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package org.spongycastle.math.ec;

import java.math.BigInteger;
import java.util.Random;

public abstract class ECFieldElement
    implements ECConstants
{

    public abstract BigInteger     toBigInteger();
    public abstract String         getFieldName();
    public abstract int            getFieldSize();
    public abstract ECFieldElement add(ECFieldElement b);
    public abstract ECFieldElement subtract(ECFieldElement b);
    public abstract ECFieldElement multiply(ECFieldElement b);
    public abstract ECFieldElement divide(ECFieldElement b);
    public abstract ECFieldElement negate();
    public abstract ECFieldElement square();
    public abstract ECFieldElement invert();
    public abstract ECFieldElement sqrt();

    public String toString()
    {
        return this.toBigInteger().toString(2);
    }

    public static class Fp extends ECFieldElement
    {
        BigInteger x;

        BigInteger q;
        
        public Fp(BigInteger q, BigInteger x)
        {
            this.x = x;
            
            if (x.compareTo(q) >= 0)
            {
                throw new IllegalArgumentException("x value too large in field element");
            }

            this.q = q;
        }

        public BigInteger toBigInteger()
        {
            return x;
        }

        /**
         * return the field name for this field.
         *
         * @return the string "Fp".
         */
        public String getFieldName()
        {
            return "Fp";
        }

        public int getFieldSize()
        {
            return q.bitLength();
        }

        public BigInteger getQ()
        {
            return q;
        }
        
        public ECFieldElement add(ECFieldElement b)
        {
            return new Fp(q, x.add(b.toBigInteger()).mod(q));
        }

        public ECFieldElement subtract(ECFieldElement b)
        {
            return new Fp(q, x.subtract(b.toBigInteger()).mod(q));
        }

        public ECFieldElement multiply(ECFieldElement b)
        {
            return new Fp(q, x.multiply(b.toBigInteger()).mod(q));
        }

        public ECFieldElement divide(ECFieldElement b)
        {
            return new Fp(q, x.multiply(b.toBigInteger().modInverse(q)).mod(q));
        }

        public ECFieldElement negate()
        {
            return new Fp(q, x.negate().mod(q));
        }

        public ECFieldElement square()
        {
            return new Fp(q, x.multiply(x).mod(q));
        }

        public ECFieldElement invert()
        {
            return new Fp(q, x.modInverse(q));
        }

        // D.1.4 91
        /**
         * return a sqrt root - the routine verifies that the calculation
         * returns the right value - if none exists it returns null.
         */
        public ECFieldElement sqrt()
        {
            if (!q.testBit(0))
            {
                throw new RuntimeException("not done yet");
            }

            // note: even though this class implements ECConstants don't be tempted to
            // remove the explicit declaration, some J2ME environments don't cope.
            // p mod 4 == 3
            if (q.testBit(1))
            {
                // z = g^(u+1) + p, p = 4u + 3
                ECFieldElement z = new Fp(q, x.modPow(q.shiftRight(2).add(ECConstants.ONE), q));

                return z.square().equals(this) ? z : null;
            }

            // p mod 4 == 1
            BigInteger qMinusOne = q.subtract(ECConstants.ONE);

            BigInteger legendreExponent = qMinusOne.shiftRight(1);
            if (!(x.modPow(legendreExponent, q).equals(ECConstants.ONE)))
            {
                return null;
            }

            BigInteger u = qMinusOne.shiftRight(2);
            BigInteger k = u.shiftLeft(1).add(ECConstants.ONE);

            BigInteger Q = this.x;
            BigInteger fourQ = Q.shiftLeft(2).mod(q);

            BigInteger U, V;
            Random rand = new Random();
            do
            {
                BigInteger P;
                do
                {
                    P = new BigInteger(q.bitLength(), rand);
                }
                while (P.compareTo(q) >= 0
                    || !(P.multiply(P).subtract(fourQ).modPow(legendreExponent, q).equals(qMinusOne)));

                BigInteger[] result = lucasSequence(q, P, Q, k);
                U = result[0];
                V = result[1];

                if (V.multiply(V).mod(q).equals(fourQ))
                {
                    // Integer division by 2, mod q
                    if (V.testBit(0))
                    {
                        V = V.add(q);
                    }

                    V = V.shiftRight(1);

                    //assert V.multiply(V).mod(q).equals(x);

                    return new ECFieldElement.Fp(q, V);
                }
            }
            while (U.equals(ECConstants.ONE) || U.equals(qMinusOne));

            return null;

