Suppose I have a directed graph with a single source and sink, say a and z. Suppose that the graph is a->b->c->d->e->z, a->f->g->h->z.
What I want to do is maintain the identity of the 'sub groups' b->c->d->e and f->g->h in the result of the topological sort.
My idea is to first scan the graph looking for groups of more than one linked vertex all with a single entry point and a single exit point, replacing each of them with a 'super vertex' labelled 'A', then 'B' etc.
So I would get a result of a->A->B->z or a->B->A->z. Either is acceptable.
When I have found all the super vertices, I would do my topological sort, and then replace the super vertices with the original sequenced vertices.
So my final result will be a->b->c->d->e>f->g->h->z, or a->f->g->h->b->c->d->e->z.
I need an algorithm - pseudo code is fine - to do this. I'll implement in perl if I can.
The graph exists as a dot file, if that helps.
Many thanks - this is my first question on SO, so be gentle!
Roger
