I have got a list of >10.000 int items. The values of the items can be very high, up to 10^27. Now I want to create all pairs of the items and calculate their sum. Then I want to look for different pairs with the same sum.

For example:

```
l[0] = 4
l[1] = 3
l[2] = 6
l[3] = 1
...
pairs[10] = [(0,2)] # 10 is the sum of the values of l[0] and l[2]
pairs[7] = [(0,1), (2,3)] # 7 is the sum of the values of l[0] and l[1] or l[2] and l[3]
pairs[5] = [(0,3)]
pairs[9] = [(1,2)]
...
```

The contents of `pairs[7]`

is what I am looking for. It gives me two pairs with the same value sum.

I have implemented it as follows - and I wonder if it can be done faster. Currently, for 10.000 items it takes >6 hours on a fast machine. (As I said, the values of `l`

and so the keys of `pairs`

are ints up to 10^27.)

```
l = [4,3,6,1]
pairs = {}
for i in range( len( l ) ):
for j in range(i+1, len( l ) ):
s = l[i] + l[j]
if not s in pairs:
pairs[s] = []
pairs[s].append((i,j))
# pairs = {9: [(1, 2)], 10: [(0, 2)], 4: [(1, 3)], 5: [(0, 3)], 7: [(0, 1), (2, 3)]}
```

**Edit:** I want to add some background, as asked by Simon Stelling.

The goal is to find Formal Analogies like

```
lays : laid :: says : said
```

within a list of words like

```
[ lays, lay, laid, says, said, foo, bar ... ]
```

I already have a function `analogy(a,b,c,d)`

giving `True`

if `a : b :: c : d`

. However, I would need to check all possible quadruples created from the list, which would be a complexity of around O((n^4)/2).

As a pre-filter, I want to use the char-count property. It says that every char has the same count in (a,d) and in (b,c). For instance, in "layssaid" we have got 2 a's, and so we do in "laidsays"

So the idea until now was

- for every word to create a "char count vector" and represent it as an integer (the items in the list
`l`

) - create all pairings in
`pairs`

and see if there are "pair clusters", i.e. more than one pair for a particular char count vector sum.

And it works, it's just slow. The complexity is down to around O((n^2)/2) but this is still a lot, and especially the dictionary lookup and insert is done that often.

`O(n^2)`

– blubb May 6 '11 at 12:15