# Lazy Sieve of Eratosthenes in Python

I am trying to code a lazy version of Sieve of Eratosthenes in Python 3.2. Here's the code:

``````import itertools
def primes():
candidates = itertools.count(2)
while True:
prime = next(candidates)
candidates = (i for i in candidates if i % prime)
yield prime
``````

However, when I iterate over primes(), I only get consecutive numbers. E.g.,

``````print(list(itertools.islice(primes(),0,10)))
``````

prints the list

``````[2, 3, 4, 5, 6, 7, 8, 9, 10, 11]
``````

To my surprise, the following tiny modification of primes() makes it work:

``````def primes():
candidates = itertools.count(2)
while True:
prime = next(candidates)
candidates = (i for i in candidates if i % prime)
next(itertools.tee(candidates)[1]) ########### NEW LINE
yield prime
``````

I am guessing I am missing something about the scope of the parameters of the generator

``````candidates = (i for i in candidates if i % prime)
``````

but I cannot see how to fix the code without adding this random-looking new line. Does anybody know what I am doing wrong? Thanks.

-
note that `next(itertools.tee(candidates)[1])` can be rewritten as `next(candidates)` or in python 2 `candidates.next()`. –  Dan D. Jul 16 '11 at 4:22
Could it be that `prime` is being bound only once rather than per loop iteration, meaning it doesn't remain constant per generator as expected? –  Joey Adams Jul 16 '11 at 4:26
–  Dan D. Apr 20 '12 at 23:58

the fix is really to replace:

``````candidates = (i for i in candidates if i % prime)
``````

with:

``````candidates = (lambda prime: (i for i in candidates if i % prime))(prime)
``````
-
We don't usually see self-evaluating functions like that in Python :) –  missingno Jul 16 '11 at 4:32
the key issue is in `(i for i in x if i % p)`, `x` is bound once at the start but `p` is looked up for each item. –  Dan D. Jul 16 '11 at 4:33
-1 Dude, that's plain wrong to build lambda functions that way. –  user780363 Jul 16 '11 at 8:19
@Franklin I disagree. In highly mathematical routines where consiceness and efficiency are important, I believe heavy and even complex use of higher-order functions is justified. +1. –  wberry Jul 16 '11 at 15:57
Ok... that works for me... if I only have to compute primes up to ~7900. After that, the sieve blows up with "RuntimeError: maximum recursion depth exceeded". Since I don't plan to recompile Python to change the recursion depth setting, I don't think this is a good method of computing primes for me... –  Dan H Apr 20 '12 at 13:37
show 1 more comment

If you are worried about the scope of the variables, create objects/functions to keep these variables for you:

``````def filter_multiples(n, xs):
for i in xs:
if i % n
yield i

def primes():
candidates = itertools.count(2)
while True:
prime = next(candidates)
candidates = filter_multiples(prime, candidates)
yield prime
``````

(I don't have access to a Pytho interpreter right now, so I don't konw if this actually works in the end or not...)

BTW, the algorithm you use is not really the sieve of Erastothenes. Take a look in this cool paper if you have some time: http://www.cs.hmc.edu/~oneill/papers/Sieve-JFP.pdf

-
You might be interested in looking at an implementation of the genuine sieve in Python stackoverflow.com/a/10254923/388787 –  Dan D. Apr 20 '12 at 23:54

Here is a Python implementation of the genuine prime sieve based on the haskell code in the paper: The Genuine Sieve of Eratosthenes by Melissa E. O'Neill

It does not use recursion or trial division but is rather memory hungry.

``````from heapq import heappush, heappop, heapreplace
def sieve():
w = [2,4,2,4,6,2,6,4,2,4,6,6,2,6,4,2,6,4,6,8,4,2,4,2,4,8,6,4,6,2,4,6,2,6,6,4,2,4,6,2,6,4,2,4,2,10,2,10]
for p in [2,3,5,7]: yield p
n,o = 11,0
t = []
l = len(w)
p = n
heappush(t, (p*p,n,o,p))
yield p
while True:
n,o = n+w[o],(o+1)%l
p = n
if not t[0][0] <= p:
heappush(t, (p*p,n,o,p))
yield p
continue
while t[0][0] <= p:
_,b,c,d = t[0]
heapreplace(t, (b*d,b+w[c],(c+1)%l,d))
``````

The following:

``````import itertools
print list(itertools.islice(sieve(),0,10))
``````

prints:

``````[2, 3, 5, 7, 11, 13, 17, 19, 23, 29]
``````
-
I'm sure this is correct (it works!) but I have absolutely no idea what any of it means. Please, at the very least, use more descriptive variable names! –  Benjamin Hodgson Oct 3 '12 at 23:12
+1, very interesting paper. –  eugene y Jun 18 '13 at 15:00