12-η22 sparsity regularization for nonlinear ill-posed problems

Abstract

In this study, we investigate the \|·\|_12-η\|·\|_22 sparsity regularization with 0< η≤ 1, in the context of nonlinear ill-posed inverse problems. We focus on the examination of the well-posedness associated with this regularization approach. Notably, the case where η=1 presents weaker theoretical outcomes than 0< η<1, primarily due to the absence of coercivity and the Radon-Riesz property associated with the regularization term. Under specific conditions pertaining to the nonlinearity of the operator F, we establish that every minimizer of the \|·\|_12-η\|·\|_22 regularization exhibits sparsity. Moreover, for the case where 0<η<1, we demonstrate convergence rates of O(δ1/2) and O(δ) for the regularized solution, concerning a sparse exact solution, under differing yet widely accepted conditions related to the nonlinearity of F. Additionally, we present the iterative half variation algorithm as an effective method for addressing the \|·\|_12-η\|·\|_22 regularization in the domain of nonlinear ill-posed equations. Numerical results provided corroborate the effectiveness of the proposed methodology.