Geodesic Geometry on Graphs

Abstract

We investigate a graph theoretic analog of geodesic geometry. In a graph G=(V,E) we consider a system of paths P=\Pu,v|u,v∈ V\ where Pu,v connects vertices u and v. This system is consistent in that if vertices y, z are in Pu,v, then the sub-path of Pu,v between them coincides with Py,z. A map w: E(0,∞) is said to induce P if for every u, v∈ V the path Pu,v is w-geodesic. We say that G is metrizable if every consistent path system is induced by some such w. As we show, metrizable graphs are very rare, whereas there exist infinitely many 2-connected metrizable graphs.