//            BigInteger qMinusOne = q.subtract(ECConstants.ONE);
//            BigInteger legendreExponent = qMinusOne.shiftRight(1); //divide(ECConstants.TWO);
//            if (!(x.modPow(legendreExponent, q).equals(ECConstants.ONE)))
//            {
//                return null;
//            }
//
//            Random rand = new Random();
//            BigInteger fourX = x.shiftLeft(2);
//
//            BigInteger r;
//            do
//            {
//                r = new BigInteger(q.bitLength(), rand);
//            }
//            while (r.compareTo(q) >= 0
//                || !(r.multiply(r).subtract(fourX).modPow(legendreExponent, q).equals(qMinusOne)));
//
//            BigInteger n1 = qMinusOne.shiftRight(2); //.divide(ECConstants.FOUR);
//            BigInteger n2 = n1.add(ECConstants.ONE); //q.add(ECConstants.THREE).divide(ECConstants.FOUR);
//
//            BigInteger wOne = WOne(r, x, q);
//            BigInteger wSum = W(n1, wOne, q).add(W(n2, wOne, q)).mod(q);
//            BigInteger twoR = r.shiftLeft(1); //ECConstants.TWO.multiply(r);
//
//            BigInteger root = twoR.modPow(q.subtract(ECConstants.TWO), q)
//                .multiply(x).mod(q)
//                .multiply(wSum).mod(q);
//
//            return new Fp(q, root);
        }

//        private static BigInteger W(BigInteger n, BigInteger wOne, BigInteger p)
//        {
//            if (n.equals(ECConstants.ONE))
//            {
//                return wOne;
//            }
//            boolean isEven = !n.testBit(0);
//            n = n.shiftRight(1);//divide(ECConstants.TWO);
//            if (isEven)
//            {
//                BigInteger w = W(n, wOne, p);
//                return w.multiply(w).subtract(ECConstants.TWO).mod(p);
//            }
//            BigInteger w1 = W(n.add(ECConstants.ONE), wOne, p);
//            BigInteger w2 = W(n, wOne, p);
//            return w1.multiply(w2).subtract(wOne).mod(p);
//        }
//
//        private BigInteger WOne(BigInteger r, BigInteger x, BigInteger p)
//        {
//            return r.multiply(r).multiply(x.modPow(q.subtract(ECConstants.TWO), q)).subtract(ECConstants.TWO).mod(p);
//        }

        private static BigInteger[] lucasSequence(
            BigInteger  p,
            BigInteger  P,
            BigInteger  Q,
            BigInteger  k)
        {
            int n = k.bitLength();
            int s = k.getLowestSetBit();

            BigInteger Uh = ECConstants.ONE;
            BigInteger Vl = ECConstants.TWO;
            BigInteger Vh = P;
            BigInteger Ql = ECConstants.ONE;
            BigInteger Qh = ECConstants.ONE;

            for (int j = n - 1; j >= s + 1; --j)
            {
                Ql = Ql.multiply(Qh).mod(p);

                if (k.testBit(j))
                {
                    Qh = Ql.multiply(Q).mod(p);
                    Uh = Uh.multiply(Vh).mod(p);
                    Vl = Vh.multiply(Vl).subtract(P.multiply(Ql)).mod(p);
                    Vh = Vh.multiply(Vh).subtract(Qh.shiftLeft(1)).mod(p);
                }
                else
                {
                    Qh = Ql;
                    Uh = Uh.multiply(Vl).subtract(Ql).mod(p);
                    Vh = Vh.multiply(Vl).subtract(P.multiply(Ql)).mod(p);
                    Vl = Vl.multiply(Vl).subtract(Ql.shiftLeft(1)).mod(p);
                }
            }

            Ql = Ql.multiply(Qh).mod(p);
            Qh = Ql.multiply(Q).mod(p);
            Uh = Uh.multiply(Vl).subtract(Ql).mod(p);
            Vl = Vh.multiply(Vl).subtract(P.multiply(Ql)).mod(p);
            Ql = Ql.multiply(Qh).mod(p);

            for (int j = 1; j <= s; ++j)
            {
                Uh = Uh.multiply(Vl).mod(p);
                Vl = Vl.multiply(Vl).subtract(Ql.shiftLeft(1)).mod(p);
                Ql = Ql.multiply(Ql).mod(p);
            }

            return new BigInteger[]{ Uh, Vl };
        }
        
        public boolean equals(Object other)
        {
            if (other == this)
            {
                return true;
            }

            if (!(other instanceof ECFieldElement.Fp))
            {
                return false;
            }
            
