コード例 #1
0
ファイル: RSACryption.cs プロジェクト: FreakLign/RSASharp
        public static RSACryption Create()
        {
            RSACryption r    = new RSACryption();
            var         rand = new Random((int)DateTime.Now.ToFileTime());
            BigInteger  p    = PrimeFunctions.BigPrimeGroups[rand.Next(0, PrimeFunctions.BigPrimeGroups.Length)];
            BigInteger  q    = PrimeFunctions.BigPrimeGroups[rand.Next(0, PrimeFunctions.BigPrimeGroups.Length)];

            while (q == p)
            {
                q = PrimeFunctions.BigPrimeGroups[rand.Next(0, PrimeFunctions.BigPrimeGroups.Length)];
            }
            BigInteger phi = (p - 1) * (q - 1);
            BigInteger n   = p * q;
            BigInteger k   = rand.Next(10, 20);
            BigInteger e   = 1;
            BigInteger d   = -1;

            while (d == -1)
            {
                e = PrimeFunctions.MiddlePrimeGroups[rand.Next(0, PrimeFunctions.MiddlePrimeGroups.Length)];
                d = ExtendedEuclideanalgorithm.GetMultiplicativeInverseModule(e, 0 - phi);
            }
            r.LoadPublicKey(Convert.ToBase64String(e.ToByteArray()), Convert.ToBase64String(n.ToByteArray()));
            r.LoadPrivateKey(Convert.ToBase64String(d.ToByteArray()), Convert.ToBase64String(n.ToByteArray()));
            return(r);
        }
コード例 #2
0
ファイル: RSACryption.cs プロジェクト: FreakLign/RSASharp
        /// <summary>
        /// 创建密钥对。
        /// </summary>
        /// <param name="n">N值</param>
        /// <param name="e">公钥</param>
        /// <param name="d">密钥</param>
        public static void Create(out byte[] n, out byte[] e, out byte[] d)
        {
            RSACryption r    = new RSACryption();
            var         rand = new Random((int)DateTime.Now.ToFileTime());
            BigInteger  p    = PrimeFunctions.BigPrimeGroups[rand.Next(0, PrimeFunctions.BigPrimeGroups.Length)];
            BigInteger  q    = PrimeFunctions.BigPrimeGroups[rand.Next(0, PrimeFunctions.BigPrimeGroups.Length)];

            while (q == p)
            {
                q = PrimeFunctions.BigPrimeGroups[rand.Next(0, PrimeFunctions.BigPrimeGroups.Length)];
            }
            BigInteger phi = (p - 1) * (q - 1);
            BigInteger nv  = p * q;
            BigInteger k   = rand.Next(10, 20);
            BigInteger ev  = 1;
            BigInteger dv  = -1;

            while (dv == -1)
            {
                ev = PrimeFunctions.MiddlePrimeGroups[rand.Next(0, PrimeFunctions.MiddlePrimeGroups.Length)];
                dv = ExtendedEuclideanalgorithm.GetMultiplicativeInverseModule(ev, 0 - phi);
            }
            n = nv.ToByteArray();
            e = ev.ToByteArray();
            d = dv.ToByteArray();
        }