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Fastest primality test

Can somebody give an efficient algorithm for determining the primality of an number?

The conventional iteration method seems to take a lot of time when testing primality of large numbers. I have tried some probabilistic algorithms but was not satisfied by the accuracy.

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marked as duplicate by Nasreddine, Shawn Chin, Peter G., Jens Gustedt, Jefromi Nov 15 '11 at 18:52

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.

As far as I know, you will always have a trade off between accuracy and efficiency when you use a primality test. I have only used the Miller Rabin primality test, but I think you will have to more precises in what you are doing. – Lucas Nov 15 '11 at 18:38
Also, just choose a sufficiently large k. 2^-k (or any n^-k for n > 1) gets small exponentially fast (read: VERY FAST). – Thomas Eding Nov 15 '11 at 18:45
Wow, there are a lot more duplicates than that - just search for primality test. – Jefromi Nov 15 '11 at 18:52

1 Answer 1

On of the most efficient probabilistic primality tests is the Rabin-Miller primality test (implementation in C). This is what RSA uses.

Deterministic tests are more difficult if you need speed and are seldomly useful in real world applications.

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