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455 lines
19 KiB
455 lines
19 KiB
/**
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* @license
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* Copyright 2016 Google Inc. All rights reserved.
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* Licensed under the Apache License, Version 2.0 (the "License");
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* you may not use this file except in compliance with the License.
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* You may obtain a copy of the License at
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*
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* http://www.apache.org/licenses/LICENSE-2.0
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*
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* Unless required by applicable law or agreed to in writing, software
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* distributed under the License is distributed on an "AS IS" BASIS,
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* WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
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* See the License for the specific language governing permissions and
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* limitations under the License.
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*/
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package com.google.security.wycheproof;
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import java.math.BigInteger;
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import java.security.AlgorithmParameters;
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import java.security.GeneralSecurityException;
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import java.security.KeyPair;
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import java.security.KeyPairGenerator;
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import java.security.NoSuchAlgorithmException;
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import java.security.interfaces.ECPublicKey;
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import java.security.spec.ECField;
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import java.security.spec.ECFieldFp;
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import java.security.spec.ECGenParameterSpec;
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import java.security.spec.ECParameterSpec;
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import java.security.spec.ECPoint;
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import java.security.spec.ECPublicKeySpec;
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import java.security.spec.EllipticCurve;
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import java.security.spec.InvalidParameterSpecException;
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import java.util.Arrays;
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/**
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* Some utilities for testing Elliptic curve crypto. This code is for testing only and hasn't been
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* reviewed for production.
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*/
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public class EcUtil {
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/**
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* Returns the ECParameterSpec for a named curve. Not every provider implements the
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* AlgorithmParameters. Therefore, most test use alternative functions.
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*/
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public static ECParameterSpec getCurveSpec(String name)
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throws NoSuchAlgorithmException, InvalidParameterSpecException {
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AlgorithmParameters parameters = AlgorithmParameters.getInstance("EC");
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parameters.init(new ECGenParameterSpec(name));
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return parameters.getParameterSpec(ECParameterSpec.class);
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}
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/**
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* Returns the ECParameterSpec for a named curve. Only a handful curves that are used in the tests
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* are implemented.
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*/
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public static ECParameterSpec getCurveSpecRef(String name) throws NoSuchAlgorithmException {
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if (name.equals("secp224r1")) {
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return getNistP224Params();
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} else if (name.equals("secp256r1")) {
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return getNistP256Params();
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} else if (name.equals("secp384r1")) {
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return getNistP384Params();
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} else if (name.equals("secp521r1")) {
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return getNistP521Params();
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} else if (name.equals("brainpoolp256r1")) {
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return getBrainpoolP256r1Params();
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} else {
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throw new NoSuchAlgorithmException("Curve not implemented:" + name);
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}
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}
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public static ECParameterSpec getNistCurveSpec(
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String decimalP, String decimalN, String hexB, String hexGX, String hexGY) {
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final BigInteger p = new BigInteger(decimalP);
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final BigInteger n = new BigInteger(decimalN);
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final BigInteger three = new BigInteger("3");
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final BigInteger a = p.subtract(three);
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final BigInteger b = new BigInteger(hexB, 16);
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final BigInteger gx = new BigInteger(hexGX, 16);
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final BigInteger gy = new BigInteger(hexGY, 16);
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final int h = 1;
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ECFieldFp fp = new ECFieldFp(p);
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java.security.spec.EllipticCurve curveSpec = new java.security.spec.EllipticCurve(fp, a, b);
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ECPoint g = new ECPoint(gx, gy);
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ECParameterSpec ecSpec = new ECParameterSpec(curveSpec, g, n, h);
