Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

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

share|improve this question

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

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

    
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
1  
Related: stackoverflow.com/questions/7746648/… –  Wug Aug 21 '12 at 14:43

3 Answers 3

up vote 5 down vote accepted

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).

share|improve this answer
    
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

What about this:

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

share|improve this answer
    
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.

share|improve this answer

Not the answer you're looking for? Browse other questions tagged or ask your own question.