Ollivier-Ricci Curvature for Hypergraphs: A Unified Framework

Corinna Coupette, Sebastian Dalleiger, Bastian Rieck

Research output: Chapter in Book/Report/Conference proceedingConference article in proceedingsScientificpeer-review

Abstract

Bridging geometry and topology, curvature is a powerful and expressive invariant. While the utility of curvature has been theoretically and empirically confirmed in the context of manifolds and graphs, its generalization to the emerging domain of hypergraphs has remained largely unexplored. On graphs, the Ollivier-Ricci curvature measures differences between random walks via Wasserstein distances, thus grounding a geometric concept in ideas from probability theory and optimal transport. We develop Orchid, a flexible framework generalizing Ollivier-Ricci curvature to hypergraphs, and prove that the resulting curvatures have favorable theoretical properties. Through extensive experiments on synthetic and real-world hypergraphs from different domains, we demonstrate that Orchid curvatures are both scalable and useful to perform a variety of hypergraph tasks in practice.
Original languageEnglish
Title of host publication11th International Conference on Learning Representations (ICLR 2023)
PublisherCurran Associates Inc.
ISBN (Print)9781713899259
Publication statusPublished - 2023
MoE publication typeA4 Conference publication
EventInternational Conference on Learning Representations - Kigali, Rwanda
Duration: 1 May 20235 May 2023
Conference number: 11
https://iclr.cc/

Conference

ConferenceInternational Conference on Learning Representations
Abbreviated titleICLR
Country/TerritoryRwanda
CityKigali
Period01/05/202305/05/2023
Internet address

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