# Changing the Edge Route in GraphPlot to Avoid Ambiguity

I have the following undirected graph

``````gr={1->2,1->3,1->6,1->7,2->4,3->4,4->5,5->6,5->7};
``````

which I wish to plot with GraphPlot in a 'diamond' format. I do this as outlined below (Method 1) giving the following:

The problem is that this representation is deceptive, as there is no edge between vertices 4 & 1, or 1 & 5 (the edge is from 4 to 5). I wish to change the route of edge {4,5} to get something like the following:

I do this by including another edge, {5,4}, and I can now use MultiedgeStyle to 'move' the offending edge, and I then get rid of the added edge by defining an EdgeRenderingFunction, thus not showing the offending line. (Method 2,'Workaround'). This is awkward, to say the least. Is there a better way? (This is my first question!)

Method 1

``````gr={1->2,1->3,1->6,1->7,2->4,3->4,4->5,5->6,5->7};

vcr={1-> {2,0},2-> {1,1},3-> {1,-1},4-> {0,0},5-> {4,0},6-> {3,1},7-> {3,-1}};

GraphPlot[gr,VertexLabeling-> True,
DirectedEdges-> False,
VertexCoordinateRules-> vcr,
ImageSize-> 250]
``````

Method 2 (workaround)

``````erf= (If[MemberQ[{{5,4}},#2],
{ },
{Blue,Line[#1]}
]&);

gp[1] =
GraphPlot[
Join[{5->4},gr],
VertexLabeling->True,
DirectedEdges->False,
VertexCoordinateRules->vcr,
EdgeRenderingFunction->erf,
MultiedgeStyle->.8,
ImageSize->250
]
``````
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@TomD I suggest changing "arrow direction" by "edge routing" in the title to get a more descriptive one. –  belisarius is forth Nov 10 '10 at 0:51
Thanks! That is a nice suggestion and I have edited accordingly. (I have also slightly modified the code for 'Method 2'. –  TomD Nov 10 '10 at 17:36
@TomD: the other workaround I devised was to use GraphPlot3D and to rotate the drawing until it looked 'pleasing'. But it didn't look like your twin-diamonds. –  High Performance Mark Nov 10 '10 at 18:28
This one triggers a more difficult one: How to detect if one edge is getting routed through a vertex. This happens all the time, and in several occasions I tried to figure out what was wrong with a dynamically generated graph only to find out that it was an edge routing problem. –  belisarius is forth Nov 11 '10 at 12:18
@belisarius when this Q was first posted, I wrote the function `IntersectQ` (gist.github.com/673553) which could be passed to EdgeRenderingFunction to test for routing problems. But it was too slow to be used in a sensible solution to the original question. –  Simon Nov 12 '10 at 1:05

## Just a kickstart

The following detects if there is an edge that "touches" a vertex that is not one of its endpoints.

It works only for straight line edges right now.

The plan is using it as a first step and then creating a mock edge as in the method 2 posted in the question.

Uses another answer I posted here.

``````Clear["Global`*"];
gr = {1 -> 2, 1 -> 3, 1 -> 6, 1 -> 7, 2 -> 4, 3 -> 4, 4 -> 5, 5 -> 6, 5 -> 7};
vcr = {1 -> {2, 0}, 2 -> {1, 1}, 3 -> {1, -1}, 4 -> {0, 0},
5 -> {4, 0}, 6 -> {3, 1}, 7 -> {3, -1}};
a = InputForm@GraphPlot[gr, VertexLabeling -> True, DirectedEdges -> False,
VertexCoordinateRules -> vcr, ImageSize -> 250] ;

distance[segmentEndPoints_, pt_] := Module[{c, d, param, start, end},
start = segmentEndPoints[[1]];
end = segmentEndPoints[[2]];
param = ((pt - start).(end - start))/Norm[end - start]^2;
Which[
param < 0, EuclideanDistance[start, pt],
param > 1, EuclideanDistance[end, pt],
True, EuclideanDistance[pt, start + param (end - start)]
]
];

edgesSeq= Flatten[Cases[a//FullForm, Line[x_] -> x, Infinity], 1];

vertex=Flatten[
Cases[a//FullForm,Rule[VertexCoordinateRules, x_] -> x,Infinity]
,1];

Off[General::pspec];
edgesPos = Replace[edgesSeq, {i_, j_} -> {vertex[[i]], vertex[[j]]}, 1];
On[General::pspec];

numberOfVertexInEdge =
Count[#, 0, 2] & /@
Table[ Chop@distance[segments, vertices], {segments, edgesPos},
{vertices, vertex}
];

If[Length@Select[numberOfVertexInEdge, # > 2 &] >  0,
"There are Edges crossing a Vertex",
"Graph OK"]
``````
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I was trying to generalize this one, but there are too many pitfalls. Anyone knows if there are wire routing algorithms for Mathematica out there? –  belisarius is forth Nov 13 '10 at 17:59

Here's an even more awkward workaround:

``````Graphics[Annotation[GraphicsComplex[{{2., 0.}, {1., 1.},
{1., -1.}, {3., 1.}, {3., -1.}, {0., 0.}, {4., 0.}, {0.,
2.}, {4., 2.}},
{{RGBColor[0.5, 0., 0.], Line[{{1, 2}, {1, 3}, {1, 4}, {1, 5},
{2, 6}, {3, 6},  {7, 4}, {7, 5}, {6, 8}, {8, 9}, {9,
7}}]},
{Text[Framed[1, {Background -> RGBColor[1, 1, 0.8],
FrameStyle -> RGBColor[0.94, 0.85, 0.36],
FrameMargins ->
Automatic}], 1], Text[Framed[2,
{Background -> RGBColor[1, 1, 0.8], FrameStyle ->
RGBColor[0.94, 0.85, 0.36],
FrameMargins -> Automatic}], 2],
Text[Framed[3, {Background -> RGBColor[1, 1, 0.8],
FrameStyle -> RGBColor[0.94, 0.85, 0.36],
FrameMargins ->
Automatic}], 3], Text[Framed[6,
{Background -> RGBColor[1, 1, 0.8], FrameStyle ->
RGBColor[0.94, 0.85, 0.36],
FrameMargins -> Automatic}], 4],
Text[Framed[7, {Background -> RGBColor[1, 1, 0.8],
FrameStyle -> RGBColor[0.94, 0.85, 0.36],
FrameMargins ->
Automatic}], 5], Text[Framed[4,
{Background -> RGBColor[1, 1, 0.8], FrameStyle ->
RGBColor[0.94, 0.85, 0.36],
FrameMargins -> Automatic}], 6],
Text[Framed[5, {Background -> RGBColor[1, 1, 0.8],
FrameStyle -> RGBColor[0.94, 0.85, 0.36],
FrameMargins ->
Automatic}], 7]}}, {}], VertexCoordinateRules ->
{{2., 0.}, {1., 1.}, {1., -1.}, {3., 1.}, {3., -1.}, {0., 0.},
{4., 0.}}], FrameTicks -> None, PlotRange -> All,
PlotRangePadding -> Scaled[0.1], AspectRatio -> Automatic,
ImageSize -> 250]
``````

Of course, what I've done is taken the `FullForm` of the graphic of the graph and edited it. I added a couple of points to the `GraphicsComplex` (ie `{0., 2.}` and `{4., 2.}`), put some new legs into the line (ie `{6, 8}, {8, 9}, {9, 7}`) and deleted the leg which drew the line between vertices 4 and 5.

I don't really offer this as a 'solution' but someone with more time than I have to work on this should be able to write a function to manipulate the GraphicsComplex into a desired form.

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