Consider the problem of finding a minimum weight connected subset T of edges from a weighted connected graph G. The weight of T is the sum of all the edge weights in T. (a) Why is this problem not just the minimum spanning tree problem? Hint: think negative weight edges. (b) Give an efficient algorithm to compute the minimum weight connected subset T.

(c) from Sciena Manual

(a) spanning tree minimizes summary tree weight, but `minimum weight connected subset`

- every pair path weight, so we can reuse same negative edges to reduce each pair path?

(b) decision on the forehead: run dijkstra's alg n times, tracking previous pairs shortest paths. Seems not the best one, other idea - sort all edges and going from the largest - try to remove each and check connectivity...

`1 - 2 (-1); 2 - 3 (-2); 2 - 4 (-4)`

: you'd select all the edges, but they don't form a path. So I don't think this involves paths, at least not in a really obvious way. – IVlad Jan 26 '11 at 21:09