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An unsorted array is given and we need to find top 5 elements in an efficient way and we cannot sort the list .

My solution :

  • Find the max element in the array. O(n)

  • Delete this max element after processing/using it.

  • Repeat step 1 & 2 , k times ( 5 times in this case ).

Time Complexity : O(kn) / O(n) , Space Complexity : O(1).

I think we can find the max element in O(logN) , So it can be improved to O(klogN). Please correct me if I am wrong.

Can we do better than this ? Using max-heap would be inefficient I guess?

PS - This is not any homework.

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I don't think you can do any better than O(N) when it comes to finding the max element in an unsorted array. What did you have in mind? – Kevin Aug 17 '12 at 18:44
Why don't you track the top 5 (or k) elements as you traverse the array and then delete them when you are done? That will be O(n) [or O(logN) if you improve your search algorithm as you say]. – Peter Gluck Aug 17 '12 at 18:44
Sorry, you can't find the max element in an unsorted array in O(log n) time. You can do it in a sorted array doing e.g. binary search. But in a sorted array, your problem has a trivial O(1) solution, too. – 9000 Aug 17 '12 at 18:50
I was thinking of find max element using divide and conquer – h4ck3d Aug 17 '12 at 18:56
But I just figured out it won't be logN. thanks for correcting me . It will be O(3n/2) == O(n). – h4ck3d Aug 17 '12 at 18:58
up vote 8 down vote accepted

If you can use an auxiliary heap (a min heap with minus element at top) you can do that in O(nlogm), where n is the list length and m the number of max elements to keep track of.

Since the aux heap has a fixed max size (5) I think that operations on that structure can be considered O(1). In that case the complexity is O(n).

Pseudo code:

foreach element in list:
    if aux_heap.size() < 5  
    else if element > aux_heap.top()
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In the general case this is O(nlogk), although I agree it is superior is k = 5. – cmh Aug 17 '12 at 18:53
By Auxiliary list do you mean extra space ? Like an extra array ? Or is it something else? – h4ck3d Aug 17 '12 at 18:59
@sTEAK: yes extra space. But of course I think it's necessary even with your solution, since you remove the elements from the original list and I guess put them somewhere else. – Heisenbug Aug 17 '12 at 19:07
In general case it's O(nk), since insertion to list is O(k). – sdcvvc Aug 17 '12 at 19:11
@Heisenbug is it better than my solution? is it being done in one traversal ? or is it also O(nk) – h4ck3d Aug 17 '12 at 19:12

Using a partial quicksort we can achieve O(n), this doesn't require any auxiliary space. Using a max heap, as in the other solution requires O(n log k) time.

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