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# dynamic minimum spanning tree

I want to make a dynamic minimum spanning tree. I have an existing MS tree over n vertices and I add one more vertex and edges to all the existing vertices from this new vertex. How can I update the MST for the new graph efficiently? O(n) would be optimal. Can I also make delete vertex operation efficient?

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Related --> stackoverflow.com/questions/2679472/… – digEmAll Mar 21 '12 at 19:56
Here I am increasing the size of the tree and introducing n new edges, it might be the case that every edge gets replaced and still time taken should be O(n). – anirudh Mar 21 '12 at 20:01
When you add a vertex, do you always add edges from the new vertex to all the existing vertices ? If so, the new MST is just NEW-VERTEX + MST... – digEmAll Mar 21 '12 at 20:05
yes, to all the existing vertices – anirudh Mar 21 '12 at 20:06
So just take the NEW_VERTEX and link it to the MST root. Jobs done. (if I'm not missing something) – digEmAll Mar 21 '12 at 20:07

`O(n log n)` using Kruskal's algorithm. The key idea is any edges not used in the original MST will not be used in the new MST either. So just sort the `n` new edges `O(n log n)`, merge this sorted list with the list of edges of the old MST (which you kept in sorted order, right?) `O(n)`, then run Kruskal's algorithm anew on the resulting sorted list of edges `O(n)-ish`.