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The Lucas-Lehmer primality test tests prime numbers to determine whether they are also Mersenne primes. One of the bottlenecks is the modulus operation in the calculation of (s**2 − 2) % (2**p - 1).

Using bitwise operations can speed things up considerably (see the L-L link), the best I have so far being:

def mod(n,p):
    """ Returns the value of (s**2 - 2) % (2**p -1)"""
    Mp = (1<<p) - 1
    while n.bit_length() > p: # For Python < 2.7 use len(bin(n)) - 2 > p
        n = (n & Mp) + (n >> p)
    if n == Mp:
        return 0
        return n

A simple test case is where p has 5-9 digits and s has 10,000+ digits (or more; not important what they are). Solutions can be tested by mod((s**2 - 2), p) == (s**2 - 2) % (2**p -1). Keep in mind that p - 2 iterations of this modulus operation are required in the L-L test, each with exponentially increasing s, hence the need for optimization.

Is there a way to speed this up further, using pure Python (Python 3 included)? Is there a better way?

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Your compiler should do this optimisation automati… oh, never mind. :p (Yes, I’m being a troll; this was just too tempting ;-)) –  Konrad Rudolph Mar 22 '11 at 15:21
Someone had posted an interesting suggestion to change to while n > Mp:, which worked (although I can't understand why) and was faster. –  Benjamin Mar 22 '11 at 16:01
You do not appear to be handling the special case where n = Mp which still fits in p bits but should be reduced to 1. Not sure if that matters - it will just get squared and reduced on the next iteration. –  phkahler Mar 22 '11 at 18:07

2 Answers 2

In the case where n is much longer than 2^p, you can avoid some quadratic-time pain by doing something like this:

def mod1(n,p):
    while n.bit_length() > 3*p:
        k = n.bit_length() // p
        k1 = k>>1
        k1p = k1*p
        M = (1<<k1p)-1
        n = (n & M) + (n >> k1p)
    Mp = (1<<p)-1
    while n.bit_length() > p:
        n = (n&Mp) + (n>>p)
    if n==Mp: return 0
    return n

[EDITED because I screwed up the formatting before; thanks to Benjamin for pointing this out. Moral: don't copy-and-paste from an Idle window into SO. Sorry!]

(Note: the criterion for halving the length of n rather than taking p off it, and the exact choice of k1, are both a bit wrong, but it doesn't matter so I haven't bothered fixing them.)

If I take p=12345 and n=9**200000 (yes, I know p then isn't prime, but that doesn't matter here) then this is about 13 times faster.

Unfortunately this will not help you, because in the L-L test n is never bigger than about (2^p)^2. Sorry.

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@Gareth McCaughan: There seems to be a formatting issue with the code? Ignoring lines 9-10, the n returned seems to be incorrect, that is mod1(n,p) != n % (2**p - 1) –  Benjamin Mar 22 '11 at 16:42
Formatting fixed -- thanks! So far as I can see, my mod1 returns the same values as your mod. Perhaps the test cases I'm trying are failing to provoke a bug; can you describe choices of n,p that make them disagree? (Or did you just not read my mind correctly about how to un-screw-up my broken formatting?) –  Gareth McCaughan Mar 22 '11 at 16:52
OK, works fine. It was just my interpretation of your indenting that was wrong. I'm still checking whether this can be an improvement... but it doesn't look like it, as you pointed out. –  Benjamin Mar 22 '11 at 16:55
In Lucas-Lehmer, you're repeatedly saying s = mod(s*s-2,p), so each value you pass in is the square of a value that's already been reduced mod p, so it's less than p^2, so it's not long enough for my code to be any better (even if you fix up the little suboptimalities I mentioned). This also means, I think, that you'll never actually do more than one iteration in your loop. Which gives me another idea, which I'll put in a separate answer. –  Gareth McCaughan Mar 22 '11 at 16:58
Er, no, actually you can sometimes have to do two iterations. That's a nuisance. –  Gareth McCaughan Mar 22 '11 at 17:07
up vote 0 down vote accepted

The best improvement I could find was removing Mp = (1<<p) - 1 from the modulus function altogether, and pre-calculating it in the L-L function before starting the iterations of the L-L test. Using while n > Mp: instead of while n.bit_length() > p: also saved some time.

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