Disproving the normal graph conjecture
Abstract
A graph G is called normal if there exist two coverings, C and S of its vertex set such that every member of C induces a clique in G, every member of S induces an independent set in G and C S ≠ for every C ∈ C and S ∈ S. It has been conjectured by De Simone and K\"orner in 1999 that a graph G is normal if G does not contain C5, C7 and C7 as an induced subgraph. We disprove this conjecture.
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