Exemplo n.º 1
0
 public BigInteger Decrypt(BigInteger codedMessage)
 {
     //return ChineseRemainderTheorem.Solve(codedMessage, D, P, Q);
     return(FastModExponentiation.DoModPow(codedMessage, D, N));
 }
Exemplo n.º 2
0
        public static bool IsPrime(BigInteger number)
        {
            // handle evens
            if (number == 2)
            {
                return(true);
            }
            else if (number % 2 == 0)
            {
                return(false);
            }

            // get S
            var S = 1;

            while (((number - 1) % BigInteger.Pow(2, ++S)) == 0)
            {
                ;
            }
            S--;

            // get d
            var d = (number - 1) / BigInteger.Pow(2, S);

            //Console.WriteLine($"{S}, {d}");

            Random rnd = new Random();
            int    randomBase;

            // repeat 8 times to be sure :)
            for (int i = 0; i < 8; i++)
            {
                // get random base that meets gcd(b,n)=1 condition
                do
                {
                    randomBase = rnd.Next();
                } while (Euclidean.Simple(randomBase, number) != 1);


                if (FastModExponentiation.DoModPow(randomBase, d, number) != 1)
                {
                    bool existR = false;
                    for (int r = 0; r < S; r++)
                    {
                        if (FastModExponentiation.DoModPow(randomBase, d * (BigInteger.Pow(2, r)), number) == number - 1)
                        {
                            existR = true;
                            break;
                        }
                    }
                    if (existR)
                    {
                        continue;
                    }
                }
                else
                {
                    continue;
                }

                return(false);
            }

            return(true);
        }
Exemplo n.º 3
0
 public BigInteger Encrypt(BigInteger message)
 {
     //return ChineseRemainderTheorem.Solve(message, E, P, Q);
     return(FastModExponentiation.DoModPow(message, E, N));
 }