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A hypergraph is a generalization of a graph where the edges may include more than two vertices. Here's an example from the wikipedia article:

Example of a hypergraph

I'm looking for a good tool for standard visualization of such graphs. I'm well aware that a hypergraph can be mapped to a regular graph, for example, by adding virtual "hub" vertices. I can then visualize the resulting graph, but this does not visually convey the hyperedges as clearly as the diagram above.

Here are the tools I found. Are there any better ones?

Some excellent documents on visualizing hypergraphs which imply that the authors implemented some visualization capability:

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up vote 15 down vote accepted

It turns out that laying out/drawing hypergraphs is a difficult computational problem. You can see how it's equivalent to drawing Venn/Euler diagrams.

The Graphviz program (a well-known graph visualization package) recently added the gvmap command, which supposedly lets you draw Euler diagrams (you can then easily draw the points). I tried this, but I couldn't find the relevant option. If you go this route, I recommend inquiring on the mailing list.

python-graph doesn't seem to be a graph visualization library itself; it just exports to graphviz's DOT format. This export routine does appear to support hypergraphs, so try that.

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the att.com link is down :( – Alex Gittemeier Mar 6 '13 at 21:36
@AlexGittemeier: Fixed link. – Mechanical snail Nov 17 '13 at 22:44

yed a free (but not open source) editor for graphs can visualize subgraphs, which I guess could be concidered a special of hypergraph.

I use it in degraph to results like this: https://github.com/schauder/degraph/wiki/Examples

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Why do you think subgraphs are related to hypergraphs? – ziggystar Feb 3 '14 at 16:29
@ziggystar Because you can consider the "is a member of subgraph x" relation as "is connected by hyperedge with label x". If you structure hyperedges in layers with each layer only containing hyperedges without nodes in common you can create subgraph a.b.c as the the nodes connected by the hyperedges a in layer 1, b in layer 2 and c in layer 3. Thus you can transform a hypergraph in a graph with subgraphs. If this results in a usable visualization depends on the structure of your graph. – Jens Schauder Feb 4 '14 at 7:21
So you say you can transform a hyper graph into a (layered) set of graphs with subgraphs? This is because otherwise hyper edges may not overlap. This also restricts the visualization of hyper-edges to boxes. IMHO that's a terrible solution, but it appears that there are not that many alternatives. – ziggystar Feb 4 '14 at 8:35
@ziggystar It is a terrible solution for the general cases. I know at least one case where it is quite workable. (see the link in my answer :-) – Jens Schauder Feb 4 '14 at 14:37

You can do hypergraphs with CmapTools from http://cmap.ihmc.us

Actually this software is for making concept maps, but I believe concept maps and hypergraphs are really close concepts.

This is my version of the Hypergraph on wikipedia http://cmapspublic3.ihmc.us/rid=1N8DGWTTL-2307WG-3F0/hypergraph%20not%20concept%20map.cmap

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You can create both undirected and directed graph (also triple/RDF/sentence-diagram/metadata, node-edge-node, 1 to 1, and node-edge-multiplenode diagrams, 1 to n) with CMap, with the corresponding text data structure (i.e., triples, which CMap calls propositions).

You cannot created extended hypergraphs (i.e., triple edge related to triple edge) diagrams and data with CMap except through non-data line drawings.

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