I'm attempting to learn python and I thought trying to develop my own prime sieve would be an interesting problem for the afternoon. When required thus far, I would just import a version of the Sieve of Eratosthenes that I found online -- it's this that I used as my benchmark.
After trying several different optimizations, I thought I had written a pretty decent sieve:
def sieve3(n): top = n+1 sieved = dict.fromkeys(xrange(3,top,2), True) for si in sieved: if si * si > top: break if sieved[si]: for j in xrange((si*2) + si, top, si*2): [****] sieved[j] = False return  + [pr for pr in sieved if sieved[pr]]
Using the first 1,000,000 integers as my range, this code would generate the correct number of primes and was only about 3-5x slower than my benchmark. I was about to give up and pat myself on the back when I tried it on a larger range, but it no longer worked!
n = 1,000 -- Benchmark = 168 in 0.00010 seconds n = 1,000 -- Sieve3 = 168 in 0.00022 seconds n = 4,194,304 -- Benchmark = 295,947 in 0.288 seconds n = 4,194,304 -- Sieve3 = 295,947 in 1.443 seconds n = 4,194,305 -- Benchmark = 295,947 in 3.154 seconds n = 4,194,305 -- Sieve3 = 2,097,153 in 0.8465 seconds
I think the problem comes from the line with
[****], but I can't figure out why it's so broken. It's supposed to mark each odd multiple of 'j' as False and it works most of the time, but for anything above 4,194,304 the sieve is broken. (To be fair, it breaks on random other numbers too, like 10,000 for instance).
I made a change and it significantly slowed my code down, but it would actually work for all values. This version includes all numbers (not just odds) but is otherwise identical.
def sieve2(n): top = n+1 sieved = dict.fromkeys(xrange(2,top), True) for si in sieved: if si * si > top: break if sieved[si]: for j in xrange((si*2), top, si): sieved[j] = False return [pr for pr in sieved if sieved[pr]]
Can anyone help me figure out why my original function (sieve3) doesn't work consistently?
Edit: I forgot to mention, that when Sieve3 'breaks', sieve3(n) returns n/2.