Deautoconvolution in the two-dimensional case

Abstract

There is extensive mathematical literature on the inverse problem of deautoconvolution for a function with support in the unit interval [0,1] ⊂ R, but little is known about the multidimensional situation. This article tries to fill this gap with analytical and numerical studies on the reconstruction of a real function of two real variables over the unit square from observations of its autoconvolution on [0,2]2 ⊂ R2 (full data case) or on [0,1]2 (limited data case). In an L2-setting, twofoldness and uniqueness assertions are proven for the deautoconvolution problem in 2D. Moreover, its ill-posedness is characterized and illustrated. Extensive numerical case studies give an overview of the behaviour of stable approximate solutions to the two-dimensional deautoconvolution problem obtained by Tikhonov-type regularization with different penalties and the iteratively regularized Gauss-Newton method.