On Weighted Star--Convex Graphs

Abstract

The primary objective of this paper is to investigate the notions of geometric and sequential convexity within a graph-theoretic framework, with the aim of examining various structural properties and exploring the connection between these two branches of mathematics. A simple connected vertex-weighted graph G(V,E) with a non-empty set of leaf vertices is said to be star-convex if there exists at least one node u∈ V(G) such that, for every chosen leaf vertex v, there is a monotone path (either increasing or decreasing) connecting v to u. One of the main results states that a graph G is star-convex if and only if there exists a tree T⊂eq G that contains all leaf vertices and is itself star-convex. On the other hand, a sequence (un)n=0∞ is said to be convex if it satisfies the following inequality 2ui≤ ui-1+ui+1 for all i∈ N. We demonstrate that, under minimal assumptions, a class of convex sequences can be embedded into a spider graph so as to make it star-convex.