Learning manifold diffusion semigroups from graph transition matrices
摘要
We consider graph diffusion processes constructed from finite i.i.d. samples drawn from an unknown manifold embedded in ambient Euclidean space, where the graph affinity is defined by an ambient Gaussian kernel matrix. We show that the manifold heat semigroup can be approximated directly by iterating the graph transition matrix , under only low regularity assumptions on the test function , including the case . We bound in -norm, with the operator application to properly defined, and we recover the classical graph-Laplacian pointwise rate up to logarithmic factors, for diffusion times up to and longer. The rate holds for in-sample error as well as out-of-sample generalization, where the estimator of at a new point is defined via kernel convolution. To handle non-uniform sampling densities on the manifold, we introduce a right-normalization of the graph transition matrix; under the assumption that the sampling density is and bounded away from zero, the same convergence rates hold. We numerically demonstrate the performance of the proposed estimator on simulated data.
引用
@article{arxiv.2605.25383,
title = {Learning manifold diffusion semigroups from graph transition matrices},
author = {Xiuyuan Cheng and Nan Wu},
journal= {arXiv preprint arXiv:2605.25383},
year = {2026}
}