I need to count the number of times that particular pairs of integers occur in some process (a heuristic detecting similar images using locality sensitive hashing - integers represent images and the "neighbours" below are images that have the same hash value, so the count indicates how many different hashes connect the given pair of images).

The counts are stored as a map from (ordered) pair to count (`matches`

below).

The input (`nbrs-list`

below) is a list of a list of integers that are considered neighbours, where every distinct (ordered) pair in the inner list ("the neighbours") should be counted. So, for example, if `nbrs-list`

is `[[1,2,3],[10,8,9]]`

then the pairs are `[1,2],[1,3],[2,3],[8,9],[8,10],[9,10]`

.

The routine `collect`

is called multiple times; the `matches`

parameter accumulates results and the `nbrs-list`

is new on each call. The smallest number of neighbours (size of the inner list) is 1 and the largest ~1000. Each integer in `nbrs-list`

occurs just once in any call to `collect`

(*this implies that, on each call, no pair occurs more than once*) and the integers cover the range 0 - 1,000,000 (so the size of `nbrs-list`

is less than 1,000,000 - since each value occurs just once and sometimes they occur in groups - but typically larger than 100,000 - as most images have no neighbours).

I have pulled the routines out of a larger chunk of code, so they may contain small edit errors, sorry.

```
(defn- flatten-1
[list]
(apply concat list))
(defn- pairs
([nbrs]
(let [nbrs (seq nbrs)]
(if nbrs (pairs (rest nbrs) (first nbrs) (rest nbrs)))))
([nbrs a bs]
(lazy-seq
(let [bs (seq bs)]
(if bs
(let [b (first bs)]
(cons (if (> a b) [[b a] 1] [[a b] 1]) (pairs nbrs a (rest bs))))
(pairs nbrs))))))
(defn- pairs-map
[nbrs]
(println (count nbrs))
(let [pairs-list (flatten-1 (pairs nbrs))]
(apply hash-map pairs-list)))
(defn- collect
[matches nbrs-list]
(let [to-add (map pairs-map nbrs-list)]
(merge-with + matches (apply (partial merge-with +) to-add))))
```

So the above code expands each set of neighbours to ordered pairs; creates a map from pairs to `1`

; then combines maps using addition of values.

I'd like this to run faster. I don't see how to avoid the O(n^2) expansion of pairs, but I imagine I can at least reduce the constant overhead by avoiding so many intermediate structures. At the same time, I'd like the code to be fairly compact and readable...

Oh, and now I am exceeding the "GC overhead limit". So reducing memory use/churn is also a priority :o)

[Maybe this is too specific? I am hoping the lessons are general and haven't seem many posts about optimising "real" clojure code. Also, I can profile etc, but my code seems so ugly I am hoping there's an obvious, cleaner approach - particularly for the pairs expansion.]

`pairs`

can be done using`combinations`

function from clojuredocs.org/clojure_contrib/clojure.contrib.combinatorics/… – Ankur May 29 '12 at 14:55