (short)((c & 0xff) * 171 >>> 9); // this is division by 3
this.coeffs[5 * i + 2] = (short)((c & 0xff) * 57 >>> 9); // division by 3^2
this.coeffs[5 * i + 3] = (short)((c & 0xff) * 19 >>> 9); // division by 3^3
this.coeffs[5 * i + 4] = (short)((c & 0xff) * 203 >>> 14); // etc.
}
if (params.packDegree() > (params.packDegree() / 5) * 5)
{
int i = params.packDegree() / 5;
c = msg[i];
for (int j = 0; (5 * i + j) < params.packDegree(); j++)
{
this.coeffs[5 * i + j] = c;
c = (byte)((c & 0xff) * 171 >> 9);
}
}
this.coeffs[n - 1] = 0;
this.mod3PhiN();
}
// defined in poly.c
public void sqMul(Polynomial a, Polynomial b)
{
this.rqMul(a, b);
this.modQPhiN();
}
// defined in poly_rq_mul.c
public void rqMul(Polynomial a, Polynomial b)
{
int n = this.coeffs.length;
int k, i;
for (k = 0; k < n; k++)
{
this.coeffs[k] = 0;
for (i = 1; i < n - k; i++)
{
this.coeffs[k] += a.coeffs[k + i] * b.coeffs[n - i];
}
for (i = 0; i < k + 1; i++)
{
this.coeffs[k] += a.coeffs[k - i] * b.coeffs[i];
}
}
}
// defined in poly.c
public void s3Mul(Polynomial a, Polynomial b)
{
this.rqMul(a, b);
this.mod3PhiN();
}
/**
* @param a
* @see NTRU specification section 1.9.3
*/
// defined in poly_lift.c
public abstract void lift(Polynomial a);
// defined in poly_mod.c
public void rqToS3(Polynomial a)
{
int n = this.coeffs.length;
short flag;
for (int i = 0; i < n; i++)
{
this.coeffs[i] = (short)modQ(a.coeffs[i] & 0xffff, params.q());
flag = (short)(this.coeffs[i] >>> params.logQ() - 1);
this.coeffs[i] += flag << (1 - (params.logQ() & 1));
}
this.mod3PhiN();
}
// defined in poly_r2_inv.c
public abstract void r2Inv(Polynomial a);
void r2Inv(Polynomial a, Polynomial f, Polynomial g, Polynomial v, Polynomial w)
{
int n = this.coeffs.length;
int i, loop;
short delta, sign, swap, t;
w.coeffs[0] = 1;
for (i = 0; i < n; ++i)
{
f.coeffs[i] = 1;
}
for (i = 0; i < n - 1; ++i)
{
g.coeffs[n - 2 - i] = (short)((a.coeffs[i] ^ a.coeffs[n - 1]) & 1);
}
g.coeffs[n - 1] = 0;
delta = 1;
for (loop = 0; loop < 2 * (n - 1) - 1; ++loop)
{
for (i = n - 1; i > 0; --i)
{
v.coeffs[i] = v.coeffs[i - 1];
}
v.coeffs[0] = 0;
sign = (short)(g.coeffs[0] & f.coeffs[0]);
swap = bothNegativeMask((short)-delta, (short)-g.coeffs[0]);
delta ^= swap & (delta ^ -delta);
delta++;
for (i = 0; i < n; ++i)
{
t = (short)(swap & (f.coeffs[i] ^ g.coeffs[i]));
f.coeffs[i] ^= t;
g.coeffs[i] ^= t;
t = (short)(swap & (v.coeffs[i] ^ w.coeffs[i]));
v.coeffs[i] ^= t;
w.coeffs[i] ^= t;
}
for (i = 0; i < n; ++i)
{
g.coeffs[i] = (short)(g.coeffs[i] ^ (sign & f.coeffs[i]));
}
for (i = 0; i < n; ++i)
{
w.coeffs[i] = (short)(w.coeffs[i] ^ (sign & v.coeffs[i]));
}
