Potential Theory on Distance-Regular Graphs

Norman L. Biggs

doi:10.1017/S096354830000064X

Abstract

A graph may be regarded as an electrical network in which each edge has unit resistance. We obtain explicit formulae for the effective resistance of the network when a current enters at one vertex and leaves at another in the distance-regular case. A well-known link with random walks motivates a conjecture about the maximum effective resistance. Arguments are given that point to the truth of the conjecture for all known distance-regular graphs.

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Potential Theory on Distance-Regular Graphs

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