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return ecSpec;
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}
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public static ECParameterSpec getNistP224Params() {
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return getNistCurveSpec(
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"26959946667150639794667015087019630673557916260026308143510066298881",
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"26959946667150639794667015087019625940457807714424391721682722368061",
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"b4050a850c04b3abf54132565044b0b7d7bfd8ba270b39432355ffb4",
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"b70e0cbd6bb4bf7f321390b94a03c1d356c21122343280d6115c1d21",
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"bd376388b5f723fb4c22dfe6cd4375a05a07476444d5819985007e34");
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}
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public static ECParameterSpec getNistP256Params() {
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return getNistCurveSpec(
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"115792089210356248762697446949407573530086143415290314195533631308867097853951",
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"115792089210356248762697446949407573529996955224135760342422259061068512044369",
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"5ac635d8aa3a93e7b3ebbd55769886bc651d06b0cc53b0f63bce3c3e27d2604b",
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"6b17d1f2e12c4247f8bce6e563a440f277037d812deb33a0f4a13945d898c296",
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"4fe342e2fe1a7f9b8ee7eb4a7c0f9e162bce33576b315ececbb6406837bf51f5");
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}
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public static ECParameterSpec getNistP384Params() {
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return getNistCurveSpec(
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"3940200619639447921227904010014361380507973927046544666794829340"
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+ "4245721771496870329047266088258938001861606973112319",
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"3940200619639447921227904010014361380507973927046544666794690527"
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+ "9627659399113263569398956308152294913554433653942643",
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"b3312fa7e23ee7e4988e056be3f82d19181d9c6efe8141120314088f5013875a"
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+ "c656398d8a2ed19d2a85c8edd3ec2aef",
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"aa87ca22be8b05378eb1c71ef320ad746e1d3b628ba79b9859f741e082542a38"
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+ "5502f25dbf55296c3a545e3872760ab7",
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"3617de4a96262c6f5d9e98bf9292dc29f8f41dbd289a147ce9da3113b5f0b8c0"
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+ "0a60b1ce1d7e819d7a431d7c90ea0e5f");
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}
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public static ECParameterSpec getNistP521Params() {
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return getNistCurveSpec(
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"6864797660130609714981900799081393217269435300143305409394463459"
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+ "18554318339765605212255964066145455497729631139148085803712198"
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+ "7999716643812574028291115057151",
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"6864797660130609714981900799081393217269435300143305409394463459"
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+ "18554318339765539424505774633321719753296399637136332111386476"
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+ "8612440380340372808892707005449",
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"051953eb9618e1c9a1f929a21a0b68540eea2da725b99b315f3b8b489918ef10"
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+ "9e156193951ec7e937b1652c0bd3bb1bf073573df883d2c34f1ef451fd46b503f00",
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"c6858e06b70404e9cd9e3ecb662395b4429c648139053fb521f828af606b4d3d"
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+ "baa14b5e77efe75928fe1dc127a2ffa8de3348b3c1856a429bf97e7e31c2e5bd66",
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"11839296a789a3bc0045c8a5fb42c7d1bd998f54449579b446817afbd17273e6"
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+ "62c97ee72995ef42640c550b9013fad0761353c7086a272c24088be94769fd16650");
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}
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public static ECParameterSpec getBrainpoolP256r1Params() {
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BigInteger p =
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new BigInteger("A9FB57DBA1EEA9BC3E660A909D838D726E3BF623D52620282013481D1F6E5377", 16);
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BigInteger a =
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new BigInteger("7D5A0975FC2C3057EEF67530417AFFE7FB8055C126DC5C6CE94A4B44F330B5D9", 16);
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BigInteger b =
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new BigInteger("26DC5C6CE94A4B44F330B5D9BBD77CBF958416295CF7E1CE6BCCDC18FF8C07B6", 16);
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BigInteger x =
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new BigInteger("8BD2AEB9CB7E57CB2C4B482FFC81B7AFB9DE27E1E3BD23C23A4453BD9ACE3262", 16);
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BigInteger y =
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new BigInteger("547EF835C3DAC4FD97F8461A14611DC9C27745132DED8E545C1D54C72F046997", 16);
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BigInteger n =
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new BigInteger("A9FB57DBA1EEA9BC3E660A909D838D718C397AA3B561A6F7901E0E82974856A7", 16);
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final int h = 1;
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ECFieldFp fp = new ECFieldFp(p);
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EllipticCurve curve = new EllipticCurve(fp, a, b);
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ECPoint g = new ECPoint(x, y);
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return new ECParameterSpec(curve, g, n, h);
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}
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/**
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* Compute the Legendre symbol of x mod p. This implementation is slow. Faster would be the
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* computation for the Jacobi symbol.
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*
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* @param x an integer
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* @param p a prime modulus
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* @returns 1 if x is a quadratic residue, -1 if x is a non-quadratic residue and 0 if x and p are
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* not coprime.
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* @throws GeneralSecurityException when the computation shows that p is not prime.
