12-η22 regularization for sparse recovery

Abstract

This paper presents a regularization technique incorporating a non-convex and non-smooth term, 12-η22, with parameters 0<η≤ 1 designed to address ill-posed linear problems that yield sparse solutions. We explore the existence, stability, and convergence of the regularized solution, demonstrating that the 12-η22 regularization is well-posed and results in sparse solutions. Under suitable source conditions, we establish a convergence rate of O(δ) in the 2-norm for both a priori and a posteriori parameter choice rules. Additionally, we propose and analyze a numerical algorithm based on a half-variation iterative strategy combined with the proximal gradient method. We prove convergence despite the regularization term being non-smooth and non-convex. The algorithm features a straightforward structure, facilitating implementation. Furthermore, we propose a projected gradient iterative strategy base on surrogate function approach to achieve faster solving. Experimentally, we demonstrate visible improvements of 12-η22 over 1, 1-η2, and other nonconvex regularizations for compressive sensing and image deblurring problems. All the numerical results show the efficiency of our proposed approach.