Abstract
A dominating set \(D\) of a graph \(G\) is said to be a restrained dominating set (RDS) of \(G\) if every vertex of \(V-D\) has a neighbor in \(V-D\). A RDS is said to be an isolate restrained dominating set(IRDS) if \(<D>\) has at least one isolated vertex.
 The minimum cardinality of a minimal IRDS of $G$ is called the isolate restrained domination number(IRDN), denoted by \(\gamma_{r,0}(G)\). This paper contains basic properties of IRDS and gives the IRDN for the families of graphs such as paths, cycles, complete \(k\)-partite graphs and some other graphs.
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