How to efficiently generate all possible spanning trees from a graph

First please note that this question is NOT asking about MST, instead, just `all possible spanning trees`.

So this is NOT the same as finding all minimal spanning trees or All minimum spanning trees implementation

I just need to generate all possible `spanning trees` from a graph.

I think the brute-force way is straight:

Suppose we have `V` nodes and `E` edges.

1. Get all edges of the graph
2. Get all possible combinations of `V-1` out of `E` edges.
3. Filter out `non-spanning-tree` out of the combinations (for a spanning tree, all nodes inside one set of `V-1` edges should appear exactly once)

But I think it is too slow when facing big graph.

Do we have a better way?

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Actually the algorithm you link to will work for you after you set all edge weights to the same value. Most obvious choice for weights would be 1 or 0, but it's entirely irrelevant (apart from overflow issues if there are any). –  G. Bach Mar 2 '14 at 14:13
@G.Bach could you please transform your comment to an answer? –  Jackson Tale Mar 2 '14 at 14:53

Set the weight of all edges to the same value, then use an algorithm to find all minimum spanning trees. Since all spanning trees have `|V|-1` edges and all edge weights are equal, all spanning trees will be minimum spanning trees.