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I need to find the number of all paths between two nodes of a graph by using BFS. I think the answer to my question can be found here:

graph - How to find the number of different shortest paths between two vertices, in Directed Graph and with linear-time?

But I don't quite understand it. Could someone please write the algorithm down in other words so I can understand it better?

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1 Answer

up vote 12 down vote accepted

Let say you need to go from src to dest.

With each vertex x associate two values count and val, count is the number of shortest path from src to x and val is the shortest distance from src to x. Also maintain a visited variable telling whether node is arrived first time of not.

Apply usual BFS algorithm,

Initialize u = src
visited[u] = 1,val[u] = count[u] = 1
For each child v of u,
    if v is not visited 

A node is visited first time so it has only one path from source till now via u, so shortest path upto v is 1 + shortest path upto u, and number of ways to reach v via shortest path is same as count[u] because say u has 5 ways to reach from source, then only these 5 ways can be extended upto v as v is encountered first time via u, so

val[v] = val[u]+1,    
count[v] = count[u], 
visited[v] = 1

if v is visited

If v is already visited, which mean, there way some other path upto v via some other vertices, then three cases arises:

1 :if val[v] == val[u]+1  

if current val[v] which is dist upto v via some other path is equal to val[u]+1, i.e we have equal shortest distances for reaching v using current path through u and the other path upto v, then the shortest distance upto v remains same, but the numbr of path increases by number of paths of reaching u.

count[v] = count[v]+count[u]

2: val[v] > val[u]+1

If current path of reaching v is smaller than previous value of val[v], then val[v] is stored current path and count[v] is also updated

val[v] = val[u]+1
count[v] = count[u]

The third case is if current path has distance greater than previous path, in this case, no need to change the values of val[v] and count[v]

Terminate the algorithm when destination is encountered. val[dest] contain the shortest distance from source and count[dest] contain the number of ways from src to dest.

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So, when you are calling the vertex "visited" that means that it is currently in BFS queue? So when it is no longer in the queue I should just skip it whenever I encounter it? –  Miroslav Lhoťan Mar 5 '13 at 8:31
    
Also, where do I add to the count value? When I start with zero count in the src vertex there will be zero all the way through. –  Miroslav Lhoťan Mar 5 '13 at 8:47
    
No visited means it is visited once. It need not to be in queue at that time. For count, it was my mistake. Initialize count[src] as 1 as number of ways to reach from src to src is one. –  Shashwat Kumar Mar 5 '13 at 10:55
    
One more question please. Does it count only the shortest possible paths? Now it seems to me it count all possible paths. –  Miroslav Lhoťan Mar 5 '13 at 11:19
    
See the cases above, on case 1, both paths were of equal length then counts were added. In case 2 and case 3, paths are not of equal length, so only the shorter path was kept track of and count[v] was given count of shorter path. For getting total number of ways, just add count of both paths in every case. You need not to maintain val[] array here as it was used to keep track of shortest distance. –  Shashwat Kumar Mar 5 '13 at 11:24
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