English

Compressive sensing and truncated moment problems on spheres

Optimization and Control 2017-10-27 v1

Abstract

We propose convex optimization algorithms to recover a good approximation of a point measure μ\mu on the unit sphere SRnS\subseteq \mathbb{R}^n from its moments with respect to a set of real-valued functions f1,,fmf_1,\dots, f_m. Given a finite subset CSC\subseteq S the algorithm produces a measure μ\mu^* supported on CC and we prove that μ\mu^* is a good approximation to μ\mu whenever the functions f1,,fmf_1,\dots, f_m are a sufficiently large random sample of independent Kostlan-Shub-Smale polynomials. More specifically, we give sufficient conditions for the validity of the equality μ=μ\mu=\mu^* when μ\mu is supported on CC and prove that μ\mu^* is close to the best approximation to μ\mu supported on CC provided that all points in the support of μ\mu are close to CC.

Keywords

Cite

@article{arxiv.1710.09496,
  title  = {Compressive sensing and truncated moment problems on spheres},
  author = {Hernán García and Camilo Hernández and Mauricio Junca and Mauricio Velasco},
  journal= {arXiv preprint arXiv:1710.09496},
  year   = {2017}
}
R2 v1 2026-06-22T22:26:01.030Z