            ECFieldElement.Fp o = (ECFieldElement.Fp)other;
            return q.equals(o.q) && x.equals(o.x);
        }

        public int hashCode()
        {
            return q.hashCode() ^ x.hashCode();
        }
    }

//    /**
//     * Class representing the Elements of the finite field
//     * F2m in polynomial basis (PB)
//     * representation. Both trinomial (TPB) and pentanomial (PPB) polynomial
//     * basis representations are supported. Gaussian normal basis (GNB)
//     * representation is not supported.
//     */
//    public static class F2m extends ECFieldElement
//    {
//        BigInteger x;
//
//        /**
//         * Indicates gaussian normal basis representation (GNB). Number chosen
//         * according to X9.62. GNB is not implemented at present.
//         */
//        public static final int GNB = 1;
//
//        /**
//         * Indicates trinomial basis representation (TPB). Number chosen
//         * according to X9.62.
//         */
//        public static final int TPB = 2;
//
//        /**
//         * Indicates pentanomial basis representation (PPB). Number chosen
//         * according to X9.62.
//         */
//        public static final int PPB = 3;
//
//        /**
//         * TPB or PPB.
//         */
//        private int representation;
//
//        /**
//         * The exponent m of F2m.
//         */
//        private int m;
//
//        /**
//         * TPB: The integer k where xm +
//         * xk + 1 represents the reduction polynomial
//         * f(z).
// * PPB: The integer k1 where xm + // * xk3 + xk2 + xk1 + 1 // * represents the reduction polynomial f(z).
// */ // private int k1; // // /** // * TPB: Always set to 0
// * PPB: The integer k2 where xm + // * xk3 + xk2 + xk1 + 1 // * represents the reduction polynomial f(z).
// */ // private int k2; // // /** // * TPB: Always set to 0
// * PPB: The integer k3 where xm + // * xk3 + xk2 + xk1 + 1 // * represents the reduction polynomial f(z).
// */ // private int k3; // // /** // * Constructor for PPB. // * @param m The exponent m of // * F2m. // * @param k1 The integer k1 where xm + // * xk3 + xk2 + xk1 + 1 // * represents the reduction polynomial f(z). // * @param k2 The integer k2 where xm + // * xk3 + xk2 + xk1 + 1 // * represents the reduction polynomial f(z). // * @param k3 The integer k3 where xm + // * xk3 + xk2 + xk1 + 1 // * represents the reduction polynomial f(z). // * @param x The BigInteger representing the value of the field element. // */ // public F2m( // int m, // int k1, // int k2, // int k3, // BigInteger x) // { //// super(x); // this.x = x; // // if ((k2 == 0) && (k3 == 0)) // { // this.representation = TPB; // } // else // { // if (k2 >= k3) // { // throw new IllegalArgumentException( // "k2 must be smaller than k3"); // } // if (k2 <= 0) // { // throw new IllegalArgumentException( // "k2 must be larger than 0"); // } // this.representation = PPB; // } // // if (x.signum() < 0) // { // throw new IllegalArgumentException("x value cannot be negative"); // } // // this.m = m; // this.k1 = k1; // this.k2 = k2; // this.k3 = k3; // } // // /** // * Constructor for TPB. // * @param m The exponent m of // * F2m. // * @param k The integer k where xm + // * xk + 1 represents the reduction // * polynomial f(z). // * @param x The BigInteger representing the value of the field element. // */ // public F2m(int m, int k, BigInteger x) // { // // Set k1 to k, and set k2 and k3 to 0 // this(m, k, 0, 0, x); // } // // public BigInteger toBigInteger() // { // return x; // } // // public String getFieldName() // { // return "F2m"; // } // // public int getFieldSize() // { // return m; // } // // /** // * Checks, if the ECFieldElements a and b // * are elements of the same field F2m // * (having the same representation). // * @param a field element. // * @param b field element to be compared. // * @throws IllegalArgumentException if a and b // * are not elements of the same field // * F2m (having the same // * representation). // */ // public static void checkFieldElements( // ECFieldElement a, // ECFieldElement b) // { // if ((!