There's an tree with N nodes and N-1 edges (making it a tree). Each node has a weight W(i). How can you select a subtree of size K nodes that still includes the root of the original tree? I have to do this so it minimizes the "cost" of selecting this "subtree", where cost is defined as the sum of the weights of all edges kept.

I think I've done a problem like this before, and it seems like DP/recursion. However, I know how to deal with it when it's limited to 2 children per node. You'd defined a function cost(n, i) which means the minimum cost of keeping i nodes starting at node n. You'd iterate from i = 0 to n in one of the children, and give the rest to the other child. However, since each node can have an unlimited amount of children, is there a way to deal with this?

Thanks

`Greedy doesn't work for a sample data I made: for example assume there are 4 nodes labeled 1,2,3,4. Node 1 is the root. These are the edges in this format (begin, end, distance): (1, 2, 2), (1, 3, 3), (3, 4, 1). This algo would pick node 2 and node 3 to be connected but the correct answer would be to pick 3 and 4`

– nhahtdh Oct 12 '12 at 20:12