# How to insert into a binary max heap implemented as a binary tree?

In a binary max heap implemented as a binary tree (where each node stores a pointer to its parent, left child, and right child), if you have the pointer to the root of the heap, how would you implement an insert operation? What's supposed to happen is the node first gets inserted as the last element in the last row. For array based, you could append to the array, but for tree based implementation, how would you find the right spot?

-
Language agnostic? –  leppie Feb 8 at 19:46
i guess pseudo-code –  omega Feb 8 at 19:51
What is the shape of this linked list? If parents can't necessarily point to their children, then in what order are the nodes linked? –  templatetypedef Feb 8 at 20:05
The linked list will look like this en.wikipedia.org/wiki/Binary_heap So each node, will have a pointer to its parent, left child, right child and the key value. Null if it is the root or doesn't have the children. –  omega Feb 8 at 20:06
@omega- Oh, okay. That's not a doubly-linked list representation of a binary heap; that's a tree representation. –  templatetypedef Feb 8 at 20:07

In this older question, I gave a short algorithm that uses the binary representation of the number k in order to find a way to select the k-th node out of a binary heap in a top-down traversal. Assuming that you keep track of the number of nodes in the explicit tree representation of the binary heap, you could do the following to do an insert operation:

1. Using the above algorithm, determine where the new node should go, then insert the node at that position.
2. Continuously bubble the node upward either by rewiring the tree to swap it with its parent or by exchanging the data fields of the node and its parent until the element is in its final position.

Hope this helps!

-
So if you do not know the size of the heap, then you cannot use this? –  omega Feb 8 at 20:28
@omega- That's correct. That said, it's quite each to track the size of the heap, and doing so is enormously beneficial to performance. If you don't track the size of the heap, the complexity of an insertion will be O(n), since you might have to look at every node in the tree to determine where the insertion point is. If you track the size, this drops to O(log n), which is a huge performance win. –  templatetypedef Feb 8 at 20:33
What would be the algorithm to insert (assuming you don't know the size) that gives the O(n)? –  omega Feb 8 at 20:38
@omega- You could do a BFS over the tree, ordering nodes from left to right. The very last node you visit will be either (a) right next to the insertion point (if the last row isn't full), or (b) at the end of the row, because you need a new row. Based on that, you can then find the right insertion point. Or, you could just count the number of nodes in O(n) time and then use my original technique. :-) In all seriousness, it's needlessly complicated to not store the node count - it's dramatically simpler than the alternative, and there is no reason not to. –  templatetypedef Feb 8 at 22:20