On the convexity number of the complementary prism of a tree

Abstract

A set of vertices S of a graph G is a (geodesic)convex set, if S contains all the vertices belonging to any shortest path connecting between two vertices of S. The cardinality of maximum proper convex set of G is called the convexity number, con(G) of G. The complementary prism GG of G is obtained from the disjoint union of G and its complement G by adding the edges of a perfect matching between them. In this work, we examine the convex sets of the complementary prism of a tree and derive formulas for the convexity numbers of the complementary prisms of all trees.