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Classical and Quantum Random-Walk Centrality Measures in Multilayer Networks

Lucas Böttcher, Mason A. Porter

2021SIAM Journal on Applied Mathematics17 citationsDOIOpen Access PDF

Abstract

Multilayer network analysis is a useful approach for studying the structural properties of entities with diverse, multitudinous relations. Classifying the importance of nodes and node-layer tuples is an important aspect of the study of multilayer networks. To do this, it is common to calculate various centrality measures, which allow one to rank nodes and node-layers according to a variety of structural features. In this paper, we formulate occupation, PageRank, betweenness, and closeness centralities in terms of node-occupation properties of different types of continuous-time classical and quantum random walks on multilayer networks. We apply our framework to a variety of synthetic and real-world multilayer networks, and we identify marked differences between classical and quantum centrality measures. Our computations also give insights into the correlations between certain random-walk-based and geodesic-path-based centralities.

Topics & Concepts

Betweenness centralityCentralityPageRankNode (physics)Random walkVariety (cybernetics)Network scienceQuantum walkComputer scienceRank (graph theory)ClosenessNetwork theoryTheoretical computer scienceGeodesicMathematicsComplex networkQuantumArtificial intelligenceCombinatoricsQuantum algorithmPhysicsStatisticsWorld Wide WebMathematical analysisQuantum mechanicsComplex Network Analysis TechniquesGraph theory and applicationsQuantum Computing Algorithms and Architecture
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