# Positive topological ordering

Suppose I have a directed acyclic graph with real-number weights on its vertices. I want to find a topological ordering of the DAG in which, for every prefix of the topological ordering, the sum of the weights is non-negative. Or if you prefer order-theoretic terminology, I have a weighted partial order and I want a linear extension such that each prefix has non-negative weight. What is known about this problem? Is it NP-complete or solvable in polynomial time?

• Try the greedy algorithm on this graph: 1-->2-->3, 1-->4-->5, vertex weights are 1:+2, 2:-2, 3:+3, 4:-1, 5:-2. The greedy algorithm would start with v1, then choose v4, and then get stuck. The correct order is v1, v2, v3, v4, v5. Sep 16, 2010 at 3:43
• "some of the Frechet distance problems JeffE and others have been looking at" — Nice abstraction! For others' benefit, here's one version: Suppose you are given an edge-weighted plane graph G, and two vertices s and t n the outer face. You want to transform one boundary path from s to t into the other by a sequence of elementary moves. Each move replaces the current path with its symmetric difference with some face boundary. How quickly can we find the mve sequence that minimizes the maximum length of the evolving path? Sep 16, 2010 at 4:33
• Tsuyoshi, sorry about that, I attempted to add a newline while commenting and it caused my comment to get cut off. So the idea is, you have a string tied tightly around your wrist and you want to know if you can wriggle it off. Your wrist is represented as a polygonal mesh, the cells of which are elements of a partial order (closer to the string earlier, closer to off later in the order). The weight of a cell is the difference in lengths between its inner and outer boundaries. Sep 16, 2010 at 4:37
• @David: Thanks for the explanation. This time I can understand how it is related to the current question, and it is interesting! Sep 16, 2010 at 5:36
• A not-so-useful but fun observation: This problem is equivalent to the single-machine sequencing problem with deadlines and precedence constraints where the processing time of each job can be negative. With nonnegative processing time, this problem is in P (Lawler and Mooer 1969 jstor.org/stable/2628367), and if a solution exists, then a solution exists which is independent of the processing time. This clearly breaks down if some jobs have negative processing time. Sep 17, 2010 at 12:45

This problem appears to be very similar to SEQUENCING TO MINIMIZE MAXIMUM CUMULATIVE COST, problem [SS7] in Garey & Johnson. To wit:

INSTANCE: Set $T$ of tasks, partial order $\prec$ on $T$, a "cost" $c(t) \in Z$ for each $t \in T$ (if $c(t) < 0$, it can be viewed as a "profit"), and a constant $K \in Z$.

QUESTION: Is there a one-processor schedule $\sigma$ for $T$ that obeys the precedence constraints and which has the property that, for every task $t \in T$, the sum of the costs for all tasks $t'$ with $\sigma(t') \leq \sigma(t)$ is at most $K$?

I am uncertain whether the problem remains NP-complete when $K$ is fixed to 0. G&J mention that the problem remains NP-complete if $c(t) \in \{-1,0,1\}$ for all $t \in T$.

• This looks good. Then I think one can take $K=0$ without loss of generality, otherwise add an unconstrained job with $c$-value $-K$ (or $K$ jobs of $c$-value $-1$). Oct 5, 2010 at 9:23
• @mhum: I am working on a technical report on related results and would like to cite you. Would you give me your real name? If you wish you can email it to me, or just stay anon... Jan 12, 2012 at 16:27

Well, my answer is my question from which it turns out that if you could solve this problem in P, you could also solve another open problem: Positive topological ordering, take 3

Edit: This problem also turned out to be NP-complete, so your problem is NP-complete already if your DAG has only two levels, i.e. if there are no directed paths with two edges.

If I understand the problem correctly, I think that the precedence constrained single machine scheduling problem to minimize the weighted sum of completion times (1|prec|\sum wc) can be reduced to the problem you are interested. In problem 1|prec|\sum wc we have n jobs, each with a non-negative weight and a processing time, a poset on the jobs and we want a linear extension of the jobs such that the weighted sum of jobs completion times is minimized. The problems is NP-complete even though we assume that the processing time of each job is equal to 1. Does it make any sense?

• It's definitely an interesting possibility. But how do you do the reduction in such a way that the optimization criterion (minimize sum of completion times) gets transformed into constraints (non-negative prefixes)? Sep 16, 2010 at 16:57
• I do not know this NP-completeness result of scheduling problem, but I think that it refers to the decision problem of deciding whether there is a linear extension such that the weighted sum of job completion times is at most K, therefore I do not think the distinction between an optimization criterion and a constraint is important here. However, I have not understood how to represent the constraint on the weighted sum of completion times in the current problem. Sep 16, 2010 at 18:31
• I think that the reduction is not as easy as I thought at the beginning. I'm not sure anymore of my answer.
– Aldo
Sep 16, 2010 at 19:09
• I have just realized an error in my previous comment. When I posted it, I thought that representing a constraint on the unweighted sum was easy (hence the emphasis on weighted), but that was completely wrong. Sep 17, 2010 at 11:28

What if we always take the maximal element (in the partial order) with the least weight. After we exhaust the elements, we return them in reverse order as the output.

• The problem is invariant under the transformation of reversing the partial ordering and negating all the weights. So I don't see how this can be different from the forward-greedy algorithm Robin K gave a counterexample to in the comments. Sep 22, 2010 at 22:05
• But this method works for his example: first, vertex 5 would be chosen, then vertex 4, then 3, 2, and finally 1. So the final order would be 1, 2, 3, 4, 5. In fact, I don't think it is hard to prove that this method works. Suppose you have a solution which does not have a maximal element (sink) of minimum weight in the last position. Then you can find another solution that does have this property, simply by changing the position of such an element to last, and preserving the rest as it is. Proceed by induction on what is left, and you get a formal proof. Sep 22, 2010 at 22:41
• Yeah... it does not work... 1 --> 2 --> 3, 1 --> 4 with weights 4, -7, 6, 3 respectively. Sep 22, 2010 at 22:53

This problem reminds me a lot of decision trees. I would consider this type of solution, which tries to always pick the most promising path, but by looking at the whole subgraph:

Starting from sink nodes, work your way towards the sources, one level at a time. While you do this, give every edge a weight. This weight should represent the minimum amount you'll have to "pay" or you will "gain" by traversing the subgraph starting from the node the edge points to. Suppose we are at level i+1 and we are moving up to level i . This is what I would do to assign a weight for an edge pointing to a node of level i:

1. edge_weight = pointing_node_weight.
2. Find edge starting from "pointing node" with the maximum weight. Let this weight be next_edge_weight.
3. edge_weight += next_edge_weight

Then, build the order as follows :

1. Let S be the search frontier, i.e. the set of nodes to select from next.
2. Select the node so that (node_weight+maximum_edge_weight) is maximized.
3. Remove the node from the graph and S. Add the node's "children" to S.
4. If the graph is not empty, go to step 1.
5. Halt.

The idea is to traverse those subgraphs that will give as much gain as possible first, in order to be able to bear the cost of the negative weight subgraphs later.