# replacing element in min-heap

this ques. was asked to my friend in phone interview .

Implement a function that will replace element at index `i` by `k` , in min-heap and rearrange heap back .

here is my solution , please tell if i am right or not.

solution 1 :

1)heap[i]=k
2) heapify(heap , 1)

but this seems to be wrong as in this case :

``````  10
/  \
14  59 (<-was 12 before replacing)
.. /  \
55  20
``````

so here we swap(55,59) but still min-heap property will be voilated.

solution 2:

1)replace heap[i] by heap[last index]
2) heapify(heap , 1)
3) now insert as usual procedure in heap

time complexity - O(log N)
is it (solution 2) the correct approach ? if not please give some `hints` .

-
solution 2 is the way to go, imo. it works and is pretty efficient. –  amit Dec 5 '13 at 10:49

Something like solution 1 is probably better.

• `heap[i] = k`
• If `heap[i]` is smaller than its parent, bubble it up (swim)
• Otherwise, if `heap[i]` is larger than one of its children, bubble it down (sink)

Running time: `O(log n)`.

To swim - While it's smaller than its parent, swap it with its parent.

To sink - While it's larger than one of its children, swap it with its smallest child.

Some Java code for `sink` and `swim`, taken from here:

``````private void swim(int k) {
while (k > 1 && less(k/2, k)) {
exch(k, k/2);
k = k/2;
}
}

private void sink(int k) {
while (2*k <= N) {
int j = 2*k;
if (j < N && less(j, j+1)) j++;
if (!less(k, j)) break;
exch(k, j);
k = j;
}
}
``````
-

Here is a way to do that in `O(logn)`

pseudo code for following operation:-

``````void replaceHeap(int index,int value) {

heap[index] = value;
BubbleUp(index);

Heapify(index);

}

void BubbleUp(int index) {

parent = index/2;

while(index>1&&heap[parent]>heap[index]) {

swapElementAt(parent,index);
index = parent;
parent = index/2;
}

}

Heapify is standard as you have done it
``````
-

if it's less than its parent to DecreaseKey(k) else do MinHeapify (k)

-
what is `DecreaseKey(k)` ? –  aseem Dec 5 '13 at 10:57
p = parent(k); while (valid_index (p) && a[k] < a[p]) { swap (a[k], a[p]); k = p; p = parent(k); } –  chill Dec 5 '13 at 11:00