Strong geodetic number of complete bipartite graphs and of graphs with specified diameter

Abstract

The strong geodetic problem is a recent variation of the classical geodetic problem. For a graph G, its strong geodetic number sg(G) is the cardinality of a smallest vertex subset S, such that each vertex of G lies on one fixed geodesic between a pair of vertices from S. In this paper, some general properties of the strong geodesic problem are studied, especially in connection with diameter of a graph. The problem is also solved for balanced complete bipartite graphs.