# parallelizing using openmp

I have this function which I would like to parallelize using openmp:

``````for(i=len-1;i>=0;i--){
if(bin[i]==49) // bin is a binary number & is
// stored in a string. 49 is ascii value of 1
{
s=(s*x)%n;
}
x=(x*x)%n;
}
``````

I tried using `#pragma omp parallel for` but it dint work. I tried with the reduction function too and yet I got wrong answers.
I think the reason is because value of s depends on x (which is dependent on each steps value).

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You are correct that the dependency on `x` causes problems. This dependency is between iterations. Each iteration requires the `x` from the previous iteration. So it renders the entire loop not parallelizable.

It looks like this loop is computing a power-modulus using repeated squaring.

So in short: No you won't be able to parallelize it. The dependency is inherent in the algorithm that you're using.

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So is there any other way to implement this to make it extremely fast? I am trying to implement RSA algorithm for large numbers. But for say for a 50 digit prime number it takes about 1 hour to decrypt. This function is taking too much time. –  user1019083 Nov 5 '11 at 8:15
Since you can't parallelize here, you'll need to do it at a higher level. If you have multiple of these powermods to do (and they are independent), you can do those in parallel. Though I'm not too familiar with the RSA algorithm so I don't know how much parallelism there is at higher levels. –  Mysticial Nov 5 '11 at 8:20
Ok i will check into that. Thank you so much. What about this loop? Is it possible to parallelize? for(i=0,k=0;i<n;i++,k++) { c=msg(a[i]); b[k++]=msg(c); } There is no dependency, so it should be possible to work out –  user1019083 Nov 5 '11 at 8:27
As long as `msg()` is re-entrant, then yes, it's parallelizable. (also, make sure that `a` and `b` don't overlap) –  Mysticial Nov 5 '11 at 8:32
so is #pragma omp parallel for reduction(+:i,k) right? –  user1019083 Nov 5 '11 at 8:38