I'm using `boost::graph`

and its Dijkstra implementation.

I want to compute THE shortest path from a set of vertices to another set of vertices. I do not want to compute all the possible paths between those sets.

The idea is the following : I'm in a building with entrances on various streets. So I can start my journey on any of those streets. But I'm only interested in the shortest one.

If I had used my own implementation of Dijkstra's algorithm, I would have done the following:

- For each start node, the distance map to 0
- Add the start node to the priority queue.

While it's easy to set the distance map to 0 using `boost::dijkstra_shortest_paths_no_init`

, I cannot figure out how to add the node to the priority queue.
I looked into the source code, and it seems pretty much impossible.
So I'm thinking of defining my own Combine functor that will return a 0 distance if I reach one of the start nodes, but it seems rather ugly.

I could create a virtual node, and add edges from the virtual node to starting nodes. However, this triggers some concurrent access problems I would like to avoid.

Did I miss a possibility in the boost library, or does someone know of a clever workaround. I'm also thinking of patching boost to allow a custom initialization of the priority queue.

notwant to compute all the possible paths (but algorithms exist like Floyd–Warshall's). There is nothing wrong with stuffing the priority queue with multiple departure points; the behaviour is the same as if you had null cost edges from your virtual to the starting nodes) – Tristram Gräbener Oct 6 '11 at 15:15