Functional Stochastic Localization
Abstract
Eldan's stochastic localization is a probabilistic construction that has proved instrumental to modern breakthroughs in high-dimensional geometry and the design of sampling algorithms. Motivated by sampling under non-Euclidean geometries and the mirror descent algorithm in optimization, we develop a functional generalization of Eldan's process that replaces Gaussian regularization with regularization by any positive integer multiple of a log-Laplace transform. We further give a mixing time bound on the Markov chain induced by our localization process, which holds if our target distribution satisfies a functional Poincar\'e inequality. Finally, we apply our framework to differentially private convex optimization in norms for , where we improve state-of-the-art query complexities in a zeroth-order model.
Cite
@article{arxiv.2602.03999,
title = {Functional Stochastic Localization},
author = {Anming Gu and Bobby Shi and Kevin Tian},
journal= {arXiv preprint arXiv:2602.03999},
year = {2026}
}
Comments
Comments welcome! v2 adds citations and fixes typos