(a instanceof F2m)) || (!(b instanceof F2m))) // { // throw new IllegalArgumentException("Field elements are not " // + "both instances of ECFieldElement.F2m"); // } // // if ((a.toBigInteger().signum() < 0) || (b.toBigInteger().signum() < 0)) // { // throw new IllegalArgumentException( // "x value may not be negative"); // } // // ECFieldElement.F2m aF2m = (ECFieldElement.F2m)a; // ECFieldElement.F2m bF2m = (ECFieldElement.F2m)b; // // if ((aF2m.m != bF2m.m) || (aF2m.k1 != bF2m.k1) // || (aF2m.k2 != bF2m.k2) || (aF2m.k3 != bF2m.k3)) // { // throw new IllegalArgumentException("Field elements are not " // + "elements of the same field F2m"); // } // // if (aF2m.representation != bF2m.representation) // { // // Should never occur // throw new IllegalArgumentException( // "One of the field " // + "elements are not elements has incorrect representation"); // } // } // // /** // * Computes z * a(z) mod f(z), where f(z) is // * the reduction polynomial of this. // * @param a The polynomial a(z) to be multiplied by // * z mod f(z). // * @return z * a(z) mod f(z) // */ // private BigInteger multZModF(final BigInteger a) // { // // Left-shift of a(z) // BigInteger az = a.shiftLeft(1); // if (az.testBit(this.m)) // { // // If the coefficient of z^m in a(z) equals 1, reduction // // modulo f(z) is performed: Add f(z) to to a(z): // // Step 1: Unset mth coeffient of a(z) // az = az.clearBit(this.m); // // // Step 2: Add r(z) to a(z), where r(z) is defined as // // f(z) = z^m + r(z), and k1, k2, k3 are the positions of // // the non-zero coefficients in r(z) // az = az.flipBit(0); // az = az.flipBit(this.k1); // if (this.representation == PPB) // { // az = az.flipBit(this.k2); // az = az.flipBit(this.k3); // } // } // return az; // } // // public ECFieldElement add(final ECFieldElement b) // { // // No check performed here for performance reasons. Instead the // // elements involved are checked in ECPoint.F2m // // checkFieldElements(this, b); // if (b.toBigInteger().signum() == 0) // { // return this; // } // // return new F2m(this.m, this.k1, this.k2, this.k3, this.x.xor(b.toBigInteger())); // } // // public ECFieldElement subtract(final ECFieldElement b) // { // // Addition and subtraction are the same in F2m // return add(b); // } // // // public ECFieldElement multiply(final ECFieldElement b) // { // // Left-to-right shift-and-add field multiplication in F2m // // Input: Binary polynomials a(z) and b(z) of degree at most m-1 // // Output: c(z) = a(z) * b(z) mod f(z) // // // No check performed here for performance reasons. Instead the // // elements involved are checked in ECPoint.F2m // // checkFieldElements(this, b); // final BigInteger az = this.x; // BigInteger bz = b.toBigInteger(); // BigInteger cz; // // // Compute c(z) = a(z) * b(z) mod f(z) // if (az.testBit(0)) // { // cz = bz; // } // else // { // cz = ECConstants.ZERO; // } // // for (int i = 1; i < this.m; i++) // { // // b(z) := z * b(z) mod f(z) // bz = multZModF(bz); // // if (az.testBit(i)) // { // // If the coefficient of x^i in a(z) equals 1, b(z) is added // // to c(z) // cz = cz.xor(bz); // } // } // return new ECFieldElement.F2m(m, this.k1, this.k2, this.k3, cz); // } // // // public ECFieldElement divide(final ECFieldElement b) // { // // There may be more efficient implementations // ECFieldElement bInv = b.invert(); // return multiply(bInv); // } // // public ECFieldElement negate() // { // // -x == x holds for all x in F2m // return this; // } // // public ECFieldElement square() // { // // Naive implementation, can probably be speeded up using modular // // reduction // return multiply(this); // } // // public ECFieldElement invert() // { // // Inversion in F2m using the extended Euclidean