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Efficient shortest path counting on large road networks

Yu-Xuan Qiu, Dong Wen, Lu Qin, Wentao Li, Rong-Hua Li, Ying Zhang

2022Proceedings of the VLDB Endowment17 citationsDOI

Abstract

The shortest path distance and related concepts lay the foundations of many real-world applications in road network analysis. The shortest path count has drawn much research attention in academia, not only as a closeness metric accompanying the shorted distance but also serving as a building block of centrality computation. This paper aims to improve the efficiency of counting the shortest paths between two query vertices on a large road network. We propose a novel index solution by organizing all vertices in a tree structure and propose several optimizations to speed up the index construction. We conduct extensive experiments on 14 real-world networks. Compared with the state-of-the-art solution, we achieve much higher efficiency on both query processing and index construction with a more compact index.

Topics & Concepts

Shortest path problemCentralityClosenessComputer scienceMetric (unit)Index (typography)ComputationPath (computing)Block (permutation group theory)Tree (set theory)Metric spaceTheoretical computer scienceDistanceData miningMathematicsAlgorithmDiscrete mathematicsCombinatoricsComputer networkEngineeringWorld Wide WebGraphOperations managementMathematical analysisData Management and AlgorithmsAutomated Road and Building ExtractionTopological and Geometric Data Analysis
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