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Given the following graph:

enter image description here

What algorithm can I use to output topological ordered lists with tasks to complete, and that are relevant for just for a specific node?

For example, considering the node 2, the list should be:

7, 5, 11, 2

or

5, 7, 11, 2
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So, you don't care about the order of the nodes? In that case, you don't actually want topological sort. –  svick Jan 22 '13 at 12:50
    
I not understand. Required output all nodes or only part? –  Толя Jan 22 '13 at 12:54
    
@svick don't care about the other nodes –  Elad Benda Jan 22 '13 at 12:59
    
@Толя don't care about the other nodes –  Elad Benda Jan 22 '13 at 13:00
2  
@svick: he does care about the order of the nodes, but the order of 7,5 vs 5,7 is free. Those two must come before 11 and 11 must come before 2. The question calls for a topological sort of the subset of the input nodes from which 2 is reachable. For this example there are precisely two admissible outputs. –  Steve Jessop Jan 22 '13 at 13:40
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2 Answers 2

up vote 1 down vote accepted
  1. Reverse the edges
  2. Run a DFS starting from 2
  3. Upon leaving a node, insert it into the list.

Example:

Enter 2
  Enter 11
    Enter 7
    Leave 7, insert into list
    Enter 5
    Leave 5, insert into list
  Leave 11, insert into list
Done, insert 2 into list

Result: 7, 5, 11, 2
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You will have to decompose the graph into an adjacency matrix, in which every link from Node A to Node B is represented as a "1" in a matrix in which nodes correspond to nodes and columns.

From this point, all you need to do is work backwards from a terminal node, identify the nodes that are pointing to it, and then work backwards from each of those as well.

Now, you would probably want to do this in a breadth-first way, so use a queue data structure to keep track of "dependent" nodes.

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I don't think that the first sentence of this answer is correct - topological sorting (and variants thereof) does not require the creation of an adjacency matrix. That may be one approach, but it is not a necessary step. –  High Performance Mark Jan 22 '13 at 13:01
    
@HighPerformanceMark Even though that's what the question says, topological sorting is not actually what the question is asking for. –  svick Jan 22 '13 at 13:07
    
Answering this question doesn't necessitate the construction of an adjacency matrix, though it might be a useful step. –  High Performance Mark Jan 22 '13 at 13:56
    
Jesus/Christ help us all. –  Srikant Krishna Feb 20 '13 at 2:12
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