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*/
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public static int legendre(BigInteger x, BigInteger p) throws GeneralSecurityException {
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BigInteger q = p.subtract(BigInteger.ONE).shiftRight(1);
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BigInteger t = x.modPow(q, p);
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if (t.equals(BigInteger.ONE)) {
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return 1;
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} else if (t.equals(BigInteger.ZERO)) {
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return 0;
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} else if (t.add(BigInteger.ONE).equals(p)) {
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return -1;
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} else {
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throw new GeneralSecurityException("p is not prime");
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}
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}
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/**
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* Computes a modular square root. Timing and exceptions can leak information about the inputs.
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* Therefore this method must only be used in tests.
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*
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* @param x the square
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* @param p the prime modulus
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* @returns a value s such that s^2 mod p == x mod p
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* @throws GeneralSecurityException if the square root could not be found.
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*/
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public static BigInteger modSqrt(BigInteger x, BigInteger p) throws GeneralSecurityException {
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if (p.signum() != 1) {
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throw new GeneralSecurityException("p must be positive");
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}
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x = x.mod(p);
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BigInteger squareRoot = null;
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// Special case for x == 0.
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// This check is necessary for Cipolla's algorithm.
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if (x.equals(BigInteger.ZERO)) {
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return x;
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}
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if (p.testBit(0) && p.testBit(1)) {
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// Case p % 4 == 3
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// q = (p + 1) / 4
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BigInteger q = p.add(BigInteger.ONE).shiftRight(2);
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squareRoot = x.modPow(q, p);
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} else if (p.testBit(0) && !p.testBit(1)) {
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// Case p % 4 == 1
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// For this case we use Cipolla's algorithm.
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// This alogorithm is preferrable to Tonelli-Shanks for primes p where p-1 is divisible by
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// a large power of 2, which is a frequent choice since it simplifies modular reduction.
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BigInteger a = BigInteger.ONE;
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BigInteger d = null;
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while (true) {
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d = a.multiply(a).subtract(x).mod(p);
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// Computes the Legendre symbol. Using the Jacobi symbol would be a faster. Using Legendre
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// has the advantage, that it detects a non prime p with high probability.
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// On the other hand if p = q^2 then the Jacobi (d/p)==1 for almost all d's and thus
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// using the Jacobi symbol here can result in an endless loop with invalid inputs.
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int t = legendre(d, p);
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if (t == -1) {
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break;
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} else {
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a = a.add(BigInteger.ONE);
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}
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}
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// Since d = a^2 - n is a non-residue modulo p, we have
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// a - sqrt(d) == (a+sqrt(d))^p (mod p),
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// and hence
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// n == (a + sqrt(d))(a - sqrt(d) == (a+sqrt(d))^(p+1) (mod p).
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// Thus if n is square then (a+sqrt(d))^((p+1)/2) (mod p) is a square root of n.
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BigInteger q = p.add(BigInteger.ONE).shiftRight(1);
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BigInteger u = a;
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BigInteger v = BigInteger.ONE;
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for (int bit = q.bitLength() - 2; bit >= 0; bit--) {
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// Compute (u + v sqrt(d))^2
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BigInteger tmp = u.multiply(v);
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u = u.multiply(u).add(v.multiply(v).mod(p).multiply(d)).mod(p);
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v = tmp.add(tmp).mod(p);
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if (q.testBit(bit)) {
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tmp = u.multiply(a).add(v.multiply(d)).mod(p);
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v = a.multiply(v).add(u).mod(p);
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u = tmp;
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}
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}
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squareRoot = u;
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}
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// The methods used to compute the square root only guarantee a correct result if the
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// preconditions (i.e. p prime and x is a square) are satisfied. Otherwise the value is
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// undefined. Hence, it is important to verify that squareRoot is indeed a square root.
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if (squareRoot != null && squareRoot.multiply(squareRoot).mod(p).compareTo(x) != 0) {
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throw new GeneralSecurityException("Could not find square root");
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}
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return squareRoot;
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}
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/**
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* Returns the modulus of the field used by the curve specified in ecParams.
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*
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* @param curve must be a prime order elliptic curve
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* @return the order of the finite field over which curve is defined.
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*/
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public static BigInteger getModulus(EllipticCurve curve) throws GeneralSecurityException {
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java.security.spec.ECField field = curve.getField();
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if (field instanceof java.security.spec.ECFieldFp) {
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return ((java.security.spec.ECFieldFp) field).getP();
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} else {
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throw new GeneralSecurityException("Only curves over prime order fields are supported");
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}
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}
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/**
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* Returns the size of an element of the field over which the curve is defined.
