I am looking for a non-recursive depth first search algorithm for a non-binary tree. Any help is very much appreciated.
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2@Bart Kiers A tree in general, judging by the tag.– biziclopMar 11, 2011 at 21:34
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16Depth first search is a recursive algorithm. The answers below are recursively exploring nodes, they are just not using the system's call stack to do their recursion, and are using an explicit stack instead.– Null SetMar 11, 2011 at 21:44
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16@Null Set No, it's just a loop. By your definition, every computer program is recursive. (Which, in a certain sense of the word they are.)– biziclopMar 11, 2011 at 21:49
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1@Null Set: A tree is also a recursive data structure.– GumboMar 11, 2011 at 21:51
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3@MuhammadUmer the main benefit of iterative over recursive approaches when iterative is considered less readable is that you can avoid max stack size / recursion depth constraints that most systems / programming languages implement to protect the stack. With an in memory stack your stack is only limited by the amount of memory your program is permitted to consume, which typically allows for a stack much larger than the max call stack size.– John BFeb 19, 2018 at 23:27
18 Answers
DFS:
list nodes_to_visit = {root};
while( nodes_to_visit isn't empty ) {
currentnode = nodes_to_visit.take_first();
nodes_to_visit.prepend( currentnode.children );
//do something
}
BFS:
list nodes_to_visit = {root};
while( nodes_to_visit isn't empty ) {
currentnode = nodes_to_visit.take_first();
nodes_to_visit.append( currentnode.children );
//do something
}
The symmetry of the two is quite cool.
Update: As pointed out, take_first()
removes and returns the first element in the list.
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16+1 for noting how similar the two are when done non-recursively (as if they're radically different when they're recursive, but still...)– corsiKaMar 11, 2011 at 23:49
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3And then to add to the symmetry, if you use a min priority queue as the fringe instead, you have a single-source shortest path finder. Mar 12, 2011 at 19:31
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11BTW, the
.first()
function also removes the element from the list. Likeshift()
in many languages.pop()
also works, and returns the child nodes in right-to-left order instead of left-to-right.– ArielJun 21, 2011 at 3:57 -
7IMO, the DFS algo is slightly incorrect. Imagine 3 vertices all connected to each other. The progress should be:
gray(1st)->gray(2nd)->gray(3rd)->blacken(3rd)->blacken(2nd)->blacken(1st)
. But your code produces:gray(1st)->gray(2nd)->gray(3rd)->blacken(2nd)->blacken(3rd)->blacken(1st)
.– batmanAug 2, 2013 at 18:19 -
3@learner I might be misunderstanding your example but if they're all connected to each other, that's not really a tree.– biziclopAug 5, 2013 at 11:00
You would use a stack that holds the nodes that were not visited yet:
stack.push(root)
while !stack.isEmpty() do
node = stack.pop()
for each node.childNodes do
stack.push(stack)
endfor
// …
endwhile
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3@Gumbo I'm wondering that if it is a graph with cycyles. Can this work? I think I can just avoid to add dulplicated node to the stack and it can work. What I will do is to mark all the neighbors of the node which are popped out and add a
if (nodes are not marked)
to judge whether it is approapriate to be pushed to the stack. Can that work?– AlstonJan 25, 2014 at 13:35 -
1@Stallman You could remember the nodes that you have already visited. If you then only visit nodes which you haven’t visited yet, you won’t do any cycles.– GumboJan 25, 2014 at 13:38
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@Gumbo What do you mean by
doing cycles
? I think I just want the order of DFS. Is that right or not, thank you.– AlstonJan 25, 2014 at 13:42 -
Just wanted to point out that using a stack (LIFO) means depth first traversal. If you want to use breadth-first, go with a queue (FIFO) instead. May 21, 2018 at 7:14
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6It's worth noting that to have equivalent code as the most popular @biziclop answer, you need to push child notes in reverse order (
for each node.childNodes.reverse() do stack.push(stack) endfor
). This is also probably what you want. Nice explanation why it's like that is in this video: youtube.com/watch?v=cZPXfl_tUkA endfor Jul 12, 2018 at 13:38
If you have pointers to parent nodes, you can do it without additional memory.
def dfs(root):
node = root
while True:
visit(node)
if node.first_child:
node = node.first_child # walk down
else:
while not node.next_sibling:
if node is root:
return
node = node.parent # walk up ...
