Spherical Coordinates from Persistent Cohomology
Abstract
We describe a method to obtain spherical parameterizations of arbitrary data through the use of persistent cohomology and variational optimization. We begin by computing the second-degree persistent cohomology of the filtered Vietoris-Rips (VR) complex of a data set and extract a cocycle from any significant feature. From this cocycle, we define an associated map and use this map as an infeasible initialization for a variational model, which we show has a unique solution (up to rigid motion). We then employ an alternating gradient descent/M\"{o}bius transformation update method to solve the problem and generate a more suitable, i.e., smoother, representative of the homotopy class of , preserving the relevant topological feature. Finally, we conduct numerical experiments on both synthetic and real-world data sets to show the efficacy of our proposed approach.
Cite
@article{arxiv.2209.02791,
title = {Spherical Coordinates from Persistent Cohomology},
author = {Nikolas C. Schonsheck and Stefan C. Schonsheck},
journal= {arXiv preprint arXiv:2209.02791},
year = {2025}
}
Comments
v4. Final version. Published in Journal of Applied and Computational Topology. Code available at https://github.com/niko-schonsheck/SphericalCoordinatesFromPersistentCohomology