Generalization bounds for score-based generative models: a synthetic proof

Abstract

We establish minimax convergence rates for score-based generative models (SGMs) under the 1-Wasserstein distance. Assuming the target density p lies in a nonparametric β-smooth H\"older class with either compact support or subGaussian tails on Rd, we prove that neural network-based score estimators trained via denoising score matching yield generative models achieving rate n-(β+1)/(2β+d) up to polylogarithmic factors. Our unified analysis handles arbitrary smoothness β > 0, supports both deterministic and stochastic samplers, and leverages shape constraints on p to induce regularity of the score. The resulting proofs are more concise, and grounded in generic stability of diffusions and standard approximation theory.