The Gomory-Hu inequality and trees

Abstract

Let G=(V,E) be a finite connected graph with vertex set V and edge set E, and let U(G) be the set of all ultrametric spaces (V,dl) generated by vertex labelings l V R+. We prove that the inequality |D(V)| |E| + 1 holds for all (V,dl) ∈ U(G), where D(V) is the distance set of (V,dl). The necessary and sufficient conditions under which the above inequality turns to an equality are found. Moreover, we prove that each connected graph with non-negative vertex labeling generates a pseudoultrametric space and find some sufficient conditions under which this space is ultrametric.