Has anyone seen this problem before? It's supposed to be NP-complete.

We are given vertices V_1,...,V_n and possible parent sets for each vertex. Each parent set has an associated cost. Let O be an ordering (a permutation) of the vertices. We say that a parent set of a vertex V_i is consistent with an ordering O if all of the parents come before the vertex in the ordering. Let mcc(V_i, O) be minimum cost of the parent sets of vertex V_i that are consistent with ordering O. I need to find an ordering O that minimizes the total cost: mcc(V_1, O), ... ,mcc(V_n, O).

I don't quite understand the part "...if all of the parents come before the vertex in the ordering." What does it mean?