Say I have a directed graph G where each node represents some set I've got. There is an edge from u to v iff u is a subset of v. This graph is transitive and acyclic. There are a number of source nodes (ones which don't contain any of the other nodes), and one sink (a big "unverse" set containing the union of all the others.). In other words, this graph is the transitive orientation of a comparability graph.

What I want to know is, can I automatically generate a nice looking Euler diagram from this graph?

An Euler diagram is like a Venn diagram, but you don't have to show every combination of overlap between the sets.

An example is something like this (taken from wikipedia):

I'm sure I could make diagrams like this by hand, but I'm dealing with large data sets that I will be constantly adding to, so I'd like to automate the process. Note that the relative size of the diagrams is not important to me, only whether two regions overlap, are mutually exclusive, or if one is contained in the other.

Are there algorithms, tools or libraries which allow me to do this?

Please note that I've asked a similar question here, but I've most of my responses have been that LaTeX is simply not the right tool for this job. Thus, I'm asking it here.