Here is a (slightly messy) attempt at Project Euler Problem 49.

I should say outright that the `deque`

was not a good choice! My idea was that shrinking the set of primes to test for membership would cause the loop to accelerate. However, when I realised that I should have used a `set`

(and not worry about removing elements), I got a 60x speed-up.

```
from collections import deque
from itertools import permutations
from .sieve import sieve_of_erastothenes # my own implementation of the Sieve of Erastothenes
primes = deque(prime for prime in sieve_of_erastothenes(10000) if prime > 1000 and prime != 1487) # all four-digit primes except 1487
try:
while True:
prime = primes.popleft() # decrease the length of primes each time to speed up membership test
for inc in xrange(1,10000 + 1 - (2 * prime)): # this limit ensures we don't end up with results > 10000
inc1 = prime + inc
inc2 = prime + 2*inc
if inc1 in primes and inc2 in primes:
primestr = str(prime)
perms = set(''.join(tup) for tup in permutations(primestr)) # because permutations() returns tuples
inc1str = str(inc1)
inc2str = str(inc2)
if inc1str in perms and inc2str in perms:
print primestr + inc1str + inc2str
raise IOError # I chose IOError because it's unlikely to be raised
# by anything else in the block. Exceptions are an easy
# way to break out of nested loops.
except IOError:
pass
```

Anyway, before I thought to use a `set`

, I tried it out in Pypy. I found the results to be rather suprising:

```
$ time python "problem49-deque.py"
296962999629
real 1m3.429s
user 0m49.779s
sys 0m0.335s
$ time pypy-c "problem49-deque.py"
296962999629
real 5m52.736s
user 5m15.608s
sys 0m1.509s
```

Why is Pypy over five times slower on this code? I would guess that Pypy's version of the `deque`

is the culprit (because it runs faster on the `set`

version), but I have no idea why that is.