# Finding path from A to B using a minimal spanning tree - C/C++

Say we find a minimal spanning tree. Now, we just need a path from A to Z in the MST. How can we do this in O(n^2) time?

We start at root A. then we look at all edges in the tree of the form Ax (where x is any vertex).

Then, say we find: AB, AC, AD, etc... Then for each one, we look for edges of form: Bx, Cx, Dx...this is clearly not O(n^2).

So what is a better / efficient way to find path A -> Z given a MST?

Thanks

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DFS would suffice –  user1168577 Jul 9 '12 at 16:05
edge weights are distances between points, so no they are not necessarily integers. –  user809240 Jul 9 '12 at 16:07
How would a DFS work? We create a DFS from the MST? –  user809240 Jul 9 '12 at 16:08
@user809240, why O(n^2) is a goal? It would be hard to that with MST for more than O(n) (as it has n-1 edge for n points) –  Alexei Levenkov Jul 9 '12 at 16:17

Depth-first search will be sufficient, it is in the worst case O(|V| + |E|). The fact that your input is a MST means that you don't have to worry about any loop detection, as you would have in a general graph.

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It should also be noted that in a MST `|E|` is at most `|V|` and not `|V|^2` as in a general graph, so the algorithm will be `O(|V|)`. Way faster than the goal of `O(|V|^2)`. –  JPvdMerwe Jul 9 '12 at 17:04

Look up Minimum Spanning Tree and you will find that it is a minimum subgraph that connects all the vertices together. That means that every edge will be used at most once. You can just use either a DFS or BFS to find the desired path, without the need to check for cycles since you already have the MST.

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