I'm playing a game in which to proceed to the next level, we must defeat each level before it. Each level corresponds to a certain letter.

I've represented this as a graph traversal problem, but I'm trying to find all paths in a graph without a start or end node.

My graph is represented as a dictionary, with the key being strings and the values being a list of strings.

```
{
'A2': ['A1', 'B'],
'A1': [],
'B': [],
'C': ['A2'],
}
```

To go to level A2, we must complete A1 and B.

For example, an example path would be A1, B, A2, C. Another path could be B, A1, A2, C.

Implementations of depth first search or breadth first search require a start node. I'm thinking a good start node would be any key whose values are empty: in this case, A1 and B, but I'm uncertain how to implement dfs or bfs with two start nodes.

I've been working with tweaking this implementation of finding paths, but this only works with a start level and an end level.

```
def find_path(graph, start, end, path=[]):
path = path + [start]
if start == end:
return path
if start not in graph:
return None
for node in graph[start]:
if node not in path:
newpath = find_path(graph, node, end, path)
if newpath: return newpath
return None
print(find_path(course_dict, 'A1', 'PC'))
```

but I'm getting None for my answer.

`but I'm trying to find all paths in a graph without a start or end node`

. Would not make more sense to look at all the paths that bring you to the final level? – abc Sep 5 '18 at 22:04