node = node.next_sibling # ... and right
Note that if the child nodes are stored as an array rather than through sibling pointers, the next sibling can be found as:
def next_sibling(node):
try:
i = node.parent.child_nodes.index(node)
return node.parent.child_nodes[i+1]
except (IndexError, AttributeError):
return None
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This is a good solution because it does not use additional memory or manipulation of a list or stack (some good reasons to avoid recursion). However it is only possible if the tree nodes have links to their parents. May 20, 2012 at 23:42
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Thank you. This algorithm is great. But in this version you can't delete node's memory in visit function. This algorithm can convert tree to single-linked list by using "first_child" pointer. Than you can walk through it and free node's memory without recursion.– puchuFeb 20, 2014 at 16:38
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6"If you have pointers to parent nodes, you can do it without additional memory" : storing pointer to parent nodes does use some "additional memory"... May 31, 2014 at 8:24
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1@rptr87 if it wasn't clear, without additional memory apart from those pointers. Nov 6, 2016 at 13:07
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This would fail for partial trees where node is not the absolute root, but can be easily fixed by
while not node.next_sibling or node is root:
. May 4, 2017 at 14:14
Use a stack to track your nodes
Stack<Node> s;
s.prepend(tree.head);
while(!s.empty) {
Node n = s.poll_front // gets first node
// do something with q?
for each child of n: s.prepend(child)
}
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1@Dave O. No, because you push back the children of the visited node in front of everything that's already there.– biziclopMar 11, 2011 at 22:04
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@Dave you have a very good point. I was thinking it should be "pushing the rest of the queue back" not "push to the back." I will edit appropriately.– corsiKaMar 11, 2011 at 22:33
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@Timmy yeah I'm not sure what I was thinking there. @quasiverse We normally think of a queue as a FIFO queue. A stack is defined as a LIFO queue.– corsiKaMar 12, 2011 at 0:01
An ES6 implementation based on biziclops great answer:
root = {
text: "root",
children: [{
text: "c1",
children: [{
text: "c11"
}, {
text: "c12"
}]
}, {
text: "c2",
children: [{
text: "c21"
}, {
text: "c22"
}]
}, ]
}
console.log("DFS:")
DFS(root, node => node.children, node => console.log(node.text));
console.log("BFS:")
BFS(root, node => node.children, node => console.log(node.text));
function BFS(root, getChildren, visit) {
let nodesToVisit = [root];
while (nodesToVisit.length > 0) {
const currentNode = nodesToVisit.shift();
nodesToVisit = [
...nodesToVisit,
...(getChildren(currentNode) || []),
];
visit(currentNode);
}
}
function DFS(root, getChildren, visit) {
let nodesToVisit = [root];
while (nodesToVisit.length > 0) {
const currentNode = nodesToVisit.shift();
nodesToVisit = [
...(getChildren(currentNode) || []),
...nodesToVisit,
];
visit(currentNode);
}
}
While "use a stack" might work as the answer to contrived interview question, in reality, it's just doing explicitly what a recursive program does behind the scenes.
Recursion uses the programs built-in stack. When you call a function, it pushes the arguments to the function onto the stack and when the function returns it does so by popping the program stack.
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11With the important difference that the thread stack is severely limited, and the non-recursive algorithm would use the much more scalable heap. May 4, 2017 at 4:57
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3This is not just a contrived situation. I've used techniques like this on a few occasions in C# and JavaScript to gain significant performance gains over existing recursive call equivelants. It is often the case that managing the recursion with a stack instead of using the call stack is much faster and less resource intensive. There is a lot of overhead involved in placing a call context onto a stack vs the programmer being able to make practical decisions about what to place on a custom stack. Feb 8, 2018 at 23:20
PreOrderTraversal is same as DFS in binary tree. You can do the same recursion
taking care of Stack as below.
public void IterativePreOrder(Tree root)
{
if (root == null)
return;
Stack s<Tree> = new Stack<Tree>();
s.Push(root);
while (s.Count != 0)
{
Tree b = s.Pop();
Console.Write(b.Data + " ");
if (b.Right != null)
s.Push(b.Right);
if (b.Left != null)
s.Push(b.Left);
}
}
The general logic is, push a node(starting from root) into the Stack, Pop() it and Print() value. Then if it has children( left and right) push them into the stack - push Right first so that you will visit Left child first(after visiting node itself). When stack is empty() you will have visited all nodes in Pre-Order.
Non-recursive DFS using ES6 generators
class Node {
constructor(name, childNodes) {
this.name = name;
this.childNodes = childNodes;
this.visited = false;
}
}
function *dfs(s) {
let stack = [];
stack.push(s);
stackLoop: while (stack.length) {
let u = stack[stack.length - 1]; // peek
if (!u.visited) {
u.visited = true; // grey - visited
yield u;
}
for (let v of u.childNodes) {
if (!v.visited) {
stack.push(v);
continue stackLoop;
}
}
stack.pop(); // black - all reachable descendants were processed
}
}
It deviates from typical non-recursive DFS to easily detect when all reachable descendants of given node were processed and to maintain the current path in the list/stack.
