# program speed/unnecessary double-counting

I am trying to find the number of pairs in a list of numbers with a specific difference. Say, with the list

``````1 2 3 4 5
``````

and the difference target '2', I would want to print the number '3' because there are 3 pairs in this sequence with a difference of '2'. however, my code is super slow - it double-counts all of the pairs, and so I end up needing to divide my solutions by 2 to get the answer. Is there a way to accomplish this same task without double-counting? I appreciate any insights you might have. thanks! code is printed below

``````    import sys

def main():
solutions=0
pairs=[]
for i in xrange(len(numbers)):
for j in xrange(len(numbers)):
if i!=j:
pairs.append([numbers[i], numbers[j]])

for pair in pairs:
if abs(pair[0]-pair[1])==k:
solutions+=1
else:
continue
return solutions/2

if __name__ == '__main__':
n,k=map(int, lines[0].strip().split())
numbers=map(int, lines[1].strip().split())
print main()
``````
-
Will the list always be sorted? – Tim Jan 12 '13 at 5:51

For each element `i` in `a`, you want to check whether `i-diff` is also in `a`. For ~O(1) membership testing, we can use a set. Thus:

``````>>> a = [1,2,3,4,5]
>>> diff = 2
>>> a_set = set(a)
>>> sum(i-diff in a_set for i in a_set)
3
``````

which is O(len(a)).

[Note that I've used the fact that `i-diff in a_set`, which is a `bool`, evaluates to `1` as an `int`. This is equivalent to `sum(1 for i in a_set if i-diff in a_set)`.]

Update: it occurs to me that I've assumed that the numbers are unique. If they're not, that's okay, we could just use a `collections.Counter` instead to keep the multiplicity information.

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wonderful - thanks – user1799242 Jan 12 '13 at 6:14

If you sort the array, you would be able to find all the pairs just by walking the array instead of doing an O(n^2) search. And the reason for the double counting is that you used `abs` so it's finding not just (1,3) but also (3,1).

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-1 for now, no need to sort – sjr Jan 12 '13 at 6:01
Oh? How do you propose doing it exactly? – StilesCrisis Jan 12 '13 at 15:20
see the accepted answer, linear time (no sort) – sjr Jan 13 '13 at 7:00
Fair enough, but you do need to construct an entirely separate hash table copy, so there's a memory cost to think of. – StilesCrisis Jan 14 '13 at 5:02

Sort the array first, and then for each number(`num`) in the list you need to look for `num-2`. I guess the the fast way to do that is by `binary search`.

So, with binary search you'll get a `O(n log(n))` solution.

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This is still O(n**2). If you use a `set` instead of a `list` it would be substantially faster. – Tim Jan 12 '13 at 5:53
@Tim agreed, but I also suggested him a `binary search` based solution. – Ashwini Chaudhary Jan 12 '13 at 6:15