One-Shot Generative Flows: Existence and Obstructions
Abstract
We study dynamic measure transport for generative modeling, focusing on transport maps that connect a source measure to a target measure by integrating a velocity field of the form , where is a stochastic process satisfying and is its time derivative. We investigate when induces a \emph{straight-line flow}: a flow whose pointwise acceleration vanishes and is therefore exactly integrable by any first-order method. First, we develop multiple characterizations of straight-line flows in terms of PDEs involving the conditional statistics of the process. Then, we prove that straight-line flows under endpoint independence exhibit a sharp dichotomy. On the one hand, we construct explicit, computable straight-line processes for arbitrary Gaussian endpoints. On the other hand, we show that straight-line processes do not exist for targets with sufficiently well-separated modes. We demonstrate this obstruction through a sequence of increasingly general impossibility theorems that uncover a fundamental relationship between the sample-path behavior of a process with independent endpoints and the space-time geometry of this process' flow map. Taken together, these results provide a structural theory of when straight-line generative flows can, and cannot, exist.
Cite
@article{arxiv.2604.15439,
title = {One-Shot Generative Flows: Existence and Obstructions},
author = {Panos Tsimpos and Daniel Sharp and Youssef Marzouk},
journal= {arXiv preprint arXiv:2604.15439},
year = {2026}
}