# How do I transform an undirected, very cyclic graph into a directed acyclic graph?

I'm working on a modified TopSort algorithm and am having trouble finding / creating large (more than 1000 nodes) directed acyclic graphs to use for testing. I have an undirected sample graph from another project that is of a good size, but has many cycles. Is there an algorithm I could use to direct the edges so that there are no longer cycles?

-

this provides a way to get acyclic graphs. Basically, a graph traversal produces a tree, which defines a partial order on the original nodes. Then, just direct all the edges so that they either point in a consistent direction according to the partial order, or are between 2 elements that are not ordered (these can point in any direction).

-
I did not read it all, but to my understanding: section 2.1 of this paper describe a way to convert directed graph to DAG (i.e. break cycles). And you propose to add a previous step to convert undirected to directed graph using (any) traversal of the graph. –  Juh_ Apr 24 '13 at 8:40

To garuantee that the new directed graph is connected would I use beadth-first search as follows.

`````` old_undirected graph G
new_directed graph D
dequeue Q
v is any node in G
add v to D
Q.push_back(v)
while(Q is not empty):
v = Q.pop_front()
for all neighbors u to v:
if u in D
add edge u->v to D
else
add u to D and add edge v->u to D
Q.push_back(u)

return D
``````

this graph should contain all the edges of the original graph but the should be so directed that there won't be any circles.

-