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# Find all possible path between two nodes in a undirected graph

Can anybody give me a C Code to find all possible paths between two nodes? eg. if the graph has following edges 1-2 1-3 2-3 2-4 3-4

all paths between 1 and 4 are:

1-2-3-4

1-2-4

1-3-4

1-3-2-4

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Duplicate : stackoverflow.com/questions/713508/… – Donnie May 21 '10 at 2:26

A Depth-First Search does this job.

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Not really. DFS might give you a few paths, but not all of them. – Keith Randall May 21 '10 at 2:14
@Keith. Think about a dfs solution to n-queen problem. – Yin Zhu May 21 '10 at 2:37
The solution I think you're thinking of (loop over all possible squares, place a queen there if possible, and recurse) is not DFS. – Keith Randall May 21 '10 at 2:55
@ Yes, it is. dfs is a family of search algorithms.. – Yin Zhu May 21 '10 at 3:03
@Keith: since the opening of the Wikipedia article says Depth-first search (DFS) is an algorithm for traversing or searching a tree, tree structure, or graph. One starts at the root (selecting some node as the root in the graph case) and explores as far as possible along each branch before backtracking, I'm not convinced that supports your thesis. It explicitly mentions back-tracking, which is what is needed to ensure complete coverage. – Jonathan Leffler May 21 '10 at 4:50

(I'm assuming you don't want repeated nodes in your path - otherwise the number of possible paths is infinite.)

You can do a relaxation:

``````while (there is a change) {
for (v in nodes(G)) {
for (e in edges(v)) {
paths_to[v] = paths_to[v] union ((paths_to[e.to] not containing v) append v)
}
}
}
``````

The result can still be exponential in the size of the input graph. Getting all paths is probably not what you want to do.

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This is a simple algorithm to the problem. It is not an optimal algorithm.

``````static struct {
int value1;
int value2;
int used;
} data[] = {
{ 1, 2 },
{ 1, 3 },
{ 2, 3 },
{ 2, 4 },
{ 3, 4 },
};

enum { DATA_SIZE = sizeof data / sizeof *data };

static int output[DATA_SIZE];

int traverse(int from, int to, int depth) {
output[depth++] = from;

int i;
if (from == to) {
for (i = 0; i < depth; i++) {
if (i) {
printf("-");
}
printf("%d", output[i]);
}
printf("\n");
} else {
for (i = 0; i < DATA_SIZE; i++) {
if (!data[i].used) {
data[i].used = 1;

if (from == data[i].value1) {
traverse(data[i].value2, to, depth);
} else if (from == data[i].value2) {
traverse(data[i].value1, to, depth);
}

data[i].used = 0;
}
}
}
}

int main() {
traverse(1, 4, 0);
}
``````
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hi bkail, thanks for your program.but i am finding some difficulties while checking for the following nodes,too many cycles are coming. can you try the following edges and find path having no repeated nodes between 1 and 4 {0, 5}, {1 ,4}, {0, 2}, {5 ,4 }, {1 ,2 }, {4 ,3 }, {3 ,10}, {1, 6 }, {6 ,2 }, {2 ,3 }, {2, 7 }, {3 ,14 }, {6, 7 }, {7, 8 }, {8, 10 }, {8, 9 }, {8 ,12 }, {8 ,14}, {5 ,11 }, {10 ,11 }, {10 ,13}, {10 ,9 }, {11 ,14 }, {11 ,12 }, {12 ,13 }, {13 ,14 }, – manoj Jun 2 '10 at 9:02

a recursive method:

``````findPaths(path = startNode, goal)
paths = []
if the last node in path is goal:
return path
for each node n connected to the last node in path:
if n is not already on the path:
paths.append(findPaths(path.append(node), goal))
return paths //may still be []
``````
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It is too late and not the C code but may be help others. This algo show how I implement it in java.

``````findPath(start)
Childs = getDirectChildsOf(start)
foreach child in Childs
tempRoute;
Here `tempRoute` may be a `Route` class that maintain a list of node. Able to add single `node` and other `route` to `tempRoute`. It also not find all possible path. for that you have to maintain a visited flag for each node.