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I have a list comprehension that looks like this:

cart = [ ((p,pp),(q,qq)) for ((p,pp),(q,qq))\
         in itertools.product(C.items(), repeat=2)\
         if p[1:] == q[:-1] ]

C is a dict with keys that are tuples of arbitrary integers . All the tuples have the same length. Worst case is that all the combinations should be included in the new list. This can happen quite frequently.

As an example, I have a dictionary like this:

C = { (0,1):'b',
      (0,0):'d' }

And I want the the result to be:

cart = [ (((2, 0), 'c'), ((0, 1), 'b'))
         (((2, 0), 'c'), ((0, 0), 'd'))
         (((0, 0), 'd'), ((0, 1), 'b'))
         (((0, 0), 'd'), ((0, 0), 'd')) ]

So, by overlap I am referring to, for instance, that the tuples (1,2,3,4) and (2,3,4,5) have the overlapping section (2,3,4). The overlapping sections must be on the "edges" of the tuples. I only want overlaps that have length one shorter than the tuple length. Thus (1,2,3,4) does not overlap with (3,4,5,6). Also note that when removing the first or last element of a tuple we might end up with non-distinct tuples, all of which must be compared to all the other elements. This last point was not emphasized in my first example.

The better part of my codes execution time is spent in this list comprehension. I always need all elements of cart so there appears to be no speedup when using a generator instead.

My question is: Is there a faster way of doing this?

A thought I had was that I could try to create two new dictionaries like this:

aa = defaultdict(list)
bb = defaultdict(list)
[aa[p[1:]].append(p) for p in C.keys()]
[bb[p[:-1]].append(p) for p in C.keys()]

And somehow merge all combinations of elements of the list in aa[i] with the list in bb[i] for all i, but I can not seem to wrap my head around this idea either.


Both the solution added by tobias_k and shx2 have better complexity than my original code (as far as I can tell). My code is O(n^2) whereas the two other solutions are O(n). For my problem size and composition however, all three solutions seem to run at more or less the same time. I suppose this has to do with a combination of overhead associated with function calls, as well as the nature of the data I am working with. In particular the number of different keys, as well as the actual composition of the keys, seem to have a large impact. The latter I know because the code runs much slower for completely random keys. I have accepted tobias_k's answer because his code is the easiest to follow. However, i would still greatly welcome other suggestions on how to perform this task.

share|improve this question
Don't use list comprehensions for their side effects. Use a normal for loop instead, there is a cost to build a list you are discarding again. – Martijn Pieters Mar 8 '13 at 11:11
the first version of my code had a regular for loop with a continue if p[1:] != q[0:lvl]. That was (to my surprise) slower than the code I have provided in my question. – inconvergent Mar 8 '13 at 11:15
can you explain more clearly what the code is meant to do? perhaps by showing some simple examples? and what is the "*2" needed for? in particular, you seem to be mixing keys and values as if they are the same type of thing, yet say nothing about values. – andrew cooke Mar 8 '13 at 11:45
Please explain in more detail what you mean by "overlap". And what exactly is lvl? If it is the length of the tuples p and q, i.e. 2, won't q[0:lvl] be just q? Also, given the cart list comprehension and your example dict I can not reproduce your results. If lvl is 2 the result is empty and if lvl is 1 I get one additional element in the cart list. – tobias_k Mar 8 '13 at 14:38
1 Could you add this bit about the overlap to your question? Also, note that the length of the tuples should be lvl+1, not lvl-1. (Or, just write q[:-1], which has the same effect and is much clearer.) – tobias_k Mar 8 '13 at 15:01
up vote 2 down vote accepted

You were actually on the right track, using the dictionaries to store all the prefixes to the keys. However, keep in mind that (as far as I understand the question) two keys can also overlap if the overlap is less than len-1, e.g. the keys (1,2,3,4) and (3,4,5,6) would overlap, too. Thus we have to create a map holding all the prefixes of the keys. (If I am mistaken about this, just drop the two inner for loops.) Once we have this map, we can iterate over all the keys a second time, and check whether for any of their suffixes there are matching keys in the prefixes map. (Update: Since keys can overlap w.r.t. more than one prefix/suffix, we store the overlapping pairs in a set.)

