A brief, simple proof of Vizing's conjecture
Abstract
For any graph G=(V,E), a subset S⊂eq V dominates G if all vertices are contained in the closed neighborhood of S, that is N[S]=V. The minimum cardinality over all such S is called the domination number, written γ(G). In 1963, V.G. Vizing conjectured that γ(G H) ≥ γ(G)γ(H) where stands for the Cartesian product of graphs. In this note, we prove the conjecture.
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