# How does a Breadth-First Search Work When Looking for Shortest Path (Java)

I've done some research, and I seem to be missing one small part of this algorithm. I understand how a Breadth-First Search works, but I don't understand how exactly it will get me to a specific path, as opposed to just telling me where each individual node can go. I guess the easiest way to explain my confusion is to provide an example:

So for instance, let's say I have a graph like this:

And my goal is to get from A to E (all edges are unweighted).

I start at A, because that's my origin. I queue A, followed by immediately dequeueing A and exploring it. This yields B and D, because A is connected to B and D. I thus queue both B and D.

I dequeue B and explore it, and find that it leads to A (already explored), and C, so I queue C. I then dequeue D, and find that it leads to E, my goal. I then dequeue C, and find that it also leads to E, my goal.

I know logically that the fastest path is A->D->E, but I'm not sure how exactly the breadth-first search helps - how should I be recording paths such that when I finish, I can analyze the results and see that the shortest path is A->D->E?

Also, note that I'm using not actually using a tree, so there are no "parent" nodes, only children,.

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"Also, note that I'm using not actually using a tree, so there are no "parent" nodes, only children" - well you obviously will have to store the parent somewhere. For DFS you're doing it indirectly through the call stack, for BFS you have to do it explicitly. Nothing you can do about it I fear :) –  Voo Dec 5 '11 at 0:50

Technically, Breadth-first search (BFS) by itself does not let you find the shortest path, simply because BFS is not looking for a shortest path: BFS describes a strategy for searching a graph, but it does not say that you must search for anything in particular.

Dijkstra's algorithm adapts BFS to let you find single-source shortest paths.

In order to retrieve the shortest path from the origin to a node, you need to maintain two items for each node in the graph: it's current shortest distance, and the preceding node in the shortest path. Initially all distances are set to infinity, and all predecessors are set to empty. In your example, you set A's distance to zero, and then proceed with the BFS. On each step you check if you can improve the distance of a descendant, i.e. the distance from the origin to the predecessor plus the length of the edge that you are exploring is less than the current best distance for the node in question. If you can improve the distance, set the new shortest path, and remember the predecessor through which that path has been acquired. When the BFS queue is empty, pick a node (in your example, it's E) and traverse its predecessors back to the origin. This would give you the shortest path.

If this sounds a bit confusing, wikipedia has a nice pseudocode section on the topic.

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Thank you! I had read over the pseudocode previously but was unable to understand it, your explanation made it click for me –  Jake Dec 5 '11 at 1:00
I'd like to make the following note for people that look at this post in the future: If the edges are unweighted, there is no need to store the "current shortest distance" for each node. All that needs to be stored is the parent for each node discovered. Thus, while you are examining a node and enqueueing all of its successors, simply set the parent of those nodes to the node you are examining (this will double as marking them "discovered").If this parent pointer is NUL/nil/None for any given node, it means either that it has not yet been discovered by BFS or it is the source/root node itself. –  Shashank Gupta Sep 17 '13 at 16:28

As pointed above, BFS can only be used to find shortest path in a graph if:
1. There are no loops
2. All edges have same weight or no weight.

To find the shortest path, all you have to do is start from the source and perform a breadth first search and stop when you find your destination Node. The only additional thing you need to do is have an array previous[n] which will store the previous node for every node visited. The previous of source can be null.

To print the path, simple loop through the previous[] array from source till you reach destination and print the nodes. DFS can also be used to find the shortest path in a graph under similar conditions.

However, if the graph is more complex, containing weighted edges and loops, then we need a more sophisticated version of BFS, i.e. Dijkstra's algorithm.

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Dijkstra if no -ve weights else use bellman ford algo if -ve weights –  shaunak1111 Oct 17 '13 at 7:06