Topological sort to find dependencies of a specific node

Given the following graph:

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
@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

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