# How to draw the classic state diagram using Mathematica?

Is it possible and practical for Mathematica to draw something like this (being created by Graphviz):

This is the best that I can get (but the shape and style are not satisfying):

Code:

``````GraphPlot[{{A -> C, "go"}, {C -> B, "gone"}, {C -> D,
"went"}, {C -> C, "loop"}}, VertexLabeling -> True,
DirectedEdges -> True]
``````
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There is no reason you cannot use graphics primitives to draw something like this. Are you requesting an automatic layout solution? –  Mr.Wizard Nov 13 '11 at 3:34
@Mr.Wizard Yes, I am looking for some higher level primitives for drawing complicated state diagrams. I don't know whether Mathematica provides that. I searched through the documentation and checked the options of "GraphPlot" function and ended up with the code above. –  Ning Nov 13 '11 at 3:36
Why did you accept my answer? The shape it still wrong. I appreciate it, but I think you should wait for a better answer. –  Mr.Wizard Nov 13 '11 at 4:18
Yes, I think it may inhibit other answers. Again, thank you however. –  Mr.Wizard Nov 13 '11 at 4:37
@Mr.Wizard You are a very nice person to have in a community, thank you! –  Ning Nov 13 '11 at 5:04

You can do something like this using `VertexRenderingFunction`.

``````GraphPlot[{{A -> C, "go"}, {C -> B, "gone"}, {C -> D, "went"}, {C -> C, "loop"}},
DirectedEdges -> True,
VertexRenderingFunction -> ({{White, Disk[#, 0.15]},
AbsoluteThickness[2], Circle[#, 0.15],
If[MatchQ[#2, A | B], Circle[#, 0.12], {}], Text[#2, #]} &)]
``````

Method Updated February 2015

To preserve the ability to interactively rearrange the graph with the drawing tools (double click) one must keep the vertex graphics inside of `GraphicsComplex`, with indexes rather than coordinates. I believe one could do this from `VertexRenderingFunction` using an incrementing variable but it seems easier an possibly more robust to do it with post-processing. This works in versions 7 and 10 of Mathematica, presumably 8 and 9 as well:

``````GraphPlot[
{{A -> C, "go"}, {C -> B, "gone"}, {C -> D, "went"}, {C -> C, "loop"}},
DirectedEdges -> True
] /.
Tooltip[Point[n_Integer], label_] :>
{{White, Disk[n, 0.15]},
Black, AbsoluteThickness[2], Circle[n, 0.15],
If[MatchQ[label, A | B], Circle[n, 0.12], {}], Text[label, n]}
``````

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Is there a "VertexLabelingFunction"? –  Ning Nov 13 '11 at 4:53
@Ning I had an error in my answer; I meant `VertexRenderingFunction`. I don't believe there is a Vertex*LabelingFuncion. Also, I noticed that I had a flaw in my graphics relative to your original example regarding the circle sizes. I corrected this is the second version I just put up. –  Mr.Wizard Nov 13 '11 at 4:57

There's no need for interactive placement to get your vertices at the desired location as mr.Wizard suggests in his answer. You can use `VertexCoordinateRules` for that:

``````GraphPlot[{{A -> C, "go"}, {C -> B, "gone"}, {C -> D, "went"}, {C -> C, "loop"}},
DirectedEdges -> True,
VertexRenderingFunction ->
({{White, Disk[#, 0.15]}, AbsoluteThickness[2], Circle[#, 0.15],
If[MatchQ[#2, A | B], Circle[#, 0.12], {}], Text[#2, #]} &),
VertexCoordinateRules ->
{A -> {0, 0}, C -> {0.75, 0},B -> {1.5, 0.25}, D -> {1.5, -0.25}}
]
``````

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I didn't mean that it was necessary to have interactive layout, but I can see how that may be inferred. This method works too. Do you know of any way to preserve the editability besides a variation of the hack I used? –  Mr.Wizard Nov 13 '11 at 22:23
@Mr.Wizard I don't see an easy way out. –  Sjoerd C. de Vries Nov 13 '11 at 22:57