find all non-repeating paths through a set of connected nodes/process diagram

I am trying to understand if its possible in any reasonable way to establish a set of non-repeating paths through a given process diagram.

here are some basic facts about the process diagrams i have:

• they have one or more start points
• they have one or more end points
• all start points have one connector leading from them
• all steps have at least one or more inbound connectors and one or more outbound connectors
• if there is more than one of the following each must be named:
• Start terminators
• End Terminators
• Connections leading from a step

I have access to all of the data I can imagine being required (finding all start points, getting all connections, names of connections etc).

I basically want to find as many unique paths through the process from start point to end point where you don't go round in a circle repeatedly. so you can go through the same step several times but you cannot repeat a complete circuit more than once in any given route through.

This seems like the type of thing people would have written papers about and have proofs for why it can or cannot be done, I just dont know the magic words I need to google that ;-) Sudo code or similar would be ideal (and amazing) but I am happy to do my own reading if someone can point me in the right direction.

ANY SEARCH TERMS SUGGESTIONS VERY WELCOME AND GREATLY APPRECIATED

Note I would be interested solutions that suggest lots of extra "silly" possibilities that have to be reviewed by a human afterwards - it would still be interesting to see what it generated.

An bit of an example to clarify things:

``````        G<--2-E<--1-F-2--|
|     |     ^    |
|     1     |    |
|     |     2    |
\/   \/     |   \/
start--->A--->B---->C-1->D---end
``````

some routes through:

• start,A,B,C:1,D,end
• start,A,B,C:2,F:1,E:1,B,C:1,D,end
• start,A,B,C:2,F:1,E:2,G,A,B,C:1,D,end
• start,A,B,C:2,F:2,D,end

nice but what about a more interesting one:

• start,A,B,C:2,F:1,E:2,G,A,B,C:2,F:1,B,C:2,F:2,D,end

I hit C three times and each time I choose option two and there is no repeating.

Extra points: I was thinking that I can mark some of the nodes with multiple outbound connectors as being consistent within any given execution of a process.. e.g. if there is a "write code" process that has a decision point "language" with two outbound connectors "c#" and "java" I could say that within any given execution of this process it will always be either c# or java - that will never change during the execution of the process. as opposed to something that may change like "are there bugs?" which on first pass through might have a yes, then on the second pass through (after some fix bugs steps ;-) might have the outcome no.

Do you know any terms or techniques relating to this type of extra analysis / processing / definition?

EDIT: I added a example solution implemented in JS as an ansewer based on @Ishtar's answer.

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If you can do a step multiple times then that implies that you can repeat a complete circuit, no? –  quasiverse Sep 2 '11 at 11:09
not necessarily, you might have branch a & b and in branch a you might have branch 1 & 2. So you could loop through branch a twice: once for sub branch 1 and once for sub branch 2. –  gordatron Sep 2 '11 at 11:14
I think that you can get close by doing something that looks at all possible routes until it finds a repeated sequence of steps.. but its about selecting the right start and end point for that sequence and exactly which set of possibilities are you going to cut out. if you had all possible possibilities (impossible they are infinite- just varying the number of times you loop) then you could establish which ones had repeats of the same loop and eliminate them, but i dont know how you set up your code so that you are investigating possibilities.. but stop when a possibility starts looping. –  gordatron Sep 2 '11 at 11:18
Do you mean go through the same branch in different paths? –  quasiverse Sep 2 '11 at 11:18
my comment is not very clear, i have updated the question to have a bit of an example –  gordatron Sep 2 '11 at 11:58

How about a depth first search? This would walk through all the possible paths. The only difficult part is ignoring paths that would lead to the same cycle again. If you're at a node, you check if you been there before (a cycle), and make sure the same sequence isn't in the path already.

For example

``````start,A,B,C:2,F:1,E:1,B,C:2,F:1,E:1,B
``````

From here, we can only go to C. Looking back(the last 4 nodes), we find the cycle `C:2,F:1,E:1,B`. The cycle exists already, so we can't go to node c. Since we can't go anywhere else, this branch doesn't give a correct path.