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*
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* @param curve must be a prime order elliptic curve
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* @return the size of an element in bits
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*/
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public static int fieldSizeInBits(EllipticCurve curve) throws GeneralSecurityException {
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return getModulus(curve).subtract(BigInteger.ONE).bitLength();
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}
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/**
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* Returns the size of an element of the field over which the curve is defined.
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*
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* @param curve must be a prime order elliptic curve
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* @return the size of an element in bytes.
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*/
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public static int fieldSizeInBytes(EllipticCurve curve) throws GeneralSecurityException {
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return (fieldSizeInBits(curve) + 7) / 8;
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}
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/**
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* Checks that a point is on a given elliptic curve. This method implements the partial public key
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* validation routine from Section 5.6.2.6 of NIST SP 800-56A
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* http://csrc.nist.gov/publications/nistpubs/800-56A/SP800-56A_Revision1_Mar08-2007.pdf A partial
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* public key validation is sufficient for curves with cofactor 1. See Section B.3 of
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* http://www.nsa.gov/ia/_files/SuiteB_Implementer_G-113808.pdf The point validations above are
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* taken from recommendations for ECDH, because parameter checks in ECDH are much more important
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* than for the case of ECDSA. Performing this test for ECDSA keys is mainly a sanity check.
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*
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* @param point the point that needs verification
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* @param ec the elliptic curve. This must be a curve over a prime order field.
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* @throws GeneralSecurityException if the field is binary or if the point is not on the curve.
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*/
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public static void checkPointOnCurve(ECPoint point, EllipticCurve ec)
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throws GeneralSecurityException {
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BigInteger p = getModulus(ec);
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BigInteger x = point.getAffineX();
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BigInteger y = point.getAffineY();
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if (x == null || y == null) {
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throw new GeneralSecurityException("point is at infinity");
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}
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// Check 0 <= x < p and 0 <= y < p.
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if (x.signum() == -1 || x.compareTo(p) != -1) {
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throw new GeneralSecurityException("x is out of range");
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}
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if (y.signum() == -1 || y.compareTo(p) != -1) {
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throw new GeneralSecurityException("y is out of range");
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}
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// Check y^2 == x^3 + a x + b (mod p)
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BigInteger lhs = y.multiply(y).mod(p);
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BigInteger rhs = x.multiply(x).add(ec.getA()).multiply(x).add(ec.getB()).mod(p);
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if (!lhs.equals(rhs)) {
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throw new GeneralSecurityException("Point is not on curve");
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}
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}
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/**
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* Checks a public key. I.e. this checks that the point defining the public key is on the curve.
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*
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* @param key must be a key defined over a curve using a prime order field.
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* @throws GeneralSecurityException if the key is not valid.
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*/
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public static void checkPublicKey(ECPublicKey key) throws GeneralSecurityException {
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checkPointOnCurve(key.getW(), key.getParams().getCurve());
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}
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/**
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* Decompress a point
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*
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* @param x The x-coordinate of the point
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* @param bit0 true if the least significant bit of y is set.
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* @param ecParams contains the curve of the point. This must be over a prime order field.
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*/
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public static ECPoint getPoint(BigInteger x, boolean bit0, ECParameterSpec ecParams)
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throws GeneralSecurityException {
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EllipticCurve ec = ecParams.getCurve();
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ECField field = ec.getField();
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if (!(field instanceof ECFieldFp)) {
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throw new GeneralSecurityException("Only curves over prime order fields are supported");
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}
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BigInteger p = ((java.security.spec.ECFieldFp) field).getP();
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if (x.compareTo(BigInteger.ZERO) == -1 || x.compareTo(p) != -1) {
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throw new GeneralSecurityException("x is out of range");
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}
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// Compute rhs == x^3 + a x + b (mod p)
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BigInteger rhs = x.multiply(x).add(ec.getA()).multiply(x).add(ec.getB()).mod(p);
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BigInteger y = modSqrt(rhs, p);
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if (bit0 != y.testBit(0)) {
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y = p.subtract(y).mod(p);
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}
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return new ECPoint(x, y);
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}
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/**
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* Decompress a point on an elliptic curve.
