# Create Mathematica/Combinatorica graph with edges that have named vertices

How do I make a Mathematica graph from edges with named vertices? EG:

I've tried the above and several variations, but Combinatorica never quite accepts it right. Apparently, Graph[] wants coordinate positions, which I want Combinatorica to figure out itself.

AddVertex to EmptyGraph[0] (or whatever) also fails.

GraphUtilities isn't an option, since I want to do fairly complex analysis on my graphs.

This seems like a simple problem. Graphviz easily creates graphs from edges with named vertices, so I'm sure Mathematica can too?

http://stackoverflow.com/questions/2941727/showgraph-e1-e2-e1-e3-e1-e2-e3-what-is-the-problem-here

but it doesn't seem to help with my specific case.

-

If the sticking point is nodes represented as strings and the heavy-duty graph analysis functions want them as integers, you might consider mapping your strings to integers and vice versa:

``````nodes = DeleteDuplicates@Flatten[graph /. Rule -> List]

{"Conga", "Egypt", "Sarah Desert", "Europe", "Arabia", "UK", "Iceland",
"Greenland", "Germany", "Russia", "Irakistan", "Austr(al)ia", "China", "Canada",
"More Russia", "USA", "Andy's Mountains", "Brazil"}
``````

Now you have the list of nodes. Next do the mapping to and from integers:

``````each[{i_, s_}, Transpose[{Range@Length@nodes, nodes}],
numify[s] = i;
namify[i] = s]
``````

You can now easily convert the nodes to and from integers:

``````numify["Europe"]

4

namify[4]

"Europe"
``````

Convert the whole graph like this:

``````graph /. s_String -> numify[s]
``````

Note that `each` is the following utility function, discussed here: http://stackoverflow.com/questions/160216/foreach-loop-in-mathematica

``````SetAttributes[each, HoldAll];               (* each[pattern, list, body]      *)
each[pat_, lst_, bod_] := ReleaseHold[      (*  converts pattern to body for  *)
Hold[Cases[Evaluate@lst, pat:>bod];]];    (*   each element of list.        *)
``````
-
Yup, that was it. I feel dumb. More specifically: <pre><code> (* this works fine ) ShowGraph[FromOrderedPairs[{{1,2}}]] (*this does not *) ShowGraph[FromOrderedPairs[{{"x","y"}}]] ( this is what confused me *) FromOrderedPairs[{{"x","y"}}] Graph[{{{x, y}}}, CircularEmbedding[Max[x, y]], EdgeDirection -> True] It looks like a graph but it isn't one. Also "x" (string) somehow gets changed to x (variable). </code></pre> –  barrycarter Aug 6 '10 at 20:05

If you have Mathematica 7, try the built-in `GraphPlot`:

``````GraphPlot[{"Conga" -> "Egypt", "Egypt" -> "Conga",
"Conga" -> "Sarah Desert", "Sarah Desert" -> "Conga",
"Egypt" -> "Europe", "Europe" -> "Egypt", "Egypt" -> "Arabia",
"Arabia" -> "Egypt", "Egypt" -> "Sarah Desert",
"Sarah Desert" -> "Egypt", "UK" -> "Europe", "Europe" -> "UK",
"UK" -> "Iceland", "Iceland" -> "UK", "UK" -> "Greenland",
"Greenland" -> "UK", "Europe" -> "Arabia", "Arabia" -> "Europe",
"Europe" -> "Germany", "Germany" -> "Europe", "Europe" -> "Iceland",
"Iceland" -> "Europe", "Europe" -> "Sarah Desert",
"Sarah Desert" -> "Europe", "Germany" -> "Russia",
"Russia" -> "Germany", "Germany" -> "Arabia", "Arabia" -> "Germany",
"Germany" -> "Iceland", "Iceland" -> "Germany",
"Germany" -> "Irakistan", "Irakistan" -> "Germany",
"Austr(al)ia" -> "China", "China" -> "Austr(al)ia",
"Arabia" -> "Irakistan", "Irakistan" -> "Arabia",
"More Russia" -> "Russia", "Russia" -> "More Russia",
"More Russia" -> "China", "China" -> "More Russia",
"More Russia" -> "Irakistan", "Irakistan" -> "More Russia",
"China" -> "Irakistan", "Irakistan" -> "China",
"USA" -> "Greenland", "Greenland" -> "USA",
"USA" -> "Andy's Mountains", "Andy's Mountains" -> "USA",
"Brazil" -> "Sarah Desert", "Sarah Desert" -> "Brazil",
"Brazil" -> "Andy's Mountains", "Andy's Mountains" -> "Brazil",
"Russia" -> "Irakistan", "Irakistan" -> "Russia"},
DirectedEdges -> True]
``````

That will give you the following, for example:

There are many options for layout, vertex and edge labeling and style, etc.

