Strong Resolving Graphs of Clean Graphs of Commutative Rings

Let \(R\) be a ring with unity. The clean graph \(\text{Cl}(R)\) of a ring \(R\) is the simple undirected graph whose vertices are of the form \((e,u)\), where \(e\) is an idempotent element and \(u\) is a unit of the ring \(R\) and two vertices \((e,u)\), \((f,v)\) of \(\text{Cl}(R)\) are adjacent if and only if \(ef = fe =0\) or \(uv = vu=1\). In this manuscript, for a commutative ring \(R\), first we obtain the strong resolving graph of \(\text{Cl}(R)\) and its independence number. Using them, we determine the strong metric dimension of the clean graph of an arbitrary commutative ring. As an application, we compute the strong metric dimension of \(\text{Cl}(R)\), where \(R\) is a commutative Artinian ring.