Spectral convergence of graph Laplacians with Ricci curvature bounds and in non-collapsed Ricci limit spaces

Abstract

This paper establishes quantitative high-probability bounds on the eigenvalues and eigenfunctions of ε-neighborhood graph Laplacians constructed from i.i.d. random variables on m-dimensional closed Riemannian manifolds (M,g) that satisfy a uniform lower Ricci curvature bound Ricg -(m-1)K, a positive lower volume bound, and an upper diameter bound. These results extend to non-collapsed Ricci limit spaces that are measured Gromov-Hausdorff limits of such manifolds, and the bounds give a spectral approximation of weighted Laplacians on manifolds with non-smooth points.