Partial domination of middle graphs
Abstract
For any graph G=(V,E), a subset S⊂eq V is called an isolating set of G if V NG[S] is an independent set of G, where NG[S]=S NG(S), and the isolation number of G, denoted by (G), is the size of a smallest isolating set of G. In this article, we show that the isolation number of the middle graph of G is equal to the size of a smallest maximal matching of G.
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