# Good algorithms to determine whether one number is prime? [duplicate]

Possible Duplicate:
Checking if an int is prime more efficiently

I need to test some very large integer to see whether it is a prime. Could you provide some good algorithms or library routines?

EDIT: C/C++ would be OK.

Thanks.

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How large is very large? –  LukeH Sep 7 '10 at 14:06
Odd, this title is a duplicate of that title, but this question is not a duplicate of that question (which actually wants to test more than just one prime in a run). –  Steve Jessop Sep 7 '10 at 14:11
to get library recommendations, you need to select a language, or range of languages you can use. C? Haskell? Javascript? –  Steve Jessop Sep 7 '10 at 14:14
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## marked as duplicate by KennyTM, duffymo, Gabe, bmargulies, Moron Sep 8 '10 at 2:45

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

## 2 Answers

The Miller-Rabin test is very fast, and it can be both fast and deterministic for certain ranges of numbers.

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I heard of this before, pretty awesome running time on this algorithm as well, thanks for the link! –  Zoidberg Sep 7 '10 at 14:07
`openssl prime` uses the Miller-Rabin algorithm. –  Adam Musch Sep 7 '10 at 14:11
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The easiest option would be use use an existing big integer library. It won't have bugs, and it will provide all the supporting functions.

If you are writing your own implementation (i.e. for an assignment), I'd recommend working from a pseudo code algorithm in a book so that you understand what you are doing.

That being said, one of the simplest methods is to use Jacobi and Legendre, and compare for equality. I just submitted an assignment for RSA encryption. Here is what I did for single precision, however the algorithms are general and work for multiple precision integers too.

``````typedef uint64_t BigIntT;
typedef int64_t SBigIntT;

// This function calculations the power of b^e mod phi
// As long as
//      b*b is smaller than max(BigIntT)
//      b*phi is smaller than max(BigIntT)
// we will not have overflow.
BigIntT calculatePower (BigIntT b, BigIntT e, BigIntT m) {
BigIntT result = 1;

while (e != 0) {
if (e & 1) {
result = (result * b) % m;
}

e = e >> 1;
b = (b * b) % m;
}

return result;
}

// This function implements simple jacobi test.
// We can expect compiler to perform tail-call optimisation.
SBigIntT jacobi (SBigIntT a, SBigIntT b) {
if (a == 0 || a == 1) {
return a;
} else if (a % 2 == 0) {
if (((b*b - 1) / 8) % 2 == 0) {
return jacobi(a/2, b);
} else {
return -jacobi(a/2, b);
}
} else if ((((a-1) * (b-1)) / 4) % 2 == 0) {
return jacobi(b % a, a);
} else {
return -jacobi(b % a, a);
}
}

// This function implements : http://en.wikipedia.org/wiki/Solovay-Strassen_primality_test
bool testPrime (BigIntT p) {
int tests = 10;

if (p == 2) {
return true;
}

while (tests-- > 0) {
BigIntT a = generateRandomNumber(2, p);

if (greatestCommonDivisor(a, p) == 1) {
BigIntT l = calculatePower(a, (p-1)/2, p);
SBigIntT j = jacobi(a, p);

// j % p == l
if ((j == -1) && (l == p-1) || (j == l)) {
// So far so good...
} else {
// p is composite
return false;
}
} else {
// p is composite
return false;
}
}

return true;
}
``````
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"We can expect compiler to perform tail-call optimisation" - out of interest, did you test that? I wouldn't trust a C compiler to do tail-call optimisation, and certainly not when the return value is -1 * the result of the recursive call. –  Steve Jessop Sep 7 '10 at 15:07
Steve, obviously it will depend on the quality of your compiler; no, I haven't tested it. I just expect any sufficiently advanced compiler should be able to do the transform. –  Mr Samuel Sep 7 '10 at 15:29
Steve, I just tested it in LLVM and it does tail call optimisation : syntax-highlighting.com/p/show?id=1298 –  Mr Samuel Sep 7 '10 at 15:35
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