On metric dimension of some rotationally symmetric graphs (Q1952730)

Summary: A family \(\mathcal{G}\) of connected graphs is a family with constant metric dimension if \(\dim(G)\) is finite and does not depend upon the choice of \(G\) in \(\mathcal{G}\). In this paper, we show that the graph \(A^\ast_n\) and the graph \(A^p_n\) obtained from the antiprism graph have constant metric dimension.