# Get the N smallest [Comparable] items in a set

I have an unsorted Collection of objects [that are comparable], is it possible to get a sub list of the collection of the list without having to call sort?

I was looking at the possibility of doing a SortedList with a limited capacity, but that didn't look like the right option.

I could easily write this, but I was wondering if there was another way.

I am not able to modify the existing collection's structure.

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Since you don't want to call `sort()`, it seems like you are trying to avoid an O(n log(n)) runtime cost. There is actually a way to do that in O(n) time -- you can use a selection algorithm.

There are methods to do this in the Guava libraries (Google's core Java libraries); look in `Ordering` and check out:

These are implementations of quickselect, and since they're written generically, you could just call them on your `Set` and get a list of the `k` smallest things. If you don't want to use the entire Guava libraries, the docs link to the source code, and I think it should be straightforward to port the methods to your project.

If you don't want to deviate too far from the standard libraries, you can always use a sorted set like `TreeSet`, though this gets you logarithmic insert/remove time instead of the nice O(1) performance of the hash-based `Set`, and it ends up being O(n log(n)) in the end. Others have mentioned using heaps. This will also get you O(n log(n)) running time, unless you use some of the fancier heap variants. There's a fibonacci heap implementation in GraphMaker if you're looking for one of those.

Which of these makes sense really depends on your project, but I think that covers most of the options.

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I've never heard of that library before. Thanks! :D –  monksy Mar 29 '11 at 5:32

I would probably create a sorted set. Insert the first N items from your unsorted collection into your sorted set. Then for the remainder of your unsorted collection:

1. insert each item in the sorted set
2. delete the largest item from the sorted set
3. Repeat until you've processed all items in the unsorted collection
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Thats not a bad solution, since it still is considered to be n operations on my part. [Yes, there is sorting on the SortedSet's part] –  monksy Mar 29 '11 at 5:08
This only works if the initial collection is a Set. If it is a list, then the sorted set will discard duplicates ... –  Stephen C Mar 29 '11 at 5:20
Well you could use a SortedBag to solve that: bit.ly/e2mave. But there are also less expensive options than sorting the whole data set. –  tgamblin Mar 29 '11 at 5:48
If you want to go this way, a PriorityQueue would be much more efficient. –  Kevin Bourrillion Mar 29 '11 at 7:59
It appears that if you want the results in sorted order, then yeah, sometimes a SortedSet can beat a PQ. My mistake. However, Ordering.leastOf() (the current top-rated answer) is 3-5x faster than either of these anyway. –  Kevin Bourrillion Mar 29 '11 at 20:17
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Yes, you can put all of them into a max heap data structure with a fixed size of N, conditionally, if the item is smaller than the largest in the max heap (by checking with the `get()` "peek" method). Once you have done so they will, by definition, be the N smallest. Optimal implementations will perform with `O(M)+lg(N)` or `O(M)` (where M is the size of the set) performance, which is theoretically fastest. Here's some pseudocode:

``````MaxHeap maxHeap = new MaxHeap(N);
for (Item x : mySetOfItems) {
if (x < maxHeap.get()) {