Recursive calculation of effective resistances in distance-regular networks based on Bose-Mesner algebra and Christoffel-Darboux identity

Abstract

Recently in jss1, the authors have given a method for calculation of the effective resistance (resistance distance) on distance-regular networks, where the calculation was based on stratification introduced in js and Stieltjes transform of the spectral distribution (Stieltjes function) associated with the network. Also, in Ref. jss1 it has been shown that the resistance distances between a node α and all nodes β belonging to the same stratum with respect to the α (Rαβ(i), β belonging to the i-th stratum with respect to the α) are the same. In this work, an algorithm for recursive calculation of the resistance distances in an arbitrary distance-regular resistor network is provided, where the derivation of the algorithm is based on the Bose-Mesner algebra, stratification of the network, spectral techniques and Christoffel-Darboux identity. It is shown that the effective resistance on a distance-regular network is an strictly increasing function of the shortest path distance defined on the network. In the other words, the two-point resistance Rαβ(m+1) is strictly larger than Rαβ(m). The link between the resistance distance and random walks on distance-regular networks is discussed, where the average commute time (CT) and its square root (called Euclidean commute time (ECT)) as a distance are related to the effective resistance. Finally, for some important examples of finite distance- regular networks, the resistance distances are calculated. Keywords: resistance distance, association scheme, stratification, distance-regular networks, Christoffel-Darboux identity PACs Index: 01.55.+b, 02.10.Yn