Regularization Techniques for Linear Least-Squares Problems

Suliman, Mohamed Abdalla Elhag

04 1900

Linear estimation is a fundamental branch of signal processing that deals with estimating the values of parameters from a corrupted measured data. Throughout the years, several optimization criteria have been used to achieve this task. The most astonishing attempt among theses is the linear least-squares. Although this criterion enjoyed a wide popularity in many areas due to its attractive properties, it appeared to suffer from some shortcomings. Alternative optimization criteria, as a result, have been proposed. These new criteria allowed, in one way or another, the incorporation of further prior information to the desired problem. Among theses alternative criteria is the regularized least-squares (RLS). In this thesis, we propose two new algorithms to find the regularization parameter for linear least-squares problems. In the constrained perturbation regularization algorithm (COPRA) for random matrices and COPRA for linear discrete ill-posed problems, an artificial perturbation matrix with a bounded norm is forced into the model matrix. This perturbation is introduced to enhance the singular value structure of the matrix. As a result, the new modified model is expected to provide a better stabilize substantial solution when used to estimate the original signal through minimizing the worst-case residual error function. Unlike many other regularization algorithms that go in search of minimizing the estimated data error, the two new proposed algorithms are developed mainly to select the artifcial perturbation bound and the regularization parameter in a way that approximately minimizes the mean-squared error (MSE) between the original signal and its estimate under various conditions. The first proposed COPRA method is developed mainly to estimate the regularization parameter when the measurement matrix is complex Gaussian, with centered unit variance (standard), and independent and identically distributed (i.i.d.) entries. Furthermore, the second proposed COPRA method deals with discrete ill-posed problems when the singular values of the linear transformation matrix are decaying very fast to a significantly small value. For the both proposed algorithms, the regularization parameter is obtained as a solution of a non-linear characteristic equation. We provide a details study for the general properties of these functions and address the existence and uniqueness of the root. To demonstrate the performance of the derivations, the first proposed COPRA method is applied to estimate different signals with various characteristics, while the second proposed COPRA method is applied to a large set of different real-world discrete ill-posed problems. Simulation results demonstrate that the two proposed methods outperform a set of benchmark regularization algorithms in most cases. In addition, the algorithms are also shown to have the lowest run time.

Linear estimation

mean-squared error

regularized linear least-squares

Random matrix theory

discrete ill-posed problems

Arnoldi-type Methods for the Solution of Linear Discrete Ill-posed Problems

Onisk, Lucas William

11 October 2022

No description available.

Applied Mathematics

Inverse problems

Discrete ill-posed problems

Iterated Tikhonov regularization

Spectral equivalence

GMRES

block GMRES

Discrepancy principle

Arnoldi process

Image deblurring

Iterative tensor factorization based on Krylov subspace-type methods with applications to image processing

UGWU, UGOCHUKWU OBINNA

06 October 2021

No description available.

Applied Mathematics

Inverse problems

Iterative tensor decomposition

Krylov subspaces

Image and video processing

Truncated iterations

Tensor Arnoldi process

Tensor Golub-Kahan bidiagonalization

Tensor Lanczos process

tensor SVD

Randomized tensor SVD

t-product

Invertible linear transform