# Algorithm for sorting some nodes

I am trying to find a suitable algorithm to solve this: suppose I have some (oriented graph) nodes. Each node might have or not a parent (meaning at most one parent). Suppose this notation for a node: (id, id_parent). Some nodes will be (id_i, NULL) while there will be nodes (id_j, id_i) as "sons" of id_i . Having an array of these nodes in a particular order, I want to get them sorted in this order: parent-son-son of son-son-son of son, etc.

Example: nodes (1, NULL), (2,NULL), (3,1), (4,3), (5,2), (6,3)

The sorted array will be: (1,NULL), (3,1), (4,3), (6,3), (2, NULL), (5,2) . A kind of in-depth tree exploration.

Which algorithm would be suitable for achieving this? Thanks

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what happens if 2 nodes have the same children? Do they appear twice? Once? –  UmNyobe May 6 '12 at 16:30
there is not such possibility. each node has a single parent –  Madrugada May 6 '12 at 16:33
Could you elaborate on your example? I'm still not clear what is the sorted order you're referring to. I'm leaning towards a post order traversal though, from what little I understand. –  Dhruv Gairola May 6 '12 at 16:36
how can I know, you say an `oriented graph`. And it may occurs in an oriented graph –  UmNyobe May 6 '12 at 16:37
because I said: "Each node might have or not a parent." –  Madrugada May 6 '12 at 16:38

EDIT: If the graph is a forest (disjoint union of trees) - then a simple DFS on it from sources will do. Just construct the graph (It is `O(nlogn)` to sort, if it is not already sorted, or `O(n)` using radix sort), find the list of sources, and do the DFS from each source, and each time you visit a node, store it in an output array. Iterate while there are undiscovered vertices.