I have a graph G = (V,E)
, where
V
is a subset of{0, 1, 2, 3, …}
E
is a subset ofVxV
 There are no unconnected components in
G
 The graph may contain cycles
 There is a known node
v
inV
, which is the source; i.e. there is nou
inV
such that(u,v)
is an edge  There is at least one sink/terminal node
v
inV
; i.e. there is nou
inV
such that(v,u)
is an edge. The identities of the terminal nodes are not known  they must be discovered through traversal
What I need to do is to compute a set of paths P
such that every possible path from the source node to any terminal node is in P
. Now, if the graph contains cycles, it is possible that by this definition, P becomes an infinite set. This is not what I need. Rather, what I need is for
Pto contain a path that doesn't explore the loop and at least one path that does explore the loop.
P` that explore the loop.
I say "at least one path that does explore the loop", as the loop may contain branches internally, in which case, all of those branches will need to be explored as well. Thus, if the loop contains two internal branches, each with a branching factor of 2, then I need a total of four paths in
For example, an algorithm run on the following graph:
++
 
v 
1>2>3>4>5>6 
   
v  v 
9 +>7+

v
8
which can be represented as:
1:{2}
2:{3}
3:{4}
4:{5,9}
5:{6,7}
6:{7}
7:{4,8}
8:{}
9:{}
Should produce the set of paths:
1,2,3,4,9
1,2,3,4,5,6,7,8
1,2,3,4,5,6,7,4,9
1,2,3,4,5,7,8
1,2,3,4,5,7,4,9
1,2,3,4,5,7,4,5,6,7,8
1,2,3,4,5,7,4,5,7,8
Thus far, I have the following algorithm (in python) that works in some simple cases:
def extractPaths(G, s=None, explored=None, path=None):
_V,E = G
if s is None: s = 0
if explored is None: explored = set()
if path is None: path = [s]
explored.add(s)
if not len(set(E[s])  explored):
print path
for v in set(E[s])  explored:
if len(E[v]) > 1:
path.append(v)
for vv in set(E[v])  explored:
extractPaths(G, vv, exploredset(n for n in path if len(E[n])>1), path+[vv])
else:
extractPaths(G, v, explored, path+[v])
but it fails horribly in the more complex cases.
I'd appreciate any help as this is a tool to validate an algorithm that I have developed for my Master's thesis.
Thank you in advance
4,5,7
is a loop, and thus a valid path may contain several repetitions of4,5,6
(e.g.1,2,3,4,5,7,4,5,7,4,5,7,4,5,7,4,5,7,8
). However, I am not interested in generating such a path. I am only interested in the path that (a) ignores this loop and (b) explores the loop once. Thus, I am interested in1,2,3,4,5,7,8
and1,2,3,4,5,7,4,5,7,8
. If there are branching nodes within a loop, I will need to generate paths that explore each of them as well. Does this make things clearer? – inspectorG4dget May 18 '13 at 7:04