Finding Paths in Directed Graph with Greedy Approach With At Least K Nodes and a Given Starting Node

I have a non-weighted DAG graph. What I want to do is to find all the paths in a greedy way and the path should contain at least K nodes, and a given starting node.

Is there any existing algorithm/implmentation that does that?

For example I have the following graph:

``````my %graph =(36=>[31],31=>[30,22],30=>[20],22=>[20,8],20=>[1],8=>[5],5=>[2],2=>[1,20]);
``````

So if I define K=5 and starting node 36, I hope to get:

``````{1,20,22,31,36}
{1,20,2,5,8,22,31,36}
{1,20,30,31,36}
{1,2,5,8,22,31,36}
``````
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I looks like the number of such paths can grow exponentially on the number of nodes. How would you deal with that? –  Leonid Oct 28 '10 at 10:40
@Leonid: I will do that with heuristic e.g. removing certain nodes with certain condition (domain specific). –  neversaint Oct 28 '10 at 10:41
Would backtracking not solve your problem? Faster approach I would look at is thinking about the problem in terms of dynamic programming, given the certain domain specific conditions that can be applied. Without those conditions doesn't look like there is anything better than backtracking. –  Leonid Oct 28 '10 at 10:44

That's not very dificult.

``````use warnings;
use strict;
use Data::Dumper;

my @stack = ();

my %graph = (36=>[31],31=>[30,22],30=>[20],22=>[20,8],
20=>[1],8=>[5],5=>[2],2=>[1,20]);

push(@stack, { node => 36, way => [36] });

while (@stack > 0) {

my \$node = pop(@stack);

# way
my \$way = \$node->{way};

# complete way
if (\$node->{node} == 1) {
print Dumper(\$node->{way});
}

my \$nextArr = \$graph{\$node->{node}};

for my \$nextNod (@\$nextArr) {
my @tmpWay = @\$way;
push(@tmpWay, \$nextNod);

push(@stack, { node => \$nextNod, way => \@tmpWay });
}
}
``````

So you can test, if node the end node and save all path (ways) out. You must optimase this script