Given a sequence of numbers, I want to insert the numbers into a balanced binary tree such that when I do a inorder traversal on the tree, it gives me the sequence back.
How can I construct the insert method corresponding to this requirement?
Remember that the tree must be balanced, so there isn't a completely trivial solution. I was trying to do this with a modified version of an AVL tree, but I'm not sure if this can work out.
I also wish to be able to implement a delete operation. Delete should delete the item at the ith position in the list.
I want to have: Insert(i, e), which inserts a single element e right before the ith element in the sequence. Delete(i), which deletes the ith element of the sequence.
If I do insert(0, 5), insert(0, 4), insert(0, 7), then my stored sequence is now 7, 4, 5 and inorder traversal on the binary tree should give me 7, 4, 5.
If I do delete(1), then inorder traversal on the binary tree should give me 7, 5. As you can see, the sequence order is maintained after deleting the ith sequence element with i = 1 in this case (as I've indexed my sequence from 0).