Mutual-Visibility of Tree and Its Line Graphs

Abstract

In this paper, we present a complete characterization of mutual-visibility sets in trees. It is shown that a subset S is a mutual-visibility set of a tree T if and only if it coincides with the set of leaves of the Steiner subtree T S. For trees containing branch vertices, the notion of legs is introduced, and an explicit formula for the number of maximal mutual-visibility sets is derived in terms of the corresponding leg lengths. We prove that every tree is absolute-clear. It is further shown that, for every tree T with at least two edges, the mutual-visibility number is preserved under the line graph operation, that is, μ(L(T))=μ(T). Examples of unicyclic and block graphs for which this equality fails are also presented. Finally, a tight lower bound for the mutual-visibility number of the iterated line graph is established; namely, μ(L(L(T))) Δ(T)23.