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I have an array representation that holds a max heap. For an array of 'd','b','c' it's holding : b, d, c although it is supposed to be b, c, d. This is my add method:

public boolean add (E e) {
  ensureCapacity(objectCount + 1);
  pq[objectCount++] = e;

  //percolate up
  for (int i = objectCount - 1; i >= 0; i--) {
     if ([i], pq[parent(i)]) >= 0) {
          E tmp = pq[parent(i)];
          pq[parent(i)] = pq[i];
          pq[i] = tmp;



  return true;

If I add 'a' next it changes successfully to a,b,c,d. How can I fix the method so that it check the left child (2*i+1) and right child(2*i+2) and swaps their values according to which has the higher priority queue (a has higher priority than b, etc)?

share|improve this question
up vote 1 down vote accepted

I think you have a MIN heap and not a MAX heap.

I haven't looked at your code but:

A min heap guarantees the following:

  1. The root is always the min (element 0 in your case)
  2. Tree is always left-ordered (this is true for any heap)

The output b, d, c is perfectly legit in your case. Try removing b and call heapify again, the output will be c, d.

Wiki link:

EDIT: If in your case you consider giving 'a' a higher priority than 'b', then yes, you do have a MAX heap.

share|improve this answer
yes, a has a higher priority. So if I have b,d in the array and I add c I output b,d,c instead of b,c,d. It fixes itself when I add 'a' but for adding more values it gets even worse. For a,b,c,d,e,f,g added in this order d,b,c,a,f,e,g I return the array a,b,c,d,f,e,g. The 'f' is out of place. – user1766888 Nov 8 '12 at 4:58
That's what I am trying to explain you. The heap does not store a sorted order. It only guarantees that my first element (root) is either the MIN or the MAX. Now when you remove an element, it will ensure that the next MIN/MAX would take the root position. Please go through the Wiki link I gave and see what MAX and MIN heaps look like. – Vaibhav Desai Nov 8 '12 at 5:01
And this is why Heap Sort is O(nlogn). Each heapify call (the method to put the MIN/MAX at root) takes O(logn) time and you have n such elements. Hence, O(nlogn). – Vaibhav Desai Nov 8 '12 at 5:04
oh ok, I see it now. Thanks. – user1766888 Nov 8 '12 at 5:06

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