On the general position numbers of maximal outerplanar graphs

Abstract

A subset R⊂eq V(G) of a graph G is a general position set if any triple set R0 of R is non-geodesic in G, that is, no vertex of R0 lies on any geodesic between the other two vertices of R0 in G. Let R be the set of general position sets of a graph G. The general position number of a graph G, denoted by gp(G), is defined as gp(G)=\|R|:R∈R\. In this paper, we determine the bounds on the gp-numbers for any maximal outerplane graph and characterize the corresponding extremal graphs.