Suppose you want to execute a notification when each node in a graph is visited. The simple recursive implementation is:
void DFSRecursive(Node n, Set<Node> visited) {
visited.add(n);
for (Node x : neighbors_of(n)) { // iterate over all neighbors
if (!visited.contains(x)) {
DFSRecursive(x, visited);
}
}
OnVisit(n); // callback to say node is finally visited, after all its non-visited neighbors
}
Ok, now you want a stack-based implementation because your example doesn't work. Complex graphs might for instance cause this to blow the stack of your program and you need to implement a non-recursive version. The biggest issue is to know when to issue a notification.
The following pseudo-code works (mix of Java and C++ for readability):
void DFS(Node root) {
Set<Node> visited;
Set<Node> toNotify; // nodes we want to notify
Stack<Node> stack;
stack.add(root);
toNotify.add(root); // we won't pop nodes from this until DFS is done
while (!stack.empty()) {
Node current = stack.pop();
visited.add(current);
for (Node x : neighbors_of(current)) {
if (!visited.contains(x)) {
stack.add(x);
toNotify.add(x);
}
}
}
// Now issue notifications. toNotifyStack might contain duplicates (will never
// happen in a tree but easily happens in a graph)
Set<Node> notified;
while (!toNotify.empty()) {
Node n = toNotify.pop();
if (!toNotify.contains(n)) {
OnVisit(n); // issue callback
toNotify.add(n);
}
}
It looks complicated but the extra logic needed for issuing notifications exists because you need to notify in reverse order of visit - DFS starts at root but notifies it last, unlike BFS which is very simple to implement.
For kicks, try following graph: nodes are s, t, v and w. directed edges are: s->t, s->v, t->w, v->w, and v->t. Run your own implementation of DFS and the order in which nodes should be visited must be: w, t, v, s A clumsy implementation of DFS would maybe notify t first and that indicates a bug. A recursive implementation of DFS would always reach w last.
FULL example WORKING code, without stack:
import java.util.*;
class Graph {
private List<List<Integer>> adj;
Graph(int numOfVertices) {
this.adj = new ArrayList<>();
for (int i = 0; i < numOfVertices; ++i)
adj.add(i, new ArrayList<>());
}
void addEdge(int v, int w) {
adj.get(v).add(w); // Add w to v's list.
}
void DFS(int v) {
int nodesToVisitIndex = 0;
List<Integer> nodesToVisit = new ArrayList<>();
nodesToVisit.add(v);
while (nodesToVisitIndex < nodesToVisit.size()) {
Integer nextChild= nodesToVisit.get(nodesToVisitIndex++);// get the node and mark it as visited node by inc the index over the element.
for (Integer s : adj.get(nextChild)) {
if (!nodesToVisit.contains(s)) {
nodesToVisit.add(nodesToVisitIndex, s);// add the node to the HEAD of the unvisited nodes list.
}
}
System.out.println(nextChild);
}
}
void BFS(int v) {
int nodesToVisitIndex = 0;
List<Integer> nodesToVisit = new ArrayList<>();
nodesToVisit.add(v);
while (nodesToVisitIndex < nodesToVisit.size()) {
Integer nextChild= nodesToVisit.get(nodesToVisitIndex++);// get the node and mark it as visited node by inc the index over the element.
for (Integer s : adj.get(nextChild)) {
if (!nodesToVisit.contains(s)) {
nodesToVisit.add(s);// add the node to the END of the unvisited node list.
}
}
System.out.println(nextChild);
}
}
public static void main(String args[]) {
Graph g = new Graph(5);
g.addEdge(0, 1);
g.addEdge(0, 2);
g.addEdge(1, 2);
g.addEdge(2, 0);
g.addEdge(2, 3);
g.addEdge(3, 3);
g.addEdge(3, 1);
g.addEdge(3, 4);
System.out.println("Breadth First Traversal- starting from vertex 2:");
g.BFS(2);
System.out.println("Depth First Traversal- starting from vertex 2:");
g.DFS(2);
}}
output: Breadth First Traversal- starting from vertex 2: 2 0 3 1 4 Depth First Traversal- starting from vertex 2: 2 3 4 1 0
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nodesToVisit.contains(s)
takes linear time in the number of elements innodesToVisit
. Alternatives include keeping track of which nodes were already visited in a boolean array with O(1) access time and O(numOfVertices) extra space.– nspoDec 31, 2020 at 10:25
Just wanted to add my python implementation to the long list of solutions. This non-recursive algorithm has discovery and finished events.
