Continuum limit of hypergraph p-Laplacian equations on point clouds

Abstract

This paper studies a class of p-Laplacian equations on point clouds that arise from hypergraph learning in a semi-supervised setting. Under the assumption that the point clouds consist of independent random samples drawn from a bounded domain ⊂Rd, we investigate the asymptotic behavior of the solutions as the number of data points tends to infinity, with the number of labeled points remains fixed. We show, for any p>d in the viscosity solution framework, that the continuum limit is a weighted p-Laplacian equation subject to mixed Dirichlet and Neumann boundary conditions. The result provides a new discretization of the p-Laplacian on point clouds.