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I understand how to use a breadth first search and A* in a tree structure, but given the following graph, how would it be implemented? In other words, how would the search traverse the graph? S is the start state

Graph Here

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what is the goal of the traversal? Find shortest route? Visit all nodes (at minimal cost)? something else. –  lexu Oct 20 '09 at 20:29
    
There is no goal in this case, it's just to list the order of traversal –  kylex Oct 20 '09 at 20:32
1  
A* requires a heuristic, and a heuristic only makes sense when some sort of goal exists. –  Kylotan Oct 23 '09 at 9:43
    
You're right Kylotan, the goal for A* would be G1 or G2 –  kylex Oct 23 '09 at 14:06

6 Answers 6

It's exactly the same as doing it in a tree. You just need to somehow keep track of which nodes you've already visited so that you don't end up going in circles.

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Basically, you treat a graph the same way that you'd treat a tree, except you need to keep track of nodes you've already visited. That's fine for BFS. On top of that, in the case of A*, consider what you'd do when you revisit a node but have found a cheaper route to it.

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Paint the graph - Recursively search each node and mark the nodes you visited as dirty. Only recurse when the graph is not dirty.

If memory is not an issue, copy the graph and instead of marking the nodes, remove them from the copy graph.

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It's weighted graph. Do you want to find shortest paths or just traverse it? If you want just traversing, here it is:

1) there is only S in the queue
2) we are adding C and A in the queue, only they are reachable from S directly (with one edge) 
3) D, G2 - from C
4) B, E - from A
5) G1 - from D (G2 is already in the queue)
6) there no outgoing edge from G2
7) there's no adjacent nodes of B which aren't already in the queue

So here's the order how nodes where added in the queue: S, C, A, D, G2, B, E, G1

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You have an error. Step 3 must handle A and add its children, since it was added to the queue before C. –  RossFabricant Oct 20 '09 at 20:54
    
Yep, you are right. I've changed the order in step 2. Also there was one extra step 8. –  giolekva Oct 20 '09 at 21:28

I don't know how helpful you will find this, but here's a complete solution coded in the functional language J (available for free from jsoftware.com).

First, it's probably simplest to work directly from a representation of the graph you show in your picture. I represent this as a (# nodes) x (# nodes) table with a number at (i,j) for the value of the link between node-i and node-j. Also, along the diagonal I've put the number associated with each node itself.

So, I enter this as follows - don't worry too much about the unfamiliar notation, you'll soon see what the result looks like:

     grph=: <;.1&>TAB,&.><;._2 ] 0 : 0
    A	B	C	D	E	G1	G2	S
A   2	1			8			2
B   	1	1	1		4		2
C   	3	1				5	
D   			1		5	2	
E   				6	9	7	
G1  					0		
G2  						0	
S   2		3					5
)

So, I've assigned the variable "grph" as a 9x9 table where the first row and first column are the labels "A"-"E", "G1", "G2", and "S"; I've used tabs to delimit items so this could be cut-and-pasted to or from a spreadsheet as needed.

Now, I'll check the size of my table and display it:

   $grph
9 9
   grph
+---+--+--+--+--+--+---+---+--+
|   | A| B| C| D| E| G1| G2| S|
+---+--+--+--+--+--+---+---+--+
| A | 2| 1|  |  | 8|   |   | 2|
+---+--+--+--+--+--+---+---+--+
| B |  | 1| 1| 1|  | 4 |   | 2|
+---+--+--+--+--+--+---+---+--+
| C |  | 3| 1|  |  |   | 5 |  |
+---+--+--+--+--+--+---+---+--+
| D |  |  |  | 1|  | 5 | 2 |  |
+---+--+--+--+--+--+---+---+--+
| E |  |  |  |  | 6| 9 | 7 |  |
+---+--+--+--+--+--+---+---+--+
| G1|  |  |  |  |  | 0 |   |  |
+---+--+--+--+--+--+---+---+--+
| G2|  |  |  |  |  |   | 0 |  |
+---+--+--+--+--+--+---+---+--+
| S | 2|  | 3|  |  |   |   | 5|
+---+--+--+--+--+--+---+---+--+

It looks OK and it's easy to compare this to the picture of the graph to check it. Now I'll drop the first row and column so we're left only with numbers (as boxed literals), and remove any extraneous tab characters.

   grn=. TAB-.~&.>}.}."1 grph

You can see I assign this result to the variable "grn".

Next, I'll replace any empty cells with "_" - which represents infinity - then convert the literals to numeric representation (re-assigning the result to the same name "grn"):

   grn=. ".&>(0=#&>grn)}grn,:<'_'

Finally, I'll move the last column and row to the beginning since this is the one for "S" and it's supposed to be first. I'll also display the result to confirm that it looks correct.

   ]grn=. _1|."1]_1|.grn   NB. "S" goes first.
5 2 _ 3 _ _ _ _
2 2 1 _ _ 8 _ _
2 _ 1 1 1 _ 4 _
_ _ 3 1 _ _ _ 5
_ _ _ _ 1 _ 5 2
_ _ _ _ _ 6 9 7
_ _ _ _ _ _ 0 _
_ _ _ _ _ _ _ 0

So, now that I have a simple 8x8 table of numbers representing the graph, it's a simple matter to traverse it.

Here's a simple J function, called "traverseGraph", to read this table, traverse the graph it represents, and return two results: the indexes (0-based origin) of the nodes visited, and the values of the points and edges in the order visited.

traverseGraph=: 3 : 0
   pts=. ,_-.~,ix{y [ nxt=. ix=. ,0
   while. 0~:#nxt=. ~.ix-.~;([:I._~:])&.><"1 nxt{y do.
        ix=. ix,nxt [ pts=. pts,_-.~,nxt{y
   end.
   ix;pts
)

We start by initializing three variables: the list of indexes "ix" (to zero, since we want to begin in the zeroth row of the table), a variable "nxt" to point to the next group of nodes (initially the same as the starting node), and the list of point values "pts" (starting as the 0th row of our input table, known internally as "y", with all the infinite values removed.)

In the "while." loop, we continue as long as there's more than zero "nxt" values resulting from pulling the current row out of the table and removing any nodes (in "ix") we've already visited. Inside the loop, we accumulate the next set of indexes onto the end of "nxt" and the point values onto "pts". At the end, we return the indexes and point values as our (two-element) result.

We run it like this - it displays the result by default:

   traverseGraph grn
+---------------+---------------------------------------------+
|0 1 3 2 5 7 4 6|5 2 3 2 2 1 8 3 1 5 2 1 1 1 4 6 9 7 0 1 5 2 0|
+---------------+---------------------------------------------+

So, the first box contains the indexes starting with "0" and ending with "6". The second boxed item is the vector of point values in the order we accumulated them. I don't know what you do with these, so I just show them.

We can use the indexes to display the node names like this:

   0 1 3 2 5 7 4 6{(<"0'SABCDE'),'G1';'G2'
+-+-+-+-+-+--+-+--+
|S|A|C|B|E|G2|D|G1|
+-+-+-+-+-+--+-+--+

I don't know how useful you'll find this but it does outline a simple solution to your problem.

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You can read my series of posts about Breadth and Depth First Search / A* Search. It contains source code implementation in C#.

I used a graph structure to implement the code.

Take a look at my blog posts:

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