for (i = 0; i < n - 1; ++i)
{
g.coeffs[i] = g.coeffs[i + 1];
}
g.coeffs[n - 1] = 0;
}
for (i = 0; i < n - 1; ++i)
{
this.coeffs[i] = v.coeffs[n - 2 - i];
}
this.coeffs[n - 1] = 0;
}
// defined in poly.c
public abstract void rqInv(Polynomial a);
void rqInv(Polynomial a, Polynomial ai2, Polynomial b, Polynomial c, Polynomial s)
{
ai2.r2Inv(a);
this.r2InvToRqInv(ai2, a, b, c, s);
}
// defined in poly.c
private void r2InvToRqInv(Polynomial ai, Polynomial a, Polynomial b, Polynomial c, Polynomial s)
{
int n = this.coeffs.length;
int i;
for (i = 0; i < n; i++)
{
b.coeffs[i] = (short)-a.coeffs[i];
}
for (i = 0; i < n; i++)
{
this.coeffs[i] = ai.coeffs[i];
}
c.rqMul(this, b);
c.coeffs[0] += 2;
s.rqMul(c, this);
c.rqMul(s, b);
c.coeffs[0] += 2;
this.rqMul(c, s);
c.rqMul(this, b);
c.coeffs[0] += 2;
s.rqMul(c, this);
c.rqMul(s, b);
c.coeffs[0] += 2;
this.rqMul(c, s);
}
// defined in poly_s3_inv.c
public abstract void s3Inv(Polynomial a);
void s3Inv(Polynomial a, Polynomial f, Polynomial g, Polynomial v, Polynomial w)
{
int n = this.coeffs.length;
int i, loop;
short delta, sign, swap, t;
w.coeffs[0] = 1;
for (i = 0; i < n; ++i)
{
f.coeffs[i] = 1;
}
for (i = 0; i < n - 1; ++i)
{
g.coeffs[n - 2 - i] = mod3((short)((a.coeffs[i] & 3) + 2 * (a.coeffs[n - 1] & 3)));
}
g.coeffs[n - 1] = 0;
delta = 1;
for (loop = 0; loop < 2 * (n - 1) - 1; ++loop)
{
for (i = n - 1; i > 0; --i)
{
v.coeffs[i] = v.coeffs[i - 1];
}
v.coeffs[0] = 0;
sign = mod3((byte)(2 * g.coeffs[0] * f.coeffs[0]));
swap = bothNegativeMask((short)-delta, (short)-g.coeffs[0]);
delta ^= swap & (delta ^ -delta);
delta++;
for (i = 0; i < n; ++i)
{
t = (short)(swap & (f.coeffs[i] ^ g.coeffs[i]));
f.coeffs[i] ^= t;
g.coeffs[i] ^= t;
t = (short)(swap & (v.coeffs[i] ^ w.coeffs[i]));
v.coeffs[i] ^= t;
w.coeffs[i] ^= t;
}
for (i = 0; i < n; ++i)
{
g.coeffs[i] = mod3((byte)(g.coeffs[i] + sign * f.coeffs[i]));
}
for (i = 0; i < n; ++i)
{
w.coeffs[i] = mod3((byte)(w.coeffs[i] + sign * v.coeffs[i]));
}
for (i = 0; i < n - 1; ++i)
{
g.coeffs[i] = g.coeffs[i + 1];
}
g.coeffs[n - 1] = 0;
}
sign = f.coeffs[0];
for (i = 0; i < n - 1; ++i)
{
this.coeffs[i] = mod3((byte)(sign * v.coeffs[n - 2 - i]));
}
this.coeffs[n - 1] = 0;
}
public void z3ToZq()
{
int n = this.coeffs.length;
for (int i = 0; i < n; i++)
{
this.coeffs[i] = (short)(this.coeffs[i] | ((-(this.coeffs[i] >>> 1)) & (params.q() - 1)));
}
}
public void trinaryZqToZ3()
{
int n = this.coeffs.length;
for (int i = 0; i < n; i++)
{
this.coeffs[i] = (short)modQ(this.coeffs[i] & 0xffff, params.q());
this.coeffs[i] = (short)(3 & (this.coeffs[i] ^ (this.coeffs[i] >>> (params.logQ() - 1))));
}
}
}