# (Set of) List of sets (Cartesian product(s)) from graph corresponding to set of lists

The set of lists (A):

``````{[a,b,d,f],
[a,c,d,f],
[a,b,e,f],
[a,c,e,f]}
``````

where a, b, c, d, e and f are items (not necessarily characters in a word), can be factored as a directed acyclic graph (DAG, B, all edges point from left -> to right):

``````  b-->d
/ \ / \
a   X   f
\ / \ /
c-->e
``````

or as the Cartesian product of 4 sets of items (C, termed axes):

``````{a} * {b,c} * {d, e} * {f}
``````

Guava has a nice method for generating a set of lists (A) from a list of sets (C).

I am trying for an algorithm that accepts a graph like B and returns a list of axes like C (actually one or more, see example below), which can be used with the method above to generate a set of lists like A.

However, it is not guaranteed that the set of lists will be a Cartesian product. For example:

``````{[a,b,d,f],
-missing-
[a,b,e,f],
[a,c,e,f]}
``````

corresponding to the DAG:

``````  b-->d
/ \   \
a   \   f
\   \ /
c-->e
``````

cannot be expressed as 1 Cartesian product but can be expressed as 2:

``````{a}*{b}*{d,e}*{f}    and    {a}*{c}*{e}*{f}
``````

corresponding to the graphs:

``````      d
/ \
a-->b   f            and     a-->c-->e-->f
\ /
e
``````

The lists should have some degree of relatedness (think: a random sample of a very large Cartesian product).

Note: lists of different lengths cannot share the same set of axes.

Is there an algorithm that does this and I just haven't Googled the right terms? If not, can we create it?

Complexity of the algorithm may be an issue as the set could have 10^2 lists and each list could have 10^2 of items, i.e. a fairly large graph. I can guarantee that the input graphs would have the minimal number of nodes possible to represent the set of lists..., and that connected non-branching nodes (a->c->e->f) can be rolled up into single objects (acef).

PS. I don't think this is same as the Cartesian product of graphs, but there could be some overlap.

-
There are graph libraries (I am thinking about jgrapht here, but there are probably others), have you tried and poked them to see if they had something approaching? –  fge Jun 17 '13 at 16:44
@fge I am familiar with JGraphT and it does not have such an algorithm. –  Jon Jun 17 '13 at 17:17
I would consider the lists as words and try to locate longest common suffixes. –  G. Bach Jun 17 '13 at 18:23
Is there some reason you don't want to generate the set of lists directly? –  David Eisenstat Jun 17 '13 at 18:30
Would maybe a BFS from a source of the DAG (I assume it's a DAG?) work, checking for branches every time a new boundary is reached? –  G. Bach Jun 17 '13 at 19:44