algorithm // // Input: A nonzero polynomial a(z) of degree at most m-1 // // Output: a(z)^(-1) mod f(z) // // // u(z) := a(z) // BigInteger uz = this.x; // if (uz.signum() <= 0) // { // throw new ArithmeticException("x is zero or negative, " + // "inversion is impossible"); // } // // // v(z) := f(z) // BigInteger vz = ECConstants.ZERO.setBit(m); // vz = vz.setBit(0); // vz = vz.setBit(this.k1); // if (this.representation == PPB) // { // vz = vz.setBit(this.k2); // vz = vz.setBit(this.k3); // } // // // g1(z) := 1, g2(z) := 0 // BigInteger g1z = ECConstants.ONE; // BigInteger g2z = ECConstants.ZERO; // // // while u != 1 // while (!(uz.equals(ECConstants.ZERO))) // { // // j := deg(u(z)) - deg(v(z)) // int j = uz.bitLength() - vz.bitLength(); // // // If j < 0 then: u(z) <-> v(z), g1(z) <-> g2(z), j := -j // if (j < 0) // { // final BigInteger uzCopy = uz; // uz = vz; // vz = uzCopy; // // final BigInteger g1zCopy = g1z; // g1z = g2z; // g2z = g1zCopy; // // j = -j; // } // // // u(z) := u(z) + z^j * v(z) // // Note, that no reduction modulo f(z) is required, because // // deg(u(z) + z^j * v(z)) <= max(deg(u(z)), j + deg(v(z))) // // = max(deg(u(z)), deg(u(z)) - deg(v(z)) + deg(v(z)) // // = deg(u(z)) // uz = uz.xor(vz.shiftLeft(j)); // // // g1(z) := g1(z) + z^j * g2(z) // g1z = g1z.xor(g2z.shiftLeft(j)); //// if (g1z.bitLength() > this.m) { //// throw new ArithmeticException( //// "deg(g1z) >= m, g1z = " + g1z.toString(2)); //// } // } // return new ECFieldElement.F2m( // this.m, this.k1, this.k2, this.k3, g2z); // } // // public ECFieldElement sqrt() // { // throw new RuntimeException("Not implemented"); // } // // /** // * @return the representation of the field // * F2m, either of // * TPB (trinomial // * basis representation) or // * PPB (pentanomial // * basis representation). // */ // public int getRepresentation() // { // return this.representation; // } // // /** // * @return the degree m of the reduction polynomial // * f(z). // */ // public int getM() // { // return this.m; // } // // /** // * @return TPB: The integer k where xm + // * xk + 1 represents the reduction polynomial // * f(z).
// * PPB: The integer k1 where xm + // * xk3 + xk2 + xk1 + 1 // * represents the reduction polynomial f(z).
// */ // public int getK1() // { // return this.k1; // } // // /** // * @return TPB: Always returns 0
// * PPB: The integer k2 where xm + // * xk3 + xk2 + xk1 + 1 // * represents the reduction polynomial f(z).
// */ // public int getK2() // { // return this.k2; // } // // /** // * @return TPB: Always set to 0
// * PPB: The integer k3 where xm + // * xk3 + xk2 + xk1 + 1 // * represents the reduction polynomial f(z).
// */ // public int getK3() // { // return this.k3; // } // // public boolean equals(Object anObject) // { // if (anObject == this) // { // return true; // } // // if (!(anObject instanceof ECFieldElement.F2m)) // { // return false; // } // // ECFieldElement.F2m b = (ECFieldElement.F2m)anObject; // // return ((this.m == b.m) && (this.k1 == b.k1) && (this.k2 == b.k2) // && (this.k3 == b.k3) // && (this.representation == b.representation) // && (this.x.equals(b.x))); // } // // public int hashCode() // { // return x.hashCode() ^ m ^ k1 ^ k2 ^ k3; // } // } /** * Class representing the Elements of the finite field * F2m in polynomial basis (PB) * representation. Both trinomial (TPB) and pentanomial (PPB) polynomial * basis representations are supported. Gaussian normal basis (GNB) * representation is not supported. */ public static class F2m extends ECFieldElement { /** * Indicates gaussian normal basis representation (GNB). Number chosen * according to X9.62. GNB is not implemented at present. */ public static final int GNB = 1; /** * Indicates trinomial basis representation (TPB). Number chosen * according to X9.62. */ public static final int TPB = 2; /** * Indicates pentanomial basis representation (PPB). Number chosen * according to X9.62. */ public static final int PPB = 3; /** * TPB or PPB. */ private int representation; /** * The exponent m of F2m. */ private int m; /** * TPB: The integer k where xm + * xk + 1 represents the reduction polynomial * f(z).
