Book contents
- Frontmatter
- Contents
- Preface
- Farewell to Paul Erdős
- Toast to Paul Erdős
- List of Contributors
- Paul Erdős: Some Unsolved Problems
- Menger's Theorem for a Countable Source Set
- On Extremal Set Partitions in Cartesian Product Spaces
- Matchings in Lattice Graphs and Hamming Graphs
- Reconstructing a Graph from its Neighborhood Lists
- Threshold Functions for H-factors
- A Rate for the Erdős–Turán Law
- Deterministic Graph Games and a Probabilistic Intuition
- On Oriented Embedding of the Binary Tree into the Hypercube
- Potential Theory on Distance-Regular Graphs
- On the Length of the Longest Increasing Subsequence in a Random Permutation
- On Richardson's Model on the Hypercube
- Random Permutations: Some Group-Theoretic Aspects
- Ramsey Problems with Bounded Degree Spread
- Hamilton Cycles in Random Regular Digraphs
- On Triangle Contact Graphs
- A Combinatorial Approach to Complexity Theory via Ordinal Hierarchies
- Lattice Points of Cut Cones
- The Growth of Infinite Graphs: Boundedness and Finite Spreading
- Amalgamated Factorizations of Complete Graphs
- Ramsey Size Linear Graphs
- Turán–Ramsey Theorems and Kp-Independence Numbers
- Nearly Equal Distances in the Plane
- Clique Partitions of Chordal Graphs
- On Intersecting Chains in Boolean Algebras
- On the Maximum Number of Triangles in Wheel-Free Graphs
- Blocking Sets in SQS(2v)
- (1,2)-Factorizations of General Eulerian Nearly Regular Graphs
- Oriented Hamilton Cycles in Oriented Graphs
- Minimization Problems for Infinite n-Connected Graphs
- On Universal Threshold Graphs
- Image Partition Regularity of Matrices
- Extremal Graph Problems for Graphs with a Color-Critical Vertex
- A Note on ω1 → ω1 Functions
- Topological Cliques in Graphs
- Local-Global Phenomena in Graphs
- On Random Generation of the Symmetric Group
- On Vertex-Edge-Critically n-Connected Graphs
- On a Conjecture of Erdős and Čudakov
- A Random Recolouring Method for Graphs and Hypergraphs
- Obstructions for the Disk and the Cylinder Embedding Extension Problems
- A Ramsey-Type Theorem in the Plane
- The Enumeration of Self-Avoiding Walks and Domains on a Lattice
- An Extension of Foster's Network Theorem
- Randomised Approximation in the Tutte Plane
- On Crossing Numbers, and some Unsolved Problems
Potential Theory on Distance-Regular Graphs
Published online by Cambridge University Press: 06 December 2010
- Frontmatter
- Contents
- Preface
- Farewell to Paul Erdős
- Toast to Paul Erdős
- List of Contributors
- Paul Erdős: Some Unsolved Problems
- Menger's Theorem for a Countable Source Set
- On Extremal Set Partitions in Cartesian Product Spaces
- Matchings in Lattice Graphs and Hamming Graphs
- Reconstructing a Graph from its Neighborhood Lists
- Threshold Functions for H-factors
- A Rate for the Erdős–Turán Law
- Deterministic Graph Games and a Probabilistic Intuition
- On Oriented Embedding of the Binary Tree into the Hypercube
- Potential Theory on Distance-Regular Graphs
- On the Length of the Longest Increasing Subsequence in a Random Permutation
- On Richardson's Model on the Hypercube
- Random Permutations: Some Group-Theoretic Aspects
- Ramsey Problems with Bounded Degree Spread
- Hamilton Cycles in Random Regular Digraphs
- On Triangle Contact Graphs
- A Combinatorial Approach to Complexity Theory via Ordinal Hierarchies
- Lattice Points of Cut Cones
- The Growth of Infinite Graphs: Boundedness and Finite Spreading
- Amalgamated Factorizations of Complete Graphs
- Ramsey Size Linear Graphs
- Turán–Ramsey Theorems and Kp-Independence Numbers
- Nearly Equal Distances in the Plane
- Clique Partitions of Chordal Graphs
- On Intersecting Chains in Boolean Algebras
- On the Maximum Number of Triangles in Wheel-Free Graphs
- Blocking Sets in SQS(2v)
- (1,2)-Factorizations of General Eulerian Nearly Regular Graphs
- Oriented Hamilton Cycles in Oriented Graphs
- Minimization Problems for Infinite n-Connected Graphs
- On Universal Threshold Graphs
- Image Partition Regularity of Matrices
- Extremal Graph Problems for Graphs with a Color-Critical Vertex
- A Note on ω1 → ω1 Functions
- Topological Cliques in Graphs
- Local-Global Phenomena in Graphs
- On Random Generation of the Symmetric Group
- On Vertex-Edge-Critically n-Connected Graphs
- On a Conjecture of Erdős and Čudakov
- A Random Recolouring Method for Graphs and Hypergraphs
- Obstructions for the Disk and the Cylinder Embedding Extension Problems
- A Ramsey-Type Theorem in the Plane
- The Enumeration of Self-Avoiding Walks and Domains on a Lattice
- An Extension of Foster's Network Theorem
- Randomised Approximation in the Tutte Plane
- On Crossing Numbers, and some Unsolved Problems
Summary
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.
Introduction
We shall be concerned with a graph G regarded as an electrical network in which each edge has resistance 1. A well-known result due to R.M. Foster [6] (see also [3, p.41] and [9]) asserts that if G has n vertices and m edges, the effective resistance between adjacent vertices is r1 = (n − 1)/m, provided that all edges are equivalent under the action of the automorphism group. In this paper I shall obtain formulae for ri, the effective resistance between vertices at distance i, for i ≥ 2, provided G is distance-transitive (DT). With hindsight, it will be clear that the same formulae hold if we assume only that G is distance-regular (DR). The case i = 2 was also studied by Foster [7].
Another well-known fact is that the electrical problem can be regarded as a case of solving Laplace's equation on the graph.
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- Combinatorics, Geometry and ProbabilityA Tribute to Paul Erdös, pp. 107 - 120Publisher: Cambridge University PressPrint publication year: 1997