A Long-Short Flow-Map Perspective for Drifting Models
Abstract
This paper provides a reinterpretation of the Drifting Model~\cite{deng2026generative} through a semigroup-consistent long-short flow-map factorization. We show that a global transport process can be decomposed into a long-horizon flow map followed by a short-time terminal flow map admitting a closed-form optimal velocity representation, and that taking the terminal interval length to zero recovers exactly the drifting field together with a conservative impulse term required for flow-map consistency. Based on this perspective, we propose a new likelihood learning formulation that aligns the long-short flow-map decomposition with density evolution under transport. We validate the framework through both theoretical analysis and empirical evaluations on benchmark tests, and further provide a theoretical interpretation of the feature-space optimization while highlighting several open problems for future study.
Keywords
Cite
@article{arxiv.2602.20463,
title = {A Long-Short Flow-Map Perspective for Drifting Models},
author = {Zhiqi Li and Bo Zhu},
journal= {arXiv preprint arXiv:2602.20463},
year = {2026}
}
Comments
25 pages, 7 figures