Suppose I have a weighted non-directed graph G = (V,E). Each vertex has a list of elements.

We start in a vertex *root* and start looking for all occurances of elements with a value *x*. We wish to travel the least amount of distance (in terms of edge weight) to uncover all occurances of elements with value *x*.

The way I think of it, a MST will contain all vertices (and hence all vertices that satisfy our condition). Therefore the algorithm to uncover all occurances can just be done by finding the shortest path from *root* to all other vertices (this will be done on the MST of course).

Edit :
As Louis pointed out, the MST will not work in all cases *if* the root is chosen arbitrarily. However, to make things clear, the root is part of the input and therefore there will be one and only one MST possible (given that the edges have distinct weights). This spanning tree will indeed have all minimum-cost paths to all other vertices in the graph starting from the root.

extra intermediate vertices and edgesare all vertices not labelledx. Ok. – CapelliC Nov 17 '11 at 3:59