# In an integer array with N elements , find the minimum k elements? [duplicate]

Possible Duplicate:
Worst-case O(n) algorithm for doing k-selection

Given the following question :

``````In an integer array with N elements , find the minimum k elements (k << N)
``````

You can assume that `N` is a large number.

I'm thinking about a minimum heap , anyone has a better solution ?

Regards

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## marked as duplicate by Jerry Coffin, BlueRaja - Danny Pflughoeft, KillianDS, Mike Mackintosh, Jürgen ThelenAug 22 '12 at 16:48

Is this homework? –  David M Aug 21 '12 at 14:36
@DavidM: No! exam question (preparing for an exam) –  ron Aug 21 '12 at 14:36
Ah. Good luck ron! –  David M Aug 21 '12 at 14:37
The heap-based solution has running time O(N log N). I think the intention (since k<<N) is to find a solution with O(kN) running time (which may have better performance if k<<N). –  Martin B Aug 21 '12 at 14:38
–  Wug Aug 21 '12 at 14:43

If K << N, min heap is good enough because creation of heap is O(n), and if K << N selecting first K items is at most O(N), otherwise you could use selection algorithm to find Kth smallest element in `O(n)` then select numbers which are smaller than found item. (Sure if some numbers are equal to Kth element select till fill `K` items).

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A min heap might actually be slower than a naive implementation. I know for a fact that it's slower if k == 1. –  Wug Aug 21 '12 at 14:40
@SaeedAmiri: After finding the `Kth` smallest number , then I should use the Partition algorithm ? –  ron Aug 21 '12 at 14:40
@ron After you find the `Kth` smallest number, all you need to do is iterate the array again and any number `< Kth smallest` is in your solution, until you have `k` items. So `O(n) + O(n) = O(2n) ~ O(n)` –  NominSim Aug 21 '12 at 14:43
@ron, just iterate array, and select numbers which are smaller than or equal to Kth smallest number, then if number of found item is bigger than `K` drop some items which are equal to Kth smallest number. –  Saeed Amiri Aug 21 '12 at 14:43
@Wug, Sure for K=1,2,3 creating heap is not good, but when we don't know anything about `K` except `K << N`, we can't trust naive approach. e.g K = sqrt(N) << N, but naive approach causes to `n sqrt(n)` but heap is less than `O(n logn)` –  Saeed Amiri Aug 21 '12 at 14:45

Sort the array (quicksort or heapsort are great for integer arrays), and iterate to k

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Unless k is large, this is slower than k O(n) searches. –  dranxo Aug 21 '12 at 22:21

I think you can do this one in O(N*log(K)). Pseudocode:

``````haz array[N]
haz output[k] (itz a list)

i iteratez on array with array[N] az element:
i insertz element into output (i maintainz strict ordering)
i removez largest element of output when output size iz bigger than k
``````

Requires:

• N list removals from end (N * O(1))
• at most N sort-maintaining list inserts (N * O(log(listsize)))

list's size is bounded by K

Thus, O(N * log(K)) time.

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