High-accuracy log-concave sampling with stochastic queries
Abstract
We show that high-accuracy guarantees for log-concave sampling -- that is, iteration and query complexities which scale as , where is the desired target accuracy -- are achievable using stochastic gradients with subexponential tails. Notably, this exhibits a separation with the problem of convex optimization, where stochasticity (even additive Gaussian noise) in the gradient oracle incurs queries. We also give an information-theoretic argument that light-tailed stochastic gradients are necessary for high accuracy: for example, in the bounded variance case, we show that the minimax-optimal query complexity scales as . Our framework also provides similar high accuracy guarantees under stochastic zeroth order (value) queries, and an improved complexity result for sampling from finite-sum potentials.
Cite
@article{arxiv.2602.14342,
title = {High-accuracy log-concave sampling with stochastic queries},
author = {Fan Chen and Sinho Chewi and Constantinos Daskalakis and Alexander Rakhlin},
journal= {arXiv preprint arXiv:2602.14342},
year = {2026}
}