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...