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Undirected graph G can be partationed into several vertex groups, each vertex pair (u,v) has an edge if "u" and "v" are in the different groups; no edge, otherwise. Intuitively, if we use a vertex "g" to represent a group, and we add an edge (gi,gj) if there are edges between the two group, then the graph G is a clique. Now, we have several such type graphs G1...Gn, each vertex in some Gi may has a same id with a vertex in some Gj.

If we combine graphs G1...Gn to get a graph G',like the example below, What is the name of this type of undirected graph?

example:what properties will the graph G3 have?

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"then the graph G is a clique": no, it's not. And as far as I can see, the resulting graph G' has no special properties and therefore the name of this type of graph is just "graph". – Henrik Nov 21 '12 at 8:04

perhaps the groups you mean are independent sets. however, as Henrik pointed out, collapsing to independent sets (even if they are chosen inclusionwise maximal), does not necessarily yield a clique.

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Is the resulting graph G' really has no special properties for vertex cover problem or some problems else? – Miao Dongjing Nov 21 '12 at 20:56

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