# polynomial section of the AKS algorithm in Python

I need a bit of help with the polynomial section of the AKS algorithm.

I have read quite a few descriptions online. I have got the perfect power test working and I think my get_r() function is correct. I am not sure how to go about doing this part of the algorithm:

``````For a = 1 to square-root(totient(r) * log(n)):
if (X+a)^n != X^n+a (mod X^r − 1,n), output composite
``````

(Also see wikipedia article AKS primality test for a statement of the algorithm.)

Below are links to a program I wrote to implement the miller-rabin test and my (unfinished) aks code.

If someone can explain the maths or give me a bit of pseudocode, I should be okay. thanks

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related: AKS Primes algorithm in Python –  J.F. Sebastian Dec 26 '12 at 15:54
Well, first write something to computer `totient`. Then work out `square_root(totient(r) * log(n)`. Then, `for i in range(1, x)`, check whether the two values above are congruent (fast -- don't work them both out and then reduce!). Which bit of that do you have trouble with? –  katrielalex Dec 26 '12 at 16:17
Oh, thanks. X is a free variable, so do I test all X from 1 to a? –  antiloquax Dec 26 '12 at 16:58
sqrt(totient(r) * log(n)) is wrong in that wikipedia shows sqrt(totient(r)) * log(n) –  jwpat7 Dec 26 '12 at 17:09
Thanks jwpat7. I didn't spot that. –  antiloquax Dec 26 '12 at 17:20