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I have a problem that I need guidance with. I have an array that has information about the edges between different nodes. So,

a[1][39] = 'p' --> Take transition 'p' while in node 1 to get to node 39. The complete graph is this:

i[1][51] = 'p' 
i[1][39] = 't' 
i[39][40] = 'd' 
i[40][66] = 'p' 
i[66][51] = 'd' 
i[40][41] = 'm' 
i[41][64] = 'd' 
i[64][40] = 'd' 

As you can see, it's a directed, cyclic graph. What I need to do is to have all paths from point X to Y. So, given X=1 and Y=51. I need output like so:

o[0][0] = 'p'

o[1][0] = 't'
o[1][1] = 'd'
o[1][2] = 'p'
o[1][3] = 'd'

o[2][0] = 't'
o[2][1] = 'd'
o[2][2] = 'm'
o[2][3] = 'd'
o[2][4] = 'd'
o[2][5] = 'p'
o[2][6] = 'd'

The first index shows the path number. So, I have three paths here. The second index shows the step. So, one step in the first path, four in the second.

I'm doing this in PHP but even pseudo-code code would do. Also, I can also reverse the input array to i[1]['p'] = 51 etc. if that might help.

Thanks.

share|improve this question
    
Needless to say, this is a subset of the actual, much larger, graph. Also, I can live with cycles for now but will have to cap the loops to a specific number -- say, discard a path if it visits a node more than twice. –  recluze Mar 31 '11 at 11:15

1 Answer 1

up vote 1 down vote accepted

Have a look at

  1. http://en.wikipedia.org/wiki/A-star
  2. Graph Algorithm To Find All Connections Between Two Arbitrary Vertices
share|improve this answer
    
How is that supposed to help? –  rabbitisle Mar 31 '11 at 11:23
    
@rabbitisle You asked for pseudo code. –  eisberg Mar 31 '11 at 11:28
    
@eisberg I didn't ask the question. How is a heuristic algorithm which returns a single (best) path will help in returning all possible paths? What we need here is not a best answer but an enumeration of paths. –  rabbitisle Mar 31 '11 at 11:31
2  
@rabbitisle So you only need to change the terminating in A-Star and give your self an array of all solutions. –  eisberg Mar 31 '11 at 11:33
1  
And I accepted it :) –  recluze Apr 2 '11 at 3:07

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