# All possible paths in a series of numbers

I have a small problem where I need to find all possible paths given a set of numbers. For example, lets say we have numbers 1, 2 and 3. I need to find all the possible combinations. The result for this simple case is:
path_1 = 1
path_2 = 2
path_3 = 3
path_4 = 1, 2
path_5 = 1, 3
path_6 = 2, 3
path_7 = 1, 2, 3

It is simple to see that the number of paths is (2^n)-1, so for 3 elements, it is 7, and so on. It is quite simple to do this by hand for a small number of elements, but as the numbers get big, it gets harder and harder.

Someone has suggested that I can use the boost graph library for this problem, but am not quite sure how to do as I do not have enough experience with it. Any help would be much appreciated.

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and your specific problem/question is ...? –  Rafael Oct 18 '12 at 22:24
Have you searched StackOverflow or the Web for "C++ combinations" or "C++ permutations"? –  Thomas Matthews Oct 18 '12 at 22:30
Well, I am looking for a C++ algorithm...sorry for not being specific. Thomas, this is not directly a permutations problem, and I have looked into it, but to no avail. –  Some_Geeza Oct 18 '12 at 22:36
All the difference from usual combinations finding is that you need all combinations from 1 element combinations to n element combinations (can you use for cycle?). –  Öö Tiib Oct 18 '12 at 23:11
Oo, not quite sure what you mean by your question. I don't quite understand it (sorry if I am being stupid here). –  Some_Geeza Oct 18 '12 at 23:43

template< class It >
void compute_all_possible_paths( path_collection_t& res, It b, It e ) {
std::size_t curVecSize = res.size();
for( std::size_t i = 0; i < curVecSize; i++ ) {
path_t p;
p.reserve( res[i].size() + 1 );
std::copy( res[i].begin(), res[i].end(), std::back_inserter(p) );
p.push_back( *b );
res.push_back( p );
}
path_t p;
p.push_back( *b );
res.push_back( p );
if( ++b == e ) return ;
compute_all_possible_paths( res, b, e );
}
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Thanks for that, much appreciated :) –  Some_Geeza Oct 19 '12 at 7:36
Do you understand the logic? I want you to think about it, it's really simple isn't it? –  BigBoss Oct 19 '12 at 7:39
Yes, I definitely understand the logic, and it makes sense. The only snag is that for a large number of elements, it can take up a lot of memory. Thanks anyway, much apprecaited :) –  Some_Geeza Oct 19 '12 at 18:49