# Real world pre/post-order tree traversal examples

I understand pre-order, in-order, and post-order tree traversal algorithms just fine. (Reference). I understand a few uses: in-order for traversing binary search trees in order, pre-order for cloning a tree. But I can't for the life of me come up with a real world task that I'd need post-order traversal to accomplish.

Can you give me an example? And: can you give me any better uses for pre-order traversal?

Edit: Can anyone give me an example other than expression trees and RPN? Is that really all post-order is good for?

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excellent question! –  Lazer Aug 20 '10 at 22:30

Topological sorting is a post-order traversal of trees (or directed acyclic graphs).

The idea is that the nodes of the graph represent tasks and an edge from `A` to `B` indicates that `A` has to be performed before `B`. A topological sort will arrange these tasks in a sequence such that all the dependencies of a task appear earlier than the task itself. Any build system like UNIX make has to implement this algorithm.

The example that Dario mentioned — destroying all nodes of a tree with manual memory management — is an instance of this problem. After all, the task of destroying a node depends on the destruction of its children.

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This is a great answer. Remembering that trees are degenerate graphs opens up all kinds of functionality. And topological sorting is hugely useful. –  Plutor Aug 23 '10 at 13:57
Why is it called topological sorting instead of, say, scheduling or something, or what is "Topological" supposed to mean in this context? –  Shawn Apr 30 '11 at 3:08
@Shawn: Beats me. It's probably because only the topology of the graph/network matters. –  Heinrich Apfelmus May 3 '11 at 18:12

Post order is (can be) used by compilers. Consider an expression tree for `a + b + c`, the machine language would require a sequence like `a b + c +`. This is also called Reverse polish Notation (RPN). On the Wikipedia page it says: "RPN aka Postfix"

Post-order is also required for destroying a tree, just like pre-order is needed to create/clone it.

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Destroying a tree, that's a good point. –  Plutor Aug 20 '10 at 16:08
+1 Its like you can clone a tree using pre order and destroy it using the reverse steps i.e. post order. There should be some other areas where pre/post order would be very efficient. –  Lazer Aug 20 '10 at 22:38

As Henk Holterman pointed out, destroying a tree using manual memory management usually is a post-order traversal.

Pseudocode:

``````destroy(node) {
if (node == null) return;

destroy(node.left)
destroy(node.right)

// Post-order freeing of current node
free(node)
}
``````
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