What kind of problems on graphs is faster (in terms of big-O) to solve using incidence matrix data structures instead of more widespread adjacency matrices?

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I'm not confident that it's easy to find a computational upper-bound based on the underlying representation. Most of the algorithmic complexity will be in terms of the number of edges or vertices, not the underlying representation. Any lower-bound on complexity is going to apply whether it's implemented on pencil and paper or on a computer. Is think if there are specific classes of problems you have in mind, then maybe mention those and we can try to figure it out? –  Gian Sep 8 '10 at 12:44
Incidence matrix is MxN and adjacency matrix is NxN if N is very large and your graph is very sparse you'll have MxN < NxN. –  Mojo Risin Sep 8 '10 at 15:13

The space complexities of the structures are:

With the consequence that an incidence structure saves space if there are many more vertices than edges.

You can look at the time complexity of some typical graph operations:

Count the valence of a vertex: Adj: O(V) Inc: O(E)

And so on. For any given algorithm, you can use building blocks like the above to calculate which representation gives you better overall time complexity.

As a final note, using a matrix of any kind is extremely space-inefficient for all but the most dense of graphs, and I recommend against using either unless you've consciously dismissed alternatives like adjacency lists.

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I have very dense graphs, with almost every-to-every connections. –  psihodelia Sep 9 '10 at 9:36