I'm trying to compute a partial "topological sort" of a dependency graph, which is actually a DAG (Directed Acyclic Graph) to be precise; so as to execute tasks without conflicting dependencies in parallel.

I came up with this simple algorithm because what I found on Google wasn't all that helpful (I keep finding only algorithms that themselves run in parallel to compute a normal topological sort).

```
visit(node)
{
maxdist = 0;
foreach (e : in_edge(node))
{
maxdist = max(maxdist, 1 + visit(source(e)))
}
distance[node] = maxdist;
return distance[node];
}
make_partial_ordering(node)
{
set all node distances to +infinite;
num_levels = visit(node, 0);
return sort(nodes, by increasing distance) where distances < +infinite;
}
```

(Note that this is only pseudocode and there would certainly be a few possible small optimizations)

As for the correctness, it seems pretty obvious: For the leafs (:= nodes which have no further dependency) the maximum distance-to-leaf is always 0 (correct because the loop gets skipped due to 0 edges). For any node connected to nodes n1,..,nk the maximum distance-to-leaf is 1 + max{distance[n1],..,distance[nk]}.

I did find this article after I had written down the algorithm: http://msdn.microsoft.com/en-us/magazine/dd569760.aspx But honestly, why are they doing all that list copying and so on, it just seems so really inefficient..?

Anyway I was wondering whether my algorithm is correct, and if so what it is called so that I can read up some stuff about it.

Update: I implemented the algorithm in my program and it seems to be working great for everything I tested. Code-wise it looks like this:

```
typedef boost::graph_traits<my_graph> my_graph_traits;
typedef my_graph_traits::vertices_size_type vertices_size_type;
typedef my_graph_traits::vertex_descriptor vertex;
typedef my_graph_traits::edge_descriptor edge;
vertices_size_type find_partial_ordering(vertex v,
std::map<vertices_size_type, std::set<vertex> >& distance_map)
{
vertices_size_type d = 0;
BOOST_FOREACH(edge e, in_edges(v))
{
d = std::max(d, 1 + find_partial_ordering(source(e), distance_map));
}
distance_map[d].insert(v);
return d;
}
```