Consider this conceptual diagram below, which is for demonstrational purposes only.
Abc Foo \ / \ \ / Foo2 Bar \ / \ Foo3 Bar2 Bar3 \ / \ Foo4 X Y
In the above tree, there is a unique "path", Foo->Bar->Bar2->X. This path is distinct from Abc->Bar->Bar2->X .. Obviously this information is lost in the above represenation, but consider I have all the individual unique paths stored.
They do however, share some part of the path "Bar->Bar2->X".
The purpose of the algorithm I'm trying to either find or implement is that I would like to aggregate this information so I can not store individual paths. But more importantly, I'm trying to find all these common paths, and given them weights. So for example, in the above case, I could condense the information about the "Bar->Bar2->X" and say it happened 2 times. Obviously I'd require it to work for all cases.
And yes, the ultimate idea is to be able to quickly ask the question "Show me all the distinct paths from Foo". In this example there is only 1, Foo->Bar->Bar2->X. Foo->Bar->Bar2->Y and Foo->Bar->Bar3 do not exist. The diagram is for viewing purposes only.