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I want to generate a sequence of the number of vertices in all graphs which each edge has the same number of leaving edges. I dont have to generate the whole sequence. Let's say the first 50 if exists.

I want:

Input: the number of edges leaving each vertex
Output: a sequence of the number of vertices

So far, I have looked at complete graphs. Complete graphs with n vertices always have n-1 edges leaving each vertex. But there are other kinds of graphs that have this property. For example, some polyhedrons, such as snub dodecahedron and truncated icosidodecahedron have this property.

How should I approach my problem?

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1 Answer 1

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I think you mean regular graphs:



I made a regular graph generator which isn't flawless by the way: once you generate the nodes, say from 1 to n. You want regularity r.

For node 1, make connections to the following nodes until you reach degree r for node 1. For node 2 you already have degree 1 (because of node 1), you connect again to further nodes until you reach degree r for node 2 too. And this way till the last node. The flaw is that you can't define an r-regular graph for any number of nodes. The algorithm mentioned doesn't detect that, so some errors may occur. Also, this isn't a random r-regular graph generator, but instead give one possible solution.

I'm not much of an explainer, so please ask if the description lacks somewhere.

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Thanks a lot. This is exactly what I was looking for. I should be able to figure things out from the information you gave to me. Thanks again. –  user1080916 Dec 9 '11 at 21:29

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