How to efficiently construct a connected graph?

For fun I'm learning about graph theory and I came across this problem. Given a set of vertices V, a set of edges E, and a weight for each edge in E, how can I efficiently construct a graph G such that:

• G is connected (all vertices are connected via some path)
• the sum of the weights of the edges is minimized

The edges in E are directed, when all edges in E are present there can be cycles.

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See Minimum Spanning Tree algorithms.

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ok... can i know what MrDatabase is after? SSSP algorithms (dijkstra, Bellman-Ford) are variation of MST, which ars just mentioned. Dijkstra does not solve negative weight cycle issue while Bellman-Ford does.

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MSP does not always give the same solution as SSSP. Negative weight cycles are not a problem in MSP since we're just minimizing the sum of the edge weights. –  redtuna Aug 17 '09 at 10:42
"Edit: the edges in E are directed, when all edges in E are present there can be cycles" it is mentioned in the question. MST is for acyclic graphs, we can't use MST, Prim's, Kruskel or other MST algos for this problem. We can use Bellman-Ford for negative cycles and Dijkstra for positive cycles. Yes SSSP can start from a particular node but tell me about some MST algorithm which can allow cycles? –  Faran Shabbir Aug 18 '09 at 4:48