* PPB: The integer k1 where xm + * xk3 + xk2 + xk1 + 1 * represents the reduction polynomial f(z).
*/ private int k1; /** * TPB: Always set to 0
* PPB: The integer k2 where xm + * xk3 + xk2 + xk1 + 1 * represents the reduction polynomial f(z).
*/ private int k2; /** * TPB: Always set to 0
* PPB: The integer k3 where xm + * xk3 + xk2 + xk1 + 1 * represents the reduction polynomial f(z).
*/ private int k3; /** * The IntArray holding the bits. */ private IntArray x; /** * The number of ints required to hold m bits. */ private int t; /** * Constructor for PPB. * @param m The exponent m of * F2m. * @param k1 The integer k1 where xm + * xk3 + xk2 + xk1 + 1 * represents the reduction polynomial f(z). * @param k2 The integer k2 where xm + * xk3 + xk2 + xk1 + 1 * represents the reduction polynomial f(z). * @param k3 The integer k3 where xm + * xk3 + xk2 + xk1 + 1 * represents the reduction polynomial f(z). * @param x The BigInteger representing the value of the field element. */ public F2m( int m, int k1, int k2, int k3, BigInteger x) { // t = m / 32 rounded up to the next integer t = (m + 31) >> 5; this.x = new IntArray(x, t); if ((k2 == 0) && (k3 == 0)) { this.representation = TPB; } else { if (k2 >= k3) { throw new IllegalArgumentException( "k2 must be smaller than k3"); } if (k2 <= 0) { throw new IllegalArgumentException( "k2 must be larger than 0"); } this.representation = PPB; } if (x.signum() < 0) { throw new IllegalArgumentException("x value cannot be negative"); } this.m = m; this.k1 = k1; this.k2 = k2; this.k3 = k3; } /** * Constructor for TPB. * @param m The exponent m of * F2m. * @param k The integer k where xm + * xk + 1 represents the reduction * polynomial f(z). * @param x The BigInteger representing the value of the field element. */ public F2m(int m, int k, BigInteger x) { // Set k1 to k, and set k2 and k3 to 0 this(m, k, 0, 0, x); } private F2m(int m, int k1, int k2, int k3, IntArray x) { t = (m + 31) >> 5; this.x = x; this.m = m; this.k1 = k1; this.k2 = k2; this.k3 = k3; if ((k2 == 0) && (k3 == 0)) { this.representation = TPB; } else { this.representation = PPB; } } public BigInteger toBigInteger() { return x.toBigInteger(); } public String getFieldName() { return "F2m"; } public int getFieldSize() { return m; } /** * Checks, if the ECFieldElements a and b * are elements of the same field F2m * (having the same representation). * @param a field element. * @param b field element to be compared. * @throws IllegalArgumentException if a and b * are not elements of the same field * F2m (having the same * representation). */ public static void checkFieldElements( ECFieldElement a, ECFieldElement b) { if ((!(a instanceof F2m)) || (!(b instanceof F2m))) { throw new IllegalArgumentException("Field elements are not " + "both instances of ECFieldElement.F2m"); } ECFieldElement.F2m aF2m = (ECFieldElement.F2m)a; ECFieldElement.F2m bF2m = (ECFieldElement.F2m)b; if ((aF2m.m != bF2m.m) || (aF2m.k1 != bF2m.k1) || (aF2m.k2 != bF2m.k2) || (aF2m.k3 != bF2m.k3)) { throw new IllegalArgumentException("Field elements are not " + "elements of the same field F2m"); } if (aF2m.representation != bF2m.representation) { // Should never occur throw new IllegalArgumentException( "One of the field " + "elements are not elements has incorrect representation"); } } public ECFieldElement add(final ECFieldElement b) { // No check performed here for performance reasons. Instead the // elements involved are checked in ECPoint.F2m // checkFieldElements(this, b); IntArray iarrClone = (IntArray)this.x.clone(); F2m bF2m = (F2m)b; iarrClone.addShifted(bF2m.x, 0); return new F2m(m, k1, k2, k3, iarrClone); } public ECFieldElement subtract(final ECFieldElement