Traversing a n-ary tree without using recurrsion

How can I traverse an `n`-ary tree without using recursion?

Recursive way:

``````traverse(Node node)
{
if(node == null)
return;

for(Node child : node.getChilds()) {
traverse(child);
}
}
``````
-
Any recursive algorithm can be reduced to a loop + stack, so that's not much of a restriction. Have at it with any of the algorithms that can be found on Google. –  Matthew Scharley May 13 '11 at 6:10
I'm in a good mood, so I've translated your algorithm for you. In general, it's not a terribly difficult thing to do though, and a quick google would have turned up many results for this. Tree traversal is a very well-defined problem by this point in history. –  Matthew Scharley May 13 '11 at 6:26
Just interesting @ako. Why do you want to do it without recursion? Is there any reason or this is just question to earn reputation? –  Mihran Hovsepyan May 13 '11 at 7:56
@mihran why would a user join stack overflow to gain reputation at a site they haven't used previously? –  Nicolas78 May 13 '11 at 22:31

You can do this without recursion and without a stack. But you need to add two extra pointers to the node:

1. The parent node. So you can come back to the parent if you are finished.
2. The current child node so you know which one to take next.

• For each node, you handle all the kids.
• If a kid is handled, you check if there is a next kid and handle that (updating the current).
• If all kids are handled, go back to the parent.
• If the node is NULL, quit.

With pseudocode this looks like:

``````traverse(Node node) {
while (node) {
if (node->current <= MAX_CHILD) {
Node prev = node;
if (node->child[node->current]) {
node = node->child[node->current];
}
prev->current++;
} else {
// Do your thing with the node.
node->current = 0; // Reset counter for next traversal.
node = node->parent;
}
}
}
``````
-
Ok, now I get it. However, this solution imposes an awful lot of constraints on the data-structure. And that's not even talking about multi-threading. –  Björn Pollex May 13 '11 at 6:42
@Space_C0wb0y, true, this is just another way to show that the recursive way is the clearest. –  Toon Krijthe May 14 '11 at 7:24
Tree threading? –  seand May 30 '11 at 3:24

No language given, so in pseudo-pseudocode:

``````traverse(Node node)
{
List<Node> nodes = [node];

while (nodes.notEmpty) {
Node n = nodes.shift();

for (Node child in n.getChildren()) {
}

// do stuff with n, maybe
}
}
``````

Note that this is a breadth-first traversal as opposed to the depth-first traversal given in the question. You should be able to do a depth-first traversal by `pop`ing the last item off the `nodes` list instead of `shift`ing the first one.

-
if you use pop instead of shift, it wouldn't be DFS as it would still start with the root node. DFS starts with the deepest (left) leaf. –  Marco M. Sep 26 '12 at 19:42
@MarcoM. The OP's solution will search the root first too since it uses tail recursion. It's close enough for most practical applications I think. –  Matthew Scharley Sep 27 '12 at 0:12

What you are doing is essentially a DFS of the tree. You can eliminate recursion by using a stack:

``````traverse(Node node) {
if (node==NULL)
return;

stack<Node> stk;
stk.push(node);

while (!stk.empty()) {
Node top = stk.pop();
for (Node child in top.getChildren()) {
stk.push(child);
}
process(top);
}
}
``````

If you want a BFS use a queue:

``````traverse(Node node) {
if (node==NULL)
return;

queue<Node> que;

while (!que.empty()) {
Node front = que.deleteFront();
for (Node child in front.getChildren()) {