33

I always mix up whether I use a stack or a queue for DFS or BFS. Can someone please provide some intuition about how to remember which algorithm uses which data structure?

13 Answers 13

35
0

Draw a small graph on a piece of paper and think about the order in which nodes are processed in each implementation. How does the order in which you encounter the nodes and the order in which you process the nodes differ between the searches?

One of them uses a stack (depth-first) and the other uses a queue (breadth-first) (for non-recursive implementations, at least).

| improve this answer | |
98
0

Queue can be generally thought as horizontal in structure i.e, breadth/width can be attributed to it - BFS, whereas

Stack is visualized as a vertical structure and hence has depth - DFS.

| improve this answer | |
31
1

I remember it by keeping Barbecue in my mind. Barbecue starts with a 'B' and ends with a sound like 'q' hence BFS -> Queue and the remaining ones DFS -> stack.

| improve this answer | |
  • 1
    Good observation :) – RBT Apr 19 '17 at 1:17
  • 1
    Google likes this answer it seems. If you search for this question google extracts this answer out. So here is an upvote for that. – tryurbest Jul 13 '18 at 15:50
  • 2
    Hahaha OMG I didn't have the problem of OP when I stumbled upon this question, but after reading this answer, no way I forget that :D – M-J Nov 25 '18 at 10:44
27
0

BFS explores/processes the closest vertices first and then moves outwards away from the source. Given this, you want to use a data structure that when queried gives you the oldest element, based on the order they were inserted. A queue is what you need in this case since it is first-in-first-out(FIFO). Whereas a DFS explores as far as possible along each branch first and then bracktracks. For this, a stack works better since it is LIFO(last-in-first-out)

| improve this answer | |
7
0

BFS uses always queue, Dfs uses Stack data structure. As the earlier explanation tell about DFS is using backtracking. Remember backtracking can proceed only by Stack.

| improve this answer | |
7
0

Take it in Alphabetical order...

.... B(BFS).....C......D (DFS)....

.... Q(Queue)...R......S (Stack)...

| improve this answer | |
3
0

Don't remember anything.

Assuming the data structure used for the search is X:

Breadth First = Nodes entered X earlier, have to be generated on the tree first: X is a queue.

Depth First = Nodes entered X later, must be generated on the tree first: X is a stack.

In brief: Stack is Last-In-First-Out, which is DFS. Queue is First-In-First-Out, which is BFS.

| improve this answer | |
2
0

Bfs;Breadth=>queue

Dfs;Depth=>stack

Refer to their structure

| improve this answer | |
2
0

The depth-first search uses a Stack to remember where it should go when it reaches a dead end.

DFSS

| improve this answer | |
1
0
  1. Stack (Last In First Out, LIFO). For DFS, we retrieve it from root to the farthest node as much as possible, this is the same idea as LIFO.

  2. Queue (First In First Out, FIFO). For BFS, we retrieve it one level by one leve, after we visit upper level of the node, we visit bottom level of node, this is the same idea as FIFO.

| improve this answer | |
1
0

An easier way to remember, especially for young students, is to use similar acronym:

BFS => Boy FriendS in queue (for popular ladies apparently).

DFS is otherwise (stack).

| improve this answer | |
1
0

You can remember by making an acronym

BQDS

Beautiful Queen has Done Sins.

In Hindi, हुरानी क्यु र्द हा

| improve this answer | |
  • 1
    LOL Sorry but this is not a very useful suggestion. I think the word you're looking for is a nmenonic. The acronym has to be itself memorable. – pscl Oct 30 '18 at 8:27
  • @pscl , Added nmenonic as per you suggestion. – Yogesh Sanchihar Jun 13 '19 at 3:01
0
0

I would like to share this answer: https://stackoverflow.com/a/20429574/3221630

Taking BFS and replacing a the queue with a stack, reproduces the same visiting order of DFS, it uses more space than the actual DFS algorithm.

| improve this answer | |

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.