worklist = [root_node]
visited = set()
while worklist:
node = worklist[-1]
if node in visited:
# Node is finished
worklist.pop()
else:
# Node is discovered
visited.add(node)
for child in node.children:
worklist.append(child)
You can use a stack. I implemented graphs with Adjacency Matrix:
void DFS(int current){
for(int i=1; i<N; i++) visit_table[i]=false;
myStack.push(current);
cout << current << " ";
while(!myStack.empty()){
current = myStack.top();
for(int i=0; i<N; i++){
if(AdjMatrix[current][i] == 1){
if(visit_table[i] == false){
myStack.push(i);
visit_table[i] = true;
cout << i << " ";
}
break;
}
else if(!myStack.empty())
myStack.pop();
}
}
}
DFS iterative in Java:
//DFS: Iterative
private Boolean DFSIterative(Node root, int target) {
if (root == null)
return false;
Stack<Node> _stack = new Stack<Node>();
_stack.push(root);
while (_stack.size() > 0) {
Node temp = _stack.peek();
if (temp.data == target)
return true;
if (temp.left != null)
_stack.push(temp.left);
else if (temp.right != null)
_stack.push(temp.right);
else
_stack.pop();
}
return false;
}
http://www.youtube.com/watch?v=zLZhSSXAwxI
Just watched this video and came out with implementation. It looks easy for me to understand. Please critique this.
visited_node={root}
stack.push(root)
while(!stack.empty){
unvisited_node = get_unvisited_adj_nodes(stack.top());
If (unvisited_node!=null){
stack.push(unvisited_node);
visited_node+=unvisited_node;
}
else
stack.pop()
}
Using Stack
, here are the steps to follow: Push the first vertex on the stack then,
- If possible, visit an adjacent unvisited vertex, mark it, and push it on the stack.
- If you can’t follow step 1, then, if possible, pop a vertex off the stack.
- If you can’t follow step 1 or step 2, you’re done.
Here's the Java program following the above steps:
public void searchDepthFirst() {
// begin at vertex 0
vertexList[0].wasVisited = true;
displayVertex(0);
stack.push(0);
while (!stack.isEmpty()) {
int adjacentVertex = getAdjacentUnvisitedVertex(stack.peek());
// if no such vertex
if (adjacentVertex == -1) {
stack.pop();
} else {
vertexList[adjacentVertex].wasVisited = true;
// Do something
stack.push(adjacentVertex);
}
}
// stack is empty, so we're done, reset flags
for (int j = 0; j < nVerts; j++)
vertexList[j].wasVisited = false;
}
Pseudo-code based on @biziclop's answer:
- Using only basic constructs: variables, arrays, if, while and for
- Functions
getNode(id)
andgetChildren(id)
- Assuming known number of nodes
N
NOTE: I use array-indexing from 1, not 0.
Breadth-first
S = Array(N)
S[1] = 1; // root id
cur = 1;
last = 1
while cur <= last
id = S[cur]
node = getNode(id)
children = getChildren(id)
n = length(children)
for i = 1..n
S[ last+i ] = children[i]
end
last = last+n
cur = cur+1
visit(node)
end
Depth-first
S = Array(N)
S[1] = 1; // root id
cur = 1;
while cur > 0
id = S[cur]
node = getNode(id)
children = getChildren(id)
n = length(children)
for i = 1..n
// assuming children are given left-to-right
S[ cur+i-1 ] = children[ n-i+1 ]
// otherwise
// S[ cur+i-1 ] = children[i]
end
cur = cur+n-1
visit(node)
end
Here is a link to a java program showing DFS following both reccursive and non-reccursive methods and also calculating discovery and finish time, but no edge laleling.
public void DFSIterative() {
Reset();
Stack<Vertex> s = new Stack<>();
for (Vertex v : vertices.values()) {
if (!v.visited) {
v.d = ++time;
v.visited = true;
s.push(v);
while (!s.isEmpty()) {
Vertex u = s.peek();
s.pop();
boolean bFinished = true;
for (Vertex w : u.adj) {
if (!w.visited) {
w.visited = true;
w.d = ++time;
w.p = u;
s.push(w);
bFinished = false;
break;
}
}
if (bFinished) {
u.f = ++time;
if (u.p != null)
s.push(u.p);
}
}
}
}
}
Full source here.
Stack<Node> stack = new Stack<>();
stack.add(root);
while (!stack.isEmpty()) {
Node node = stack.pop();
System.out.print(node.getData() + " ");
Node right = node.getRight();
if (right != null) {
stack.push(right);
}
Node left = node.getLeft();
if (left != null) {
stack.push(left);
}
}