Pseudocode:

``````allpaths(path,node)
cycle = path.substring(path.lastIndex(node)) + node
if path.contains(cycle)
return
path = path + node
if node.isEndNode
print path
return
for child in node.children
allpaths(path, child)
``````
-
That's what I was thinking.. if you get to a point you have been to and the steps in between are the same as some previous time then that no good. But the problem is for that to work when you get to each node you have to complete all possible paths to such a point that you know you have everything but repeats, which is the situation you were in to begin with :-S –  gordatron Sep 2 '11 at 13:13
don't suppose you can scratch together some sudo code to show how you might approach something like that? I think this is the answer just I don't know how to code it...yet ;-) –  gordatron Sep 2 '11 at 13:18
@gordatron - Did you try it? I think you're making this more complicated than it is... Or maybe I don't understand. Why do you need all possible paths to find a repeated cycle in one path? –  Ishtar Sep 2 '11 at 13:19
Thanks! I am going to give it a go now.. so if you find a repeated loop you just forget about what you are doing, as all other "unique" possibilities are captured in another recursion.. I think you may be right and I am just thinking about ti too much when I should be coding it ;-) –  gordatron Sep 2 '11 at 13:26
nearly finished writing my test.. I guess I need to find all cycles, not just the last one?... coding anyways, I will post the results shortly –  gordatron Sep 2 '11 at 14:06

is this relevant? finding all the elementary circuits of a directed graph. even if it's not the algorithm you use, it may help with appropriate definitions and names.

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reading... i may be some time ;-) thanks though it looks to be a step in the right direction and I will probably learn some good words ;-) –  gordatron Sep 2 '11 at 13:15

a complete example in a web page of @Ishtars solution, the graph is the one from the question... It seems to work, not extensively tested it. Its a far simpler solution than I was expecting ;-)

``````    <!DOCTYPE html PUBLIC "-//W3C//DTD XHTML 1.0 Transitional//EN" "http://www.w3.org/TR/xhtml1/DTD/xhtml1-transitional.dtd">

<html xmlns="http://www.w3.org/1999/xhtml">
<title></title>
<script type="text/javascript">

function connection(name, endPoint) {
this.name = name;
this.endPoint = endPoint;
}

function node(name) {
this.name = name;
this.connections = [];

this.connections[this.connections.length] = conn;
}
}

function printPath(path) {
document.getElementById('output').innerHTML =
document.getElementById('output').innerHTML
+ path + '<br />';
}

function allPaths(path, node) {
if (node.name == "end") {
printPath(path + ',' + node.name);
return;
}
cycle = path.substring(path.lastIndexOf(node.name)) + ',' + node.name;
if (cycle.length > 1 && path.indexOf(cycle) > 0) {
return;
}
for (var i = 0; i < node.connections.length; i++) {
allPaths(path + ',' + node.name + ":" +
node.connections[i].name
,node.connections[i].endPoint);
}
}

var start = new node("start");
var a = new node("A");
var b = new node("B");
var c = new node("C");
var d = new node("D");
var e = new node("E");
var f = new node("F");
var g = new node("G");
var end = new node("end");

</script>
<div id="output"></div>
</body>
</html>
``````

and here is the output (just in case anyone can spot a mistake ;-):

``````start,A:1,B:1,C:1,D:1,end
start,A:1,B:1,C:2,F:1,E:1,B:1,C:1,D:1,end
start,A:1,B:1,C:2,F:1,E:1,B:1,C:2,F:1,E:2,G:1,A:1,B:1,C:1,D:1,end
start,A:1,B:1,C:2,F:1,E:1,B:1,C:2,F:1,E:2,G:1,A:1,B:1,C:2,F:2,D:1,end
start,A:1,B:1,C:2,F:1,E:1,B:1,C:2,F:2,D:1,end
start,A:1,B:1,C:2,F:1,E:2,G:1,A:1,B:1,C:1,D:1,end
start,A:1,B:1,C:2,F:1,E:2,G:1,A:1,B:1,C:2,F:1,E:1,B:1,C:1,D:1,end
start,A:1,B:1,C:2,F:1,E:2,G:1,A:1,B:1,C:2,F:1,E:1,B:1,C:2,F:2,D:1,end
start,A:1,B:1,C:2,F:1,E:2,G:1,A:1,B:1,C:2,F:2,D:1,end
start,A:1,B:1,C:2,F:2,D:1,end
``````

Guess I didn't know about jsFiddle when I wrote this, here is a fiddle with the above code in it:

http://jsfiddle.net/6bWMp/1/

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note: i call it the first time with allPaths('start',a) instead of allPaths('',start) to make the output prettier ;-) –  gordatron Sep 2 '11 at 17:54