Litcius/Paper detail

Discrete curvature on graphs from the effective resistance*

Karel Devriendt, Renaud Lambiotte

2022Journal of Physics Complexity28 citationsDOIOpen Access PDF

Abstract

Abstract This article introduces a new approach to discrete curvature based on the concept of effective resistances. We propose a curvature on the nodes and links of a graph and present the evidence for their interpretation as a curvature. Notably, we find a relation to a number of well-established discrete curvatures (Ollivier, Forman, combinatorial curvature) and show evidence for convergence to continuous curvature in the case of Euclidean random graphs. Being both efficient to approximate and highly amenable to theoretical analysis, these resistance curvatures have the potential to shed new light on the theory of discrete curvature and its many applications in mathematics, network science, data science and physics.

Topics & Concepts

CurvatureMathematicsEuclidean geometryGraph theoryGraphEuclidean spaceConvergence (economics)Relation (database)Random graphDiscrete mathematicsComputer sciencePure mathematicsCombinatoricsGeometryData miningEconomic growthEconomicsTopological and Geometric Data AnalysisComplex Network Analysis TechniquesGeometric Analysis and Curvature Flows