The graph bottleneck identity

Abstract

A matrix S=(sij)∈ Rn× n is said to determine a transitional measure for a digraph G on n vertices if for all i,j,k∈\1,\...,n\, the transition inequality sij sjk sik sjj holds and reduces to the equality (called the graph bottleneck identity) if and only if every path in G from i to k contains j. We show that every positive transitional measure produces a distance by means of a logarithmic transformation. Moreover, the resulting distance d(·,·) is graph-geodetic, that is, d(i,j)+d(j,k)=d(i,k) holds if and only if every path in G connecting i and k contains j. Five types of matrices that determine transitional measures for a digraph are considered, namely, the matrices of path weights, connection reliabilities, route weights, and the weights of in-forests and out-forests. The results obtained have undirected counterparts. In [P. Chebotarev, A class of graph-geodetic distances generalizing the shortest-path and the resistance distances, Discrete Appl. Math., URL http://dx.doi.org/10.1016/j.dam.2010.11.017] the present approach is used to fill the gap between the shortest path distance and the resistance distance.