On uniqueness and ill-posedness for the deautoconvolution problem in the multi-dimensional case
Abstract
This paper analyzes the inverse problem of deautoconvolution in the multi-dimensional case with respect to solution uniqueness and ill-posedness. Deautoconvolution means here the reconstruction of a real-valued -function with support in the -dimensional unit cube from observations of its autoconvolution either in the full data case (i.e. on ) or in the limited data case (i.e. on ). Based on multi-dimensional variants of the Titchmarsh convolution theorem due to Lions and Mikusi\'{n}ski, we prove in the full data case a twofoldness assertion, and in the limited data case uniqueness of non-negative solutions for which the origin belongs to the support. The latter assumption is also shown to be necessary for any uniqueness statement in the limited data case. A glimpse of rate results for regularized solutions completes the paper.
Cite
@article{arxiv.2212.06534,
title = {On uniqueness and ill-posedness for the deautoconvolution problem in the multi-dimensional case},
author = {Bernd Hofmann and Frank Werner and Yu Deng},
journal= {arXiv preprint arXiv:2212.06534},
year = {2023}
}