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*
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* @param bytes The compressed point. Its representation is z || x where z is 2+lsb(y) and x is
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* using a unsigned fixed length big-endian representation.
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* @param ecParams the specification of the curve. Only Weierstrass curves over prime order fields
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* are implemented.
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*/
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public static ECPoint decompressPoint(byte[] bytes, ECParameterSpec ecParams)
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throws GeneralSecurityException {
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EllipticCurve ec = ecParams.getCurve();
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ECField field = ec.getField();
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if (!(field instanceof ECFieldFp)) {
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throw new GeneralSecurityException("Only curves over prime order fields are supported");
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}
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BigInteger p = ((java.security.spec.ECFieldFp) field).getP();
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int expectedLength = 1 + (p.bitLength() + 7) / 8;
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if (bytes.length != expectedLength) {
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throw new GeneralSecurityException("compressed point has wrong length");
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}
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boolean lsb;
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switch (bytes[0]) {
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case 2:
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lsb = false;
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break;
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case 3:
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lsb = true;
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break;
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default:
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throw new GeneralSecurityException("Invalid format");
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}
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BigInteger x = new BigInteger(1, Arrays.copyOfRange(bytes, 1, bytes.length));
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if (x.compareTo(BigInteger.ZERO) == -1 || x.compareTo(p) != -1) {
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throw new GeneralSecurityException("x is out of range");
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}
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// Compute rhs == x^3 + a x + b (mod p)
|
|
BigInteger rhs = x.multiply(x).add(ec.getA()).multiply(x).add(ec.getB()).mod(p);
|
|
BigInteger y = modSqrt(rhs, p);
|
|
if (lsb != y.testBit(0)) {
|
|
y = p.subtract(y).mod(p);
|
|
}
|
|
return new ECPoint(x, y);
|
|
}
|
|
|
|
/**
|
|
* Returns a weak public key of order 3 such that the public key point is on the curve specified
|
|
* in ecParams. This method is used to check ECC implementations for missing step in the
|
|
* verification of the public key. E.g. implementations of ECDH must verify that the public key
|
|
* contains a point on the curve as well as public and secret key are using the same curve.
|
|
*
|
|
* @param ecParams the parameters of the key to attack. This must be a curve in Weierstrass form
|
|
* over a prime order field.
|
|
* @return a weak EC group with a genrator of order 3.
|
|
*/
|
|
public static ECPublicKeySpec getWeakPublicKey(ECParameterSpec ecParams)
|
|
throws GeneralSecurityException {
|
|
EllipticCurve curve = ecParams.getCurve();
|
|
KeyPairGenerator keyGen = KeyPairGenerator.getInstance("EC");
|
|
keyGen.initialize(ecParams);
|
|
BigInteger p = getModulus(curve);
|
|
BigInteger three = new BigInteger("3");
|
|
while (true) {
|
|
// Generate a point on the original curve
|
|
KeyPair keyPair = keyGen.generateKeyPair();
|
|
ECPublicKey pub = (ECPublicKey) keyPair.getPublic();
|
|
ECPoint w = pub.getW();
|
|
BigInteger x = w.getAffineX();
|
|
BigInteger y = w.getAffineY();
|
|
// Find the curve parameters a,b such that 3*w = infinity.
|
|
// This is the case if the following equations are satisfied:
|
|
// 3x == l^2 (mod p)
|
|
// l == (3x^2 + a) / 2*y (mod p)
|
|
// y^2 == x^3 + ax + b (mod p)
|
|
BigInteger l;
|
|
try {
|
|
l = modSqrt(x.multiply(three), p);
|
|
} catch (GeneralSecurityException ex) {
|
|
continue;
|
|
}
|
|
BigInteger xSqr = x.multiply(x).mod(p);
|
|
BigInteger a = l.multiply(y.add(y)).subtract(xSqr.multiply(three)).mod(p);
|
|
BigInteger b = y.multiply(y).subtract(x.multiply(xSqr.add(a))).mod(p);
|
|
EllipticCurve newCurve = new EllipticCurve(curve.getField(), a, b);
|
|
// Just a sanity check.
|
|
checkPointOnCurve(w, newCurve);
|
|
// Cofactor and order are of course wrong.
|
|
ECParameterSpec spec = new ECParameterSpec(newCurve, w, p, 1);
|
|
return new ECPublicKeySpec(w, spec);
|
|
}
|
|
}
|
|
}
|