English

Error analysis for denoising smooth modulo signals on a graph

Statistics Theory 2021-12-06 v2 Machine Learning Statistics Theory

Abstract

In many applications, we are given access to noisy modulo samples of a smooth function with the goal being to robustly unwrap the samples, i.e., to estimate the original samples of the function. In a recent work, Cucuringu and Tyagi proposed denoising the modulo samples by first representing them on the unit complex circle and then solving a smoothness regularized least squares problem -- the smoothness measured w.r.t the Laplacian of a suitable proximity graph GG -- on the product manifold of unit circles. This problem is a quadratically constrained quadratic program (QCQP) which is nonconvex, hence they proposed solving its sphere-relaxation leading to a trust region subproblem (TRS). In terms of theoretical guarantees, 2\ell_2 error bounds were derived for (TRS). These bounds are however weak in general and do not really demonstrate the denoising performed by (TRS). In this work, we analyse the (TRS) as well as an unconstrained relaxation of (QCQP). For both these estimators we provide a refined analysis in the setting of Gaussian noise and derive noise regimes where they provably denoise the modulo observations w.r.t the 2\ell_2 norm. The analysis is performed in a general setting where GG is any connected graph.

Keywords

Cite

@article{arxiv.2009.04859,
  title  = {Error analysis for denoising smooth modulo signals on a graph},
  author = {Hemant Tyagi},
  journal= {arXiv preprint arXiv:2009.04859},
  year   = {2021}
}

Comments

36 pages, 2 figures. Added Section 5 (Simulations) and made minor changes as per reviewers comments

R2 v1 2026-06-23T18:26:40.906Z