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Paper detail

Dynamic Shortest Path Algorithms for Hypergraphs

A hypergraph is a set V of vertices and a set of non-empty subsets of V, called hyperedges. Unlike graphs, hypergraphs can capture higher-order interactions in social and communication networks that go beyond a simple union of pairwise relationships. In this paper, we consider the shortest path problem in hypergraphs. We develop two algorithms for finding and maintaining the shortest hyperpaths in a dynamic network with both weight and topological changes. These two algorithms are the first to address the fully dynamic shortest path problem in a general hypergraph. They complement each other by partitioning the application space based on the nature of the change dynamics and the type of the hypergraph.

preprint2012arXivOpen access
Jianhang GaoQing ZhaoWei RenAnanthram SwamiRam RamanathanAmotz Bar-Noy
Data Structures and Algorithms
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Jianhang GaoQing ZhaoWei RenAnanthram SwamiRam RamanathanAmotz Bar-Noy

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