Intrinsic Wasserstein Rates for Score-Based Generative Models on Smooth Manifolds

ArXi:2605.15822v1 Announce Type: new Score-based generative models are trained in high-dimensional ambient spaces, yet many data distributions are ed on low-dimensional nonlinear structures. We prove that, for compact $d$-dimensional smooth manifolds $\mathcal{M} \subset [0,1]^D$ with $d > 2$ and $\beta$-H\"older densities strictly positive on $\mathcal{M}$, a variance-preserving SGM estimator attains the intrinsic Wasserstein--1 sample exponent $\tilde{\mathcal{O}}(D^{\mathcal{O}_\beta(d)}n^{-(\beta+1)/(d+2\beta)})$, up to logarithmic factors and explicit geometry and density factors.