Constructive conditional normalizing flows
Abstract
Motivated by applications in conditional sampling, given a probability measure and a diffeomorphism , we consider the problem of simultaneously approximating and the pushforward by means of the flow of a continuity equation whose velocity field is a perceptron neural network with piecewise constant weights. We provide an explicit construction based on a polar-like decomposition of the Lagrange interpolant of . The latter involves a compressible component, given by the gradient of a particular convex function, which can be realized exactly, and an incompressible component, which -- after approximating via permutations -- can be implemented through shear flows intrinsic to the continuity equation. For more regular maps -- such as the Kn\"othe-Rosenblatt rearrangement -- we provide an alternative, probabilistic construction inspired by the Maurey empirical method, in which the number of discontinuities in the weights doesn't scale inversely with the ambient dimension.
Keywords
Cite
@article{arxiv.2602.08606,
title = {Constructive conditional normalizing flows},
author = {Borjan Geshkovski and Domènec Ruiz-Balet},
journal= {arXiv preprint arXiv:2602.08606},
year = {2026}
}