# new Graph in Mathematica 8.0

1. Has anybody figured out a way to modify Graph objects in Mathematica 8? In particular, how to get the same functionality you get when you right click on the graph.

2. Some of the new graph functions conflict with `Combinatorica`, is there a way to force Mathematica to use a built-in version of the function? In other words, is there a way to get access to built-in `CompleteGraph` after I do `Needs["Combinatorica"]` which imports Combinatorica version of `CompleteGraph`?

To clarify 1, Context Menu on Graph lets you change GraphStyle and GraphLayout, and I'd like to be able to change them programmatically. Here's one way I found to change GraphStyle of Graph object

``````g = GridGraph[{4, 4}];
BooleanGraph[Or, g, g, GraphStyle -> "DiagramBlack"]
``````

However, that forgets options of the original graph like `VertexCoordinates`

Trying Brett's recipe on grid graph

``````g = GridGraph[{3, 2}, ImageSize -> Tiny]
coords = PropertyValue[{g, #}, VertexCoordinates] & /@ VertexList[g];
Graph[EdgeList[g], GraphStyle -> "BasicGold",
VertexCoordinates -> coords, ImageSize -> Tiny]
``````

There seems to be a bug with how Mathematica handles Graph coordinates on graph operations. First line below permutes coordinates, second gives internal warning, probably related to coordinates. Using non-integer vertices and explicit coordinates for each vertex doesn't help. One solution is to store coordinates globally and have `fixCoordinates` function to reassign correct coordinates to `Graph` after modifications

``````VertexDelete[GridGraph[{3, 3}], 1]
NeighborhoodGraph[VertexDelete[GridGraph[{3, 3}], 1], 2]
``````
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Re. 2.: System`CompleteGraph? –  Andrew Moylan Nov 29 '10 at 13:09
Re#2, You could remove Combinatorica from you context path -- then refer to all Combinatorica functions with explicit, full path... –  Simon Nov 29 '10 at 15:32
how do you remove from context path? –  Yaroslav Bulatov Nov 29 '10 at 18:41
\$ContextPath = DeleteCases[\$ContextPath, "Combinatorica`"] –  Simon Nov 30 '10 at 1:07

The new Graph objects are atomic in Mathematica 8. Thus, like strings or images they do not have internal structure that can be manipulated in the normal fashion. What is particularly unusual is that the new objects have a FullForm that looks like it can be manipulated symbolically. But appearances can be deceiving -- not only is that representation inaccessible to pattern-matching, but it is not even a valid graph specification if you feed it back to Mathematica using copy-and-paste.

I found a couple of hacks that can be used to manipulate graph structure. The first tries to use the "official" channels to extract the properties of graphs:

``````adjustedGraph[g_, newOptions___] :=
Graph[
VertexList@g,
EdgeList@g,
newOptions,
Sequence@@Table[p -> PropertyValue[g, p], {p, PropertyList[g]}]
]
``````

You can use this function like this:

``````g = GridGraph[{4, 4}, GraphStyle -> "DiagramBlack", ImageSize -> Tiny]
``````

This function uses VertexList, EdgeList and PropertyValue to extract the graph properties. Unfortunately, some options are not recoverable by this means. For example, the Graphics option ImageSize will be lost using this method.

An even more heinous hack exploits the pseudo-symbolic representation of FullForm:

``````adjustedGraph2[g_, newOptions___] :=
"Hold@" ~~ ToString[g, InputForm] //
ToExpression //
#[[1, 3]] & //
Graph[VertexList@g, EdgeList@g, newOptions, Sequence @@ #] &
``````

Despite its evil nature, this second function performs more satisfactorily as it appears to retain most graph options. I say "most", because I have not yet experimented with more esoteric options like wrappers, shape functions and graph properties assigned after the fact. There are no guarantees that this method will work unchanged as Wolfram changes the representation of graph objects (or even that it works for all possible graph definitions now).

There ought to be a way to achieve this without hacks. I still hold out hope that there is some function lurking out there that will give the complete symbolic representation of a graph object.

As for the symbol conflicts that arise after loading the Combinatorica package, you can still access the original symbols by explicitly specifying the package name, e.g. System`CompleteGraph. If you prefer to have the system symbols take precedence over the Combinatorica symbols, you could evaluate the following expression to change the package search order:

``````\$ContextPath =
\$ContextPath /.
{x___, c : "Combinatorica`", y___, s:"System`", z___} :> {x, y, s, c, z}
``````

I note that Wolfram is effectively deprecating the Combinatorica package by issuing a scary warning message when you load the package.

-
Seems to work for wrappers too –  Yaroslav Bulatov Jan 3 '11 at 20:16
Excellent information. +1 –  Mr.Wizard Jun 11 '11 at 22:20

The following will preserve the vertex coordinates of the original graph.

``````g = CompleteGraph[5];
coords = PropertyValue[{g, #}, VertexCoordinates] & /@ VertexList[g];
Graph[VertexList[g], EdgeList[g], GraphStyle -> "BasicGold",
VertexCoordinates -> coords]
``````

I would think something similar could preserve other options as well, though I haven't tried it.

-
That seems to change the order of vertices, updated with example –  Yaroslav Bulatov Dec 1 '10 at 23:33
This behavior seems similar to GraphPlot which sometimes ends up permuting vertex order stackoverflow.com/questions/4245946/… –  Yaroslav Bulatov Dec 1 '10 at 23:37
Updated the answer to not permute the vertices from GridGraph. –  Brett Champion Dec 2 '10 at 15:29
Thanks, that works. Explicit vertices in VertexCoordinateRules also fixes vertex permutations in GraphPlot. BTW, I found this update by accident since stackoverflow only sends notification to X only if comment is on X's question or X's answer –  Yaroslav Bulatov Dec 2 '10 at 21:32
For #2, you should be able use distinguish between the two using the context. Thus, `System`CompleteGraph[5]` creates a new V8 graph, while `Combinatorica`CompleteGraph[5]` creates an old Combinatorica graph.