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First of all, thank you for looking at this question.

For a school assignment we're supposed to create a BFS algorithm and use it to do various things. One of these things is that we're supposed to find all of the paths between the root and the goal nodes of a graph. I have no idea how to do this as I can't find a way to keep track of all of the alternate routes without also including copies/cycles.

Here is my BFS code:

def makePath(predecessors, last):
    return makePath(predecessors, predecessors[last]) + [last] if last else []

def BFS1b(node, goal):
    Q = [node]
    predecessor = {node:None}

    while Q:
        current = Q.pop(0)
        if current[0] == goal:
            return makePath(predecessor, goal)

        for subnode in graph[current[0]][2:]:
            if subnode[0] not in predecessor:
                predecessor[subnode[0]] = current[0]
                Q.append(subnode[0])

A conceptual push in the right direction would be greatly appreciated.

tl;dr How do I use BFS to find all of the paths between two nodes?

Here is the graph as I'm not sure how to answer Jeff Marcado's question.

graph = {   'A':[366, 3,    ('Z',   75 ), ('T', 118), ('S', 140)],
            'Z':[374, 2,    ('A',   75 ), ('O', 71 )],
            'T':[329, 2,    ('A',   118), ('L', 111)],
            'L':[244, 2,    ('T',   111), ('M', 70 )],
            'M':[241, 2,    ('L',   70 ), ('D', 75 )],
            'D':[242, 2,    ('M',   75 ), ('C', 120)],
            'C':[160, 3,    ('D',   120), ('R', 146), ('P', 138)],
            'R':[193, 3,    ('C',   146), ('P', 97 ), ('S', 80 )],
            'S':[253, 4,    ('R',   80 ), ('F', 99 ), ('O', 151), ('A', 140)],
            'O':[380, 2,    ('S',   151), ('Z', 71 )],
            'P':[100, 3,    ('C',   138), ('R', 97 ), ('B', 101)],
            'F':[176, 2,    ('S',   99 ), ('B', 211)],
            'B':[  0, 4,    ('P',   101), ('F', 211), ('G', 90 ), ('U', 85 )],
            'G':[ 77, 1,    ('B',   90 )],
            'U':[ 80, 3,    ('B',   85 ), ('H', 98 ), ('V', 142)],
            'H':[151, 2,    ('U',   98 ), ('E', 86 )],
            'E':[161, 1,    ('H',   86 )],
            'V':[199, 2,    ('U',   142), ('I', 92 )],
            'I':[226, 2,    ('V',   92 ), ('N', 87 )],
            'N':[243, 1,    ('I',   87 )],
            'W':[400, 1,    ('X',   100)],
            'X':[400, 1,    ('W',   100)],}
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Are these graphs acyclical? Directed? Rooted trees? –  Jeff Mercado Oct 31 '12 at 23:05
    
@JeffMercado We haven't covered these distinctions yet, I have shown the graph we have to use, if that helps. –  Amndeep7 Oct 31 '12 at 23:24
    
You need to split up the work into separate functions. I would create functions to get the next nodes, remove edges you've used up, and return paths. –  kreativitea Nov 1 '12 at 0:20
1  
@Amndeep7: please read the homework tag wiki. If it's homework or you only want directions rather than code, state that in your question. Don't use the homework tag. –  Mat Nov 1 '12 at 8:35
    
@Mat : Thank you for informing me about the state of the homework tag, I will make sure not to use it anymore. –  Amndeep7 Nov 1 '12 at 18:39

1 Answer 1

up vote 1 down vote accepted

Firstly, your algorithm should not return when you reach the goal node otherwise you'll have only one solution. Instead, you should use a list to store the various solutions.

Regarding the core of the algorithm, keep in mind that a BFS-search will not explore one path at a time but all. So you cannot just store one node in your queue but rather a path.

Then you simply check if the next node is not already in your current path to add it to avoid cycles. If the last node of the current path is the goal node, append it to the solution list.

Finally, when there is no more incomplete path in the queue (== the queue is empty), return the solution list.

share|improve this answer
1  
I have only provided directions intentionally since it's a school assignment. The changes compared to the original code are small (remove predecessor, use paths in the queue, remove makePath, use a list to store the solutions). –  Maxime Nov 1 '12 at 9:34
    
The thing that helped was using paths in the queue - I was getting stuck since I could not find a way to keep track of separate paths. Thanks for your help. –  Amndeep7 Nov 1 '12 at 18:41

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