A characterization of well-dominated Cartesian products
Abstract
A graph is well-dominated if all its minimal dominating sets have the same cardinality. In this paper we prove that at least one factor of every connected, well-dominated Cartesian product is a complete graph, which then allows us to give a complete characterization of the connected, well-dominated Cartesian products if both factors have order at least 2. In particular, we show that G\,\,H is well-dominated if and only if G\,\,H = P3 \,\,K3 or G\,\,H= Kn \,\,Kn for some n 2.
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