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Suppose I have a minimum heap of size n. I want to find smallest k elements without changing the original min-heap. Run-time should be theta(k^2). I can use memory theta(k).

How can I do it?

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1 Answer 1

up vote 9 down vote accepted

Here is a pseducode example:

candidates.add((heap[heap.root],heap.root))
while len(result)<k:
  (min_value,i)=candidates.remove_min()
  result.append(min_value)
  l=heap.left_child(i)
  r=help.right_child(i)
  candidates.add((heap[l],l))
  candidates.add((heap[r],r))

It is assumed that the heap has indices, and you can retrieve the value at any index using heap[index]. The index of the root, containing the minimum value, is heap.root. candidates is a secondary min heap, initially empty, containing pairs of values and heap indices. The minimum values are stored in result, in order.

The loop executes k times. All operations are constant time except for candidates.remove_min() and candidates.add(), which are O(log(k)), so the total time is O(k*log(k)).

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Why -1? You can't just put that without comment. –  user1509885 Nov 16 '12 at 14:39
    
It was me sorry, I made a mistake but I corrected. –  dreamcrash Nov 16 '12 at 14:40
    
I'm not sure that I understand why this works in theta(k^2). –  Doppelganger Nov 16 '12 at 14:46
    
@estro: I believe it is even better than that with the use of a min heap to store the candidates. I've added some explanation. –  Vaughn Cato Nov 16 '12 at 14:59
    
@VaughnCato Thanks! –  Doppelganger Nov 16 '12 at 17:08

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