how code a function similar to itertools.product in python 2.5

I have a list of tuples, e.g:

``````A=[(1,2,3), (3,5,7,9), (7)]
``````

and want to generate all permutations with one item from each tuple.

``````1,3,7
1,5,7
1,7,7
...
3,9,7
``````

I can have any number of tuples and a tuple can have any number of elements. And I can't use `itertools.product()` because python 2.5.

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Note that you will need to redefine your A. When you say `A=[(1,2,3),(3,5,7,9),(7)]` the `(7)` at the end is evaluated as an integer, not a tuple. Therefore it's not iterable, and `product(*A)` will throw a TypeError. If you say `A=(1,2,3),(3,5,7,9),(7,)]` then `product(*A)` will work. –  unutbu Nov 5 '09 at 15:57
Ok, I see, but this was a too simple example. I have A as a list of lists of 3-number tuples. But I want to remove the outer list and get A = lists of 3-number tuples. How do I do that? Better to make this a new beginner python question i think. –  lgwest Nov 5 '09 at 22:23

docs of `itertools.product` have an example of how to implement it in py2.5:

``````def product(*args, **kwds):
# product('ABCD', 'xy') --> Ax Ay Bx By Cx Cy Dx Dy
# product(range(2), repeat=3) --> 000 001 010 011 100 101 110 111
pools = map(tuple, args) * kwds.get('repeat', 1)
result = [[]]
for pool in pools:
result = [x+[y] for x in result for y in pool]
for prod in result:
yield tuple(prod)
``````
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Aside from that `(*args, repeat=1)` doesn't work in Python 2.5... –  ephemient Nov 5 '09 at 15:35
fixed that, I've accidentally copied the example from py3.1 docs. –  SilentGhost Nov 5 '09 at 15:40

The itertools documentation contains full code showing what each function is equivalent to. The `product` implementation is here.

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Thanks, I was to fast to ask I think. –  lgwest Nov 5 '09 at 22:25
``````def product(*iterables):
""" Equivalent of itertools.product for versions < 2.6,
which does NOT build intermediate results.
Omitted 'repeat' option.
product('ABCD', 'xy') --> Ax Ay Bx By Cx Cy Dx Dy
"""
nIters = len(iterables)
lstLenths = []
lstRemaining = [1]
for i in xrange(nIters-1,-1,-1):
m = len(iterables[i])
lstLenths.insert(0, m)
lstRemaining.insert(0, m * lstRemaining[0])
nProducts = lstRemaining.pop(0)

for p in xrange(nProducts):
lstVals = []

for i in xrange(nIters):
j = p/lstRemaining[i]%lstLenths[i]
lstVals.append(iterables[i][j])
yield tuple(lstVals)
``````
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When playing around with generators, I too found a version of `itertools.product`, and it is almost as fast as the (native) library version, while being 100% compatible with it, and it does not build intermediate results:

``````def product(*args, **kwds):
"Alternative fast implementation of product for python < 2.6"
def cycle(sequence, uplevel):
while True:
vals = next(uplevel)   # advance upper level, raises if done
it = iter(sequence)    # (re-)start iteration of current level
try:
while True: yield vals + (next(it),)
except StopIteration:
pass

step = iter(((),))
for pool in map(tuple, args)*kwds.get('repeat', 1):
step = cycle(pool, step)   # build stack of iterators
return step
``````

With python 2.7.3, I found the performance to be really good (usually only about a factor of 2 slower with essentially the same memory usage).

``````>>> from itertools import takewhile, product as itt_product
>>> timeit takewhile(True, itt_product(range(20), range(3), range(150)))
100000 loops, best of 3: 3.31 us per loop
>>> timeit takewhile(True, product(range(20), range(3), range(150)))
100000 loops, best of 3: 6.44 us per loop
``````
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