Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Sorry the title was no good. I am new to graph algorithms.

I'm stuck with a problem for several days. If all the nodes of a directed acyclic graph are weighted, while the weight can be negative, how can I find out a set for which the sum of the weights is maximum?

for example, we have a graph of 5 nodes-

  • node 1 : weight 30, has a edges directed to node 4
  • node 2 : weight 25, has edges directed to nodes 4,5
  • node 3 : weight -65, no edges from it
  • node 4 : weight -20, edge to node 5
  • node 5 : weight 2, no edge from it

while finding out the maximum points, say, if node 1 is chosen, node 4 and as well as 5 must be chosen(as they are directly/indirectly adjacent from node 1).

so maximum point we can have is- (30-20+2)+(25)=37

for node 1 and descendant 4,5, and then for node 2(node 4,5 not considered anymore)

I hope I made my problem clear. Can anybody tell me how I can achieve this?

share|improve this question
2  
Is this homework? –  dbaupp Apr 28 '12 at 6:54
    
I'm afraid it's not entirely clear. The objective is to choose a set of starting nodes, such that the sum of the weights of those starting nodes and all additional nodes reachable from that starting set is maximum? –  Jeffrey Hantin Apr 28 '12 at 7:04
    
No it's not a homework. I tried to solve a graph relation problem, found out the SCC's of the graph and had to apply this on those connected sets. –  crysoberil Apr 28 '12 at 10:48
    
@Jeffrey Hantin : No you can choose any combination of the verteces, while making sure summation of the points is maximum. –  crysoberil Apr 28 '12 at 10:49

1 Answer 1

If I understand your question correctly... What you want is to find a node that maximizes the sum of values that that node can reach.

Here is some psuedo-code that would do this for you

def maxVertex(Vertices):
    for vertex in reversed_topological_sorted(Vertices):
         vertex.value = vertex.weight
         if vertex.neighbors:
                vertex.value += sum( other_vertex.value for other_vetrex in vertex.neighbors )

     return max(Vertices,key=lambda vertex: vertex.value)
share|improve this answer
    
Actually, it looks to me like he means the set of possibly multiple starting nodes, without counting any reachable node twice. –  Jeffrey Hantin Apr 28 '12 at 7:13
    
Yes that's what i want to do. Actually the maximum point obtained this way should be enough for the problem. –  crysoberil Apr 28 '12 at 10:55

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.