def get_overlap(keys):
    # create map: prefix -> set(keys with that prefix)
    prefixes = defaultdict(set)
    for key in keys:
        for prefix in [key[:i] for i in range(len(key))]:
    # get keys with matching prefixes for all suffixes
    overlap = set()
    for key in keys:
        for suffix in [key[i:] for i in range(len(key))]:
            overlap.update([(key, other) for other in prefixes[suffix]
                                                      if other != key])
    return overlap

(Note that, for simplicity, I only care about the keys in the dictionary, not the values. Extending this to return the values, too, or doing this as a postprocessing step, should be trivial.)

Overall running time should be only 2*n*k, n being the number of keys and k the length of the keys. Space complexity (the size of the prefixes map) should be between n*k and n^2*k, if there are very many keys with the same prefixes.

Note: The above answer is for the more general case that the overlapping region can have any length. For the simpler case that you consider only overlaps one shorter than the original tuple, the following should suffice and yield the results described in your examples:

def get_overlap_simple(keys):
    prefixes = defaultdict(list)
    for key in keys:
    return [(key, other) for key in keys for other in prefixes[key[1:]]]
share|improve this answer
Thanks a lot! I have tried to be more precise in my definition of overlap in the main question. I will be testing the code when I have the time, and I will select an answer and update my question as soon as I can. – inconvergent Mar 8 '13 at 16:49
I'm sorry about this, but it turns out that I didn't think my example through enough. I have updated the question with a new example dict. – inconvergent Mar 8 '13 at 19:29

Your idea of preprocessing the data into a dict was a good one. Here goes:

from itertools import groupby
C = { (0,1): 'b', (2,0): 'c', (0,0): 'd' }

def my_groupby(seq, key):
     >>> group_by(range(10), lambda x: 'mod=%d' % (x % 3))
     {'mod=2': [2, 5, 8], 'mod=0': [0, 3, 6, 9], 'mod=1': [1, 4, 7]}
    groups = dict()
    for x in seq:
        y = key(x)
        groups.setdefault(y, []).append(x)
    return groups

def get_overlapping_items(C):
    prefixes = my_groupby(C.iteritems(), key = lambda (k,v): k[:-1])
    for k1, v1 in C.iteritems():
        prefix = k1[1:]
        for k2, v2 in prefixes.get(prefix, []):
            yield (k1, v1), (k2, v2)

for x in get_overlapping_items(C):
    print x     

(((2, 0), 'c'), ((0, 1), 'b'))
(((2, 0), 'c'), ((0, 0), 'd'))
(((0, 0), 'd'), ((0, 1), 'b'))
(((0, 0), 'd'), ((0, 0), 'd'))

And by the way, instead of:



itertools.product(C.items(), repeat=2)
share|improve this answer
Thanks for the tip on repeat=2. Your code looks very promising. I will select an answer when I have played around with this a little more. – inconvergent Mar 8 '13 at 16:50
This answer worked for my first example. However, I realized that what the list comprehension in my code does is not quite the same. I have updated the question. Again. – inconvergent Mar 8 '13 at 19:26
ok, I updated my answer to use a slightly different group-by semantics. – shx2 Mar 8 '13 at 19:50
Thank you. This seems to work very nice. (That is, it passes all my unit tests) However it runs at almost the exact same speed as my original code. – inconvergent Mar 8 '13 at 20:13
The solution I suggested is O(n), n being len(C), and yours is O(N**2). The extra overhead in my solution is due to the fact it creates another copy of the data (by calling my_groupby), which probably cancels out the improved complexity, for n ~ 10000. – shx2 Mar 8 '13 at 21:16

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