Metrization of weighted graphs

Abstract

We find a set of necessary and sufficient conditions under which the weight w:E R+ on the graph G=(V,E) can be extended to a pseudometric d:V× V R+. If these conditions hold and G is a connected graph, then the set Mw of all such extensions is nonvoid and the shortest-path pseudometric dw is the greatest element of Mw with respect to the partial ordering d1 ≤slant d2 if and only if d1(u,v) ≤slant d2(u,v) for all u,v∈ V. It is shown that every nonvoid poset ( Mw,≤slant) contains the least element 0,w if and only if G is a complete k-partite graph with k≥slant 2 and in this case the explicit formula for computation of 0,w is obtained.