# O(n) time non-recursive procedure to traverse a binary tree

I'm reading a book called "Introduction to algorythms". I think many of you know it. I just bumped into a question which seems rather difficult:

Write an O(n)-time nonrecursive procedure that, given an n-node binary tree, prints out the key of each node. Use no more than constant extra space outside of the tree itself and do not modify the tree, even temporarily, during the procedure.

I saw that there is another question like this: How to traverse a binary tree in O(n) time without extra memory but the main difference is that I can't modify the tree. I was thinking of using some visited flag but I haven't distilled a right solution yet. It's maybe something obvious I don't see. How would you devise an algirithm which solves this problem? Even some pointers to the answer would be appreciated.

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You can do it with `O(logn)` extra memory using a stack. No extra memory sounds hard. –  Thomas Ahle Jun 14 '12 at 17:21
I'm not going to use a Stack since it is not O(1) space. It wouldn't make sense either since the previous exercise in the book asks you to write a non-recursive traversal procedure using a stack. –  Adam Arold Jun 14 '12 at 17:22
Is the tree a search tree / ordered? We need a way to remember what we have already printed. –  Thomas Ahle Jun 14 '12 at 17:32
It is just an n-node binary tree as the question stated. –  Adam Arold Jun 14 '12 at 17:33
With parent pointers? –  Thomas Ahle Jun 14 '12 at 17:41
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If the tree is linked in both directions, you can do this:

``````assert root.parent is null

now, old = root, null
while now != null:
print now.label
if leaf(now):
now, old = now.parent, now
else:
if old == now.right:
now, old = now.parent, now
if old == now.left:
now, old = now.right, now
if old == now.parent:
now, old = now.left, now
``````

This prints in root, left, right order, but you can get any order you like.

I don't think you can do it if the tree is only linked in one direction. You could have a look at Deforestation.

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I'll theck this out tomorrow, thanks for the answer. –  Adam Arold Jun 14 '12 at 22:17
What language is that code? –  Adam Arold Jun 15 '12 at 7:39
If I don't start with the root the algorithm must work so you have to store the parent node of the entry node and if you arrive at that node the traversal is over. –  Adam Arold Jun 15 '12 at 8:11
This algorithm is flawed. In the case that a node doesn't have a right node then now will be null and the traversal terminates. –  Adam Arold Jun 15 '12 at 8:47
Yes, for simplicity it assumes that there are always two children, but I should be easy to extend it with more cases like "if only child is left && old == now.left: go up". –  Thomas Ahle Jun 15 '12 at 10:01