# How to optimize this algorithm. Two Dictionaries and searching for a specific value

I have 2 Dictionaries. I am trying to optimize this code to run as fast as possible.

edit: Sorry, this is for solving Shanks Baby Step Giant Step Algorithm
Algorithm:

``````Given b = a^x (mod p)
First choose n, such that n^2 >= p-1
Then create 2 lists:
1. a^j (mod p) for 0 <= j < n
2. b*(a(inverse)^n)^k for 0 <= k < n
Finally look for a match between the 2 lists.

public static BigInteger modInverse(BigInteger a, BigInteger n)
{
BigInteger i = n, v = 0, d = 1;
while (a > 0)
{
BigInteger t = i / a, x = a;
a = i % x;
i = x;
x = d;
d = v - t * x;
v = x;
}
v %= n;
if (v < 0) v = (v + n) % n;
return v;
}

static int Main()
{
BigInteger r = 92327518017225,
rg,
temp,
two=2,
tm,
n = ((BigInteger)Math.Sqrt(247457076132467-1))+1,
mod = 247457076132467;
Dictionary<int, BigInteger> b = new Dictionary<int, BigInteger>();
Dictionary<int, BigInteger> g = new Dictionary<int, BigInteger>();
temp = modInverse(two, mod);
temp = BigInteger.ModPow(temp, n, mod);
for (int j = 0; (BigInteger)j < n; j++)
{
rg = r * BigInteger.ModPow(temp, j, mod);
}
for (int i = 0; (BigInteger)i < n ; i++)
{
tm = BigInteger.ModPow(2, i, mod);
foreach (KeyValuePair<int, BigInteger> d in g)
{
if (d.Value.Equals(tm))
{
Console.WriteLine("j={0}   B*t^j(mod m) = {1}",d.Key,d.Value);
Console.WriteLine("a^"+i+" = "+tm);
}
}
}
return 0;
}
``````
-
–  thedev Sep 21 '11 at 7:57
Explaining briefly the algorithm instead of just dumping uncommented code would be nice. –  jv42 Sep 21 '11 at 8:00
What is it that you are doing? What is the reason for using dictionaries, as you are not looking up values in them? –  Guffa Sep 21 '11 at 8:01
Do you really need BigInteger? Would an Int64 suffice? –  Skizz Sep 21 '11 at 8:06
would using int64 over BigInteger really change speed a lot? Sorry if that is a dumb question. I am still just a beginner to programming –  Nook Sep 21 '11 at 8:11