Elementary $L^\infty$ error estimates for super-resolution de-noising
Information Theory
2017-02-13 v1 math.IT
Abstract
This paper studies the problem of recovering a discrete complex measure on the torus from a finite number of corrupted Fourier samples. We assume the support of the unknown discrete measure satisfies a minimum separation condition and we use convex regularization methods to recover approximations of the original measure. We focus on two well-known convex regularization methods, and for both, we establish an error estimate that bounds the smoothed-out error in terms of the target resolution and noise level. Our approximation rate is entirely new for one of the methods, and improves upon a previously established estimate for the other. We provide a unified analysis and an elementary proof of the theorem.
Cite
@article{arxiv.1702.03021,
title = {Elementary $L^\infty$ error estimates for super-resolution de-noising},
author = {Weilin Li},
journal= {arXiv preprint arXiv:1702.03021},
year = {2017}
}