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Learning Flow Distributions via Projection-Constrained Diffusion on Manifolds

Fluid Dynamics 2026-02-23 v1 Machine Learning

Abstract

We present a generative modeling framework for synthesizing physically feasible two-dimensional incompressible flows under arbitrary obstacle geometries and boundary conditions. Whereas existing diffusion-based flow generators either ignore physical constraints, impose soft penalties that do not guarantee feasibility, or specialize to fixed geometries, our approach integrates three complementary components: (1) a boundary-conditioned diffusion model operating on velocity fields; (2) a physics-informed training objective incorporating a divergence penalty; and (3) a projection-constrained reverse diffusion process that enforces exact incompressibility through a geometry-aware Helmholtz-Hodge operator. We derive the method as a discrete approximation to constrained Langevin sampling on the manifold of divergence-free vector fields, providing a connection between modern diffusion models and geometric constraint enforcement in incompressible flow spaces. Experiments on analytic Navier-Stokes data and obstacle-bounded flow configurations demonstrate significantly improved divergence, spectral accuracy, vorticity statistics, and boundary consistency relative to unconstrained, projection-only, and penalty-only baselines. Our formulation unifies soft and hard physical structure within diffusion models and provides a foundation for generative modeling of incompressible fields in robotics, graphics, and scientific computing.

Keywords

Cite

@article{arxiv.2602.17773,
  title  = {Learning Flow Distributions via Projection-Constrained Diffusion on Manifolds},
  author = {Noah Trupin and Rahul Ghosh and Aadi Jangid},
  journal= {arXiv preprint arXiv:2602.17773},
  year   = {2026}
}
R2 v1 2026-07-01T10:43:32.420Z