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:

- 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.
- 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.
- 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.
- 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.