Graphs whose mixed metric dimension is equal to their order

Abstract

The mixed metric dimension mdim(G) of a graph G is the cardinality of a smallest set of vertices that (metrically) resolves each pair of elements from V(G) E(G). We say that G is a max-mdim graph if mdim(G) = n(G). It is proved that a max-mdim graph G with n(G) 7 contains a vertex of degree at least 5. Using the strong product of graphs and amalgamations large families of max-mdim graphs are constructed. The mixed metric dimension of graphs with at least one universal vertex is determined. The mixed metric dimension of graphs G with cut vertices is bounded from the above and the mixed metric dimension of block graphs computed.