b) { // Addition and subtraction are the same in F2m return add(b); } public ECFieldElement multiply(final ECFieldElement b) { // Right-to-left comb multiplication in the IntArray // Input: Binary polynomials a(z) and b(z) of degree at most m-1 // Output: c(z) = a(z) * b(z) mod f(z) // No check performed here for performance reasons. Instead the // elements involved are checked in ECPoint.F2m // checkFieldElements(this, b); F2m bF2m = (F2m)b; IntArray mult = x.multiply(bF2m.x, m); mult.reduce(m, new int[]{k1, k2, k3}); return new F2m(m, k1, k2, k3, mult); } public ECFieldElement divide(final ECFieldElement b) { // There may be more efficient implementations ECFieldElement bInv = b.invert(); return multiply(bInv); } public ECFieldElement negate() { // -x == x holds for all x in F2m return this; } public ECFieldElement square() { IntArray squared = x.square(m); squared.reduce(m, new int[]{k1, k2, k3}); return new F2m(m, k1, k2, k3, squared); } public ECFieldElement invert() { // Inversion in F2m using the extended Euclidean algorithm // Input: A nonzero polynomial a(z) of degree at most m-1 // Output: a(z)^(-1) mod f(z) // u(z) := a(z) IntArray uz = (IntArray)this.x.clone(); // v(z) := f(z) IntArray vz = new IntArray(t); vz.setBit(m); vz.setBit(0); vz.setBit(this.k1); if (this.representation == PPB) { vz.setBit(this.k2); vz.setBit(this.k3); } // g1(z) := 1, g2(z) := 0 IntArray g1z = new IntArray(t); g1z.setBit(0); IntArray g2z = new IntArray(t); // while u != 0 while (!uz.isZero()) // while (uz.getUsedLength() > 0) // while (uz.bitLength() > 1) { // j := deg(u(z)) - deg(v(z)) int j = uz.bitLength() - vz.bitLength(); // If j < 0 then: u(z) <-> v(z), g1(z) <-> g2(z), j := -j if (j < 0) { final IntArray uzCopy = uz; uz = vz; vz = uzCopy; final IntArray g1zCopy = g1z; g1z = g2z; g2z = g1zCopy; j = -j; } // u(z) := u(z) + z^j * v(z) // Note, that no reduction modulo f(z) is required, because // deg(u(z) + z^j * v(z)) <= max(deg(u(z)), j + deg(v(z))) // = max(deg(u(z)), deg(u(z)) - deg(v(z)) + deg(v(z)) // = deg(u(z)) // uz = uz.xor(vz.shiftLeft(j)); // jInt = n / 32 int jInt = j >> 5; // jInt = n % 32 int jBit = j & 0x1F; IntArray vzShift = vz.shiftLeft(jBit); uz.addShifted(vzShift, jInt); // g1(z) := g1(z) + z^j * g2(z) // g1z = g1z.xor(g2z.shiftLeft(j)); IntArray g2zShift = g2z.shiftLeft(jBit); g1z.addShifted(g2zShift, jInt); } return new ECFieldElement.F2m( this.m, this.k1, this.k2, this.k3, g2z); } public ECFieldElement sqrt() { throw new RuntimeException("Not implemented"); } /** * @return the representation of the field * F2m, either of * TPB (trinomial * basis representation) or * PPB (pentanomial * basis representation). */ public int getRepresentation() { return this.representation; } /** * @return the degree m of the reduction polynomial * f(z). */ public int getM() { return this.m; } /** * @return TPB: The integer k where xm + * xk + 1 represents the reduction polynomial * f(z).
* PPB: The integer k1 where xm + * xk3 + xk2 + xk1 + 1 * represents the reduction polynomial f(z).
*/ public int getK1() { return this.k1; } /** * @return TPB: Always returns 0
* PPB: The integer k2 where xm + * xk3 + xk2 + xk1 + 1 * represents the reduction polynomial f(z).
*/ public int getK2() { return this.k2; } /** * @return TPB: Always set to 0
* PPB: The integer k3 where xm + * xk3 + xk2 + xk1 + 1 * represents the reduction polynomial f(z).
*/ public int getK3() { return this.k3; } public boolean equals(Object anObject) { if (anObject == this) { return true; } if (!(anObject instanceof ECFieldElement.F2m)) { return false; } ECFieldElement.F2m b = (ECFieldElement.F2m)anObject; return ((this.m == b.m) && (this.k1 == b.k1) && (this.k2 == b.k2) && (this.k3 == b.k3) && (this.representation == b.representation) && (this.x.equals(b.x))); } public int hashCode() { return x.hashCode() ^ m ^ k1 ^ k2 ^ k3; } } }




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