-
Thanks, Michael. This does create a cool represenatation of my graph, but I also want to use things like MaximumClique[] and other Combinatorica functions, so I think I need a real Mathematica Graph[] object, not just a visual representation. –  barrycarter Aug 6 '10 at 13:43

Since you asked specifically for Combinatorica and since I'm always hesitant to start tromping around on the internal details of a package then perhaps this will help you:

edges={{"Conga" -> "Egypt"}, {"Egypt" -> "Conga"}, {"Conga" -> "Sarah Desert"}, {"Sarah Desert" -> "Conga"}, {"Egypt" -> "Europe"}, {"Europe" -> "Egypt"}, {"Egypt" -> "Arabia"}, {"Arabia" -> "Egypt"}, {"Egypt" -> "Sarah Desert"}, {"Sarah Desert" -> "Egypt"}, {"UK" -> "Europe"}, {"Europe" -> "UK"}, {"UK" -> "Iceland"}, {"Iceland" -> "UK"}, {"UK" -> "Greenland"}, {"Greenland" -> "UK"}, {"Europe" -> "Arabia"}, {"Arabia" -> "Europe"}, {"Europe" -> "Germany"}, {"Germany" -> "Europe"}, {"Europe" -> "Iceland"}, {"Iceland" -> "Europe"}, {"Europe" -> "Sarah Desert"}, {"Sarah Desert" -> "Europe"}, {"Germany" -> "Russia"}, {"Russia" -> "Germany"}, {"Germany" -> "Arabia"}, {"Arabia" -> "Germany"}, {"Germany" -> "Iceland"}, {"Iceland" -> "Germany"}, {"Germany" -> "Irakistan"}, {"Irakistan" -> "Germany"}, {"Austr(al)ia" -> "China"}, {"China" -> "Austr(al)ia"}, {"Arabia" -> "Irakistan"}, {"Irakistan" -> "Arabia"}, {"Canada" -> "More Russia"}, {"More Russia" -> "Canada"}, {"Canada" -> "USA"}, {"USA" -> "Canada"}, {"Canada" -> "Andy's Mountains"}, {"Andy's Mountains" -> "Canada"}, {"More Russia" -> "Russia"}, {"Russia" -> "More Russia"}, {"More Russia" -> "China"}, {"China" -> "More Russia"}, {"More Russia" -> "Irakistan"}, {"Irakistan" -> "More Russia"}, {"China" -> "Irakistan"}, {"Irakistan" -> "China"}, {"USA" -> "Greenland"}, {"Greenland" -> "USA"}, {"USA" -> "Andy's Mountains"}, {"Andy's Mountains" -> "USA"}, {"Brazil" -> "Sarah Desert"}, {"Sarah Desert" -> "Brazil"}, {"Brazil" -> "Andy's Mountains"}, {"Andy's Mountains" -> "Brazil"}, {"Russia" -> "Irakistan"}, {"Irakistan" -> "Russia"}}/.Rule[from_,to_]->{from,to};

labels={"Canada", "USA", "Greenland", "Brazil", "Andy's Mountains", "UK", "Iceland", "Germany", "Europe", "Russia", "More Russia", "Irakistan", "Arabia", "China", "Austr(al)ia", "Egypt", "Sarah Desert", "Conga"};

Now if the autoreformatting hasn't ruined this then I think you might be ready.

I haven't made the edges directed in this and I assume you might want to do that. Hopefully this is enough to get you started.

All this is based on paging back and forth for a few minutes in "Computational Discrete Mathematics: Combinatorics and Graph Theory with Mathematica" by Pemmaraju and Skiena. I believe anyone trying to use Combinatorica without having this in front of them is just nuts. I wish we could convince them to bring out a new edition of that, fix some of the typos, and get them to make it a little easier for someone who doesn't know all about Combinatorica to be able to use it to get started.

-
Thanks, Bill. Question: can I do things like MaximumClique using this? I think I need an actual Graph[]. ShowGraph is weird in that it works on vertices/edges, but not on Combinatorica graphs. –  barrycarter Aug 8 '10 at 4:24
FullForm[AddEdges[EmptyGraph[Length[labels]],numberededges]] shows you that the result I provided is a full fleged Combinatorica graph and which you should be able to use in any of the available Combinatorica graph functions. For example, ShowGraph[] takes a Combinatorica graph and renders it into a collection of graphics primitives that can be displayed. Perhaps I should have written g=AddEdges[EmptyGraph[Length[labels],Type->Directed],numberededges]; ShowGraph[g,VertexLabel->labels, PlotRange->All] Does MaximumClique work on g? Is what I wrote correct and clear enough now? –  user413961 Aug 9 '10 at 6:33
MaximumClique[g]/.Thread[Rule[Range[Length[labels]],labels]] returns {Canada, USA, Andy's Mountains} –  user413961 Aug 9 '10 at 18:06

```(* Converts lists of edges into adjacency matrix, saving "nodename->column #" mapping into global variable nodeMap *)
graph2mat[edges_] := Module[{nodes, mat, n},
nodes = Sequence @@@ edges // Union // Sort;
nodeMap = (# -> (Position[nodes, #] // Flatten // First)) & /@
nodes;
mat = (({#1, #2} -> 1) & @@@ (edges /. nodeMap)) // SparseArray //
Normal;
n = Max[Length[#] & /@ {mat, Transpose[mat]}];
];

g = FromAdjacencyMatrix[graph2mat[{"a" -> "b", "b" -> "a"}]];
reverseNodeMap = Reverse /@ nodeMap;
MaximumClique[g] /. reverseNodeMap
```
-
I had to delete the line that imports Combinatorica because it breaks formatting, any idea how to make it work? –  Yaroslav Bulatov Aug 13 '10 at 2:59