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Hypergraph $p$-Laplacian regularization on point clouds for data interpolation

Numerical Analysis 2025-03-18 v2 Machine Learning Numerical Analysis Analysis of PDEs

Abstract

As a generalization of graphs, hypergraphs are widely used to model higher-order relations in data. This paper explores the benefit of the hypergraph structure for the interpolation of point cloud data that contain no explicit structural information. We define the εn\varepsilon_n-ball hypergraph and the knk_n-nearest neighbor hypergraph on a point cloud and study the pp-Laplacian regularization on the hypergraphs. We prove the variational consistency between the hypergraph pp-Laplacian regularization and the continuum pp-Laplacian regularization in a semisupervised setting when the number of points nn goes to infinity while the number of labeled points remains fixed. A key improvement compared to the graph case is that the results rely on weaker assumptions on the upper bound of εn\varepsilon_n and knk_n. To solve the convex but non-differentiable large-scale optimization problem, we utilize the stochastic primal-dual hybrid gradient algorithm. Numerical experiments on data interpolation verify that the hypergraph pp-Laplacian regularization outperforms the graph pp-Laplacian regularization in preventing the development of spikes at the labeled points.

Keywords

Cite

@article{arxiv.2405.01109,
  title  = {Hypergraph $p$-Laplacian regularization on point clouds for data interpolation},
  author = {Kehan Shi and Martin Burger},
  journal= {arXiv preprint arXiv:2405.01109},
  year   = {2025}
}

Comments

34 pages

R2 v1 2026-06-28T16:13:42.689Z