Litcius/Paper detail

Topological Simplifications of Hypergraphs

Youjia Zhou, Archit Rathore, Emilie Purvine, Bei Wang

2022IEEE Transactions on Visualization and Computer Graphics16 citationsDOIOpen Access PDF

Abstract

We study hypergraph visualization via its topological simplification. We explore both vertex simplification and hyperedge simplification of hypergraphs using tools from topological data analysis. In particular, we transform a hypergraph into its graph representations, known as the line graph and clique expansion. A topological simplification of such a graph representation induces a simplification of the hypergraph. In simplifying a hypergraph, we allow vertices to be combined if they belong to almost the same set of hyperedges, and hyperedges to be merged if they share almost the same set of vertices. Our proposed approaches are general and mathematically justifiable, and put vertex simplification and hyperedge simplification in a unifying framework.

Topics & Concepts

HypergraphVertex (graph theory)Computer scienceVisualizationGraphGraph drawingTheoretical computer scienceTopology (electrical circuits)MathematicsDiscrete mathematicsCombinatoricsData miningTopological and Geometric Data AnalysisData Visualization and AnalyticsCell Image Analysis Techniques