English

Toward bilipshiz geometric models

Computer Vision and Pattern Recognition 2025-11-18 v1 Image and Video Processing

Abstract

Many neural networks for point clouds are, by design, invariant to the symmetries of this datatype: permutations and rigid motions. The purpose of this paper is to examine whether such networks preserve natural symmetry aware distances on the point cloud spaces, through the notion of bi-Lipschitz equivalence. This inquiry is motivated by recent work in the Equivariant learning literature which highlights the advantages of bi-Lipschitz models in other scenarios. We consider two symmetry aware metrics on point clouds: (a) The Procrustes Matching (PM) metric and (b) Hard Gromov Wasserstien distances. We show that these two distances themselves are not bi-Lipschitz equivalent, and as a corollary deduce that popular invariant networks for point clouds are not bi-Lipschitz with respect to the PM metric. We then show how these networks can be modified so that they do obtain bi-Lipschitz guarantees. Finally, we provide initial experiments showing the advantage of the proposed bi-Lipschitz model over standard invariant models, for the tasks of finding correspondences between 3D point clouds.

Keywords

Cite

@article{arxiv.2511.11735,
  title  = {Toward bilipshiz geometric models},
  author = {Yonatan Sverdlov and Eitan Rosen and Nadav Dym},
  journal= {arXiv preprint arXiv:2511.11735},
  year   = {2025}
}
R2 v1 2026-07-01T07:38:12.505Z