As part of an AVL template I am working on (C++ templates) I was trying to merge 2 AVL trees in O(n1+n2) complexity when n1+n2 is the total elements in both trees.
I thought about the next algorithm.
- Inorder traversal on the 1st tree and build an array/list - O(n1)
- Inorder traversal on the 2nd tree and build an array/list - O(n2)
- Merge sort of those 2 arrays and build final sorted array/list in the size of n1+n2 - O(n1+n2)
- Build an empty almost complete binary tree with n1+n2 vertices - O(n1+n2).
- Inorder traversal on that almost complete binary tree while updating the vertices with the elemets in the merged array/list.
My question is how do I actually build the empty almost complete binary tree with n1+n2 vertices?