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Is there an algorithm in networkx for dealing with completely (or very highly) connected directed graphs (DiGraphs)?

I have a network of flows which are all non-zero but vary hugely in magnitude. I want to visualise the network, but I need a sensible way of finding an underlying structure where, ideally, each node would have a maximum of one in- and one out-flow.

N.B. This is the concept of 'nodal flows', as described by Nystuen and Dacy (1961) but I don't know what the modern equivalent is called!

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So, in your case, does an outgoing (incoming) flow of a specific node correspond to an outgoing (incoming) edge of that node? –  f_ficarola Jul 5 '14 at 14:38
    
@f_ficarola Yes, I've used 'flow' when I meant 'edge'. –  LondonRob Jul 7 '14 at 13:13
    
So, if I understood well, you are just interested in discovering all those nodes having a maximum of one in- and one out-edge, right? I mean, what you want is a list of nodes having that feature? –  f_ficarola Jul 8 '14 at 6:45
    
Nope! I'm looking to summarise a highly-connected network into a simpler structure like, for example, a minimum spanning tree. The key phrase in the question is 'underlying structure'. I want to extract something from a mess of edges. –  LondonRob Jul 8 '14 at 13:40
    
Ok, now it's clear. I don't think there's something similar in networkx (at least I've never found it), but it shouldn't be too hard to implement. What have you tried so far? –  f_ficarola Jul 9 '14 at 7:17

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