# How do I find all vertices in a graph with maximum degree?

Given a graph, say

``````g = Graph[{x -> a, y -> c, a -> b,
b -> c, a -> c, d -> c,
a -> d, b -> d},
VertexLabels -> "Name"]
``````

How do I find all vertices in a graph with the maximum degree i.e. a list of all vertices that has the most number of edges, and highlight them in the graph?

In this case, it would be the vertices `{a,c}`.

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Here's an approach using `DegreeCentrality`:

``````(* In[41]:= *) max = Pick[VertexList[g], DegreeCentrality[g], Max[DegreeCentrality[g]]]

(* Out[41]= *) {a, c}

(* In[42]:= *) HighlightGraph[g, max]
``````

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I think `DegreeCentrality` behaves similar to `VertexDegree` ? +1 for `Pick` that saves few lines and is neater as well [ than my approach] –  Prashant Bhate Jan 17 '12 at 0:15

You can generally highlight vertices by their degree:

``````    HighlightGraph[g,
Table[Style[VertexList[g][[i]],
ColorData["TemperatureMap"][
VertexDegree[g][[i]]/Max[VertexDegree[g]]]], {i, VertexCount[g]}]]
``````

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Welcome to StackOverflow! I looked at your blog and vimeo channel, it's very iteresting. :-) A new Mathematica-specific site in the same format as SO will launch in a couple of days. You can commit to it here here to get early access. –  Szabolcs Jan 16 '12 at 8:30
Thanks, Szabolcs! I already committed ;-) –  Vitaliy Kaurov Jan 16 '12 at 14:54

Here is what I have tried

``````HighlightGraph[g,
Part[VertexList@g,
Flatten@Position[VertexDegree@g, Max[VertexDegree@g]]]]
``````

Same using `Pick`

``````HighlightGraph[g, Pick[VertexList@g, VertexDegree@g, Max[VertexDegree@g]]]
``````
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Your solution looks just like what I came up with:`HighlightGraph[g, VertexList[g][[Flatten[Position[vd, Max[vd = VertexDegree[g]]], 1]]]]` You could highlight the `VertexInDegree` or `VertexOutDegree` by using the respective predicates in place of `VertexDegree`. –  David Carraher Jan 16 '12 at 1:19
Looks right to me. –  kkm Jan 16 '12 at 1:19