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Like graph in form of a list :

1 : 2 -> 3
2 : 3 -> 4 -> 1
3 : 2 -> 1 -> 4
4 : 3 -> 2 

whew 1 : 2 -> 3 means that node 1 is connected to nodes 2 and 3.

So the output should be each node list sorted :

1 : 2 -> 3
2 : 1 -> 3 -> 4
3 : 1 -> 2 -> 4
4 : 2 -> 3 

So, this can be done in n * O(log n) time by sorting each list, but what is the most optimal algorithm for this problem ?

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1 Answer 1

up vote 1 down vote accepted

Sorting all separate lists would be easiest way to get what you want. However, if you have n nodes, you have to sort n lists. Each list could have n-1 entries. Sorting 1 list of n-1 entries would have complexity O(n*log(n)). Your total complexity would be O(n²*log(n)).

You could try to go under that by sorting your lists sequentially and exploiting that information. From your example i assume that your graph is undirected, which allows for the following optimization.

An example first:

  1. You start by sorting the first list which would here yield 2->3. Then your first list would be done. You could then add '1' to the lists of node 2 and 3 (as 1 will appear in their lists as first item). This would give you the start of those lists. Then you move on to the list of node 2.
  2. Seeing as you already know the start of it (1), you could skip all that node during sorting. You could do a quick pass through your linked list and remove 1 from the set. Then you sort the rest (which would give 3->4) and append it to the 1 you already had. As with 1, you now have the full sorted list of 2 and you can add '2' to the list of 3 and 4.
  3. You then continue for 3, do a quick pass to remove all nodes you already know, and sort the rest. This would give you 4 and you append that to what you already have to get 1->2->4. Add 3 to the list of node 4.
  4. The list of node 4 is already done as there are no nodes in the list with id >4.

More formally:

initialize the final sorted list of every node to null;
for(i=1;i<=nrNodes;i++){
    remove all nodes with id<i from linked list;
    A:=sort remainder of list
    append A to the final sorted list of i;
    for (every node n in A){
        append i to final sorted list of node n
    }
}

This should be faster than sequentially sorting all the lists as the lists to be sorted are smaller.

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