AbstractLinear Least Squares (LLS) problems are particularly difficult to solve because they are frequently ill-conditioned, and involve large quantities of data. Ill-conditioned LLS problems are commonly seen in mathematics and geosciences, where regularization algorithms are employed to seek optimal solutions. For many problems, even with the use of regularization algorithms it may be impossible to obtain an accurate solution. Riley and Golub suggested an iterative scheme for solving LLS problems. For the early iteration algorithm, it is difficult to improve the well-conditioned perturbed matrix and accelerate the convergence at the same time. Aiming at this problem, self-adaptive iteration algorithm (SAIA) is proposed in this paper for s...
(ABSTRACT) The Sherman Morrison iteration method is developed to solve regularized least squares pro...
AbstractFor the linear-squares problems minx||b−Ax||2, where A is large and sparse, straightforward ...
. In 1980, Han [6] described a finitely terminating algorithm for solving a system Ax b of linear ...
AbstractLinear Least Squares (LLS) problems are particularly difficult to solve because they are fre...
AbstractThree new iterative methods for the solution of the linear least squares problem with bound ...
We present a novel iterative algorithm for approximating the linear least squares solution with low ...
Abstract. An iterative method LSMR is presented for solving linear systems Ax = b and least-squares ...
This paper is concerned with the implementation and testing of an algorithm for solving constrained ...
International audienceIn this paper, we are interested in computing the solution of an overdetermine...
International audienceWe propose new iterative algorithms for solving a system of linear equations, ...
The aim of this paper is to expand the applicability of four iterative methods for solving nonlinear...
Abstract. We consider the weighted least-squares (WLS) problem with a very ill-conditioned weight ma...
This paper presents a new iterative solver for least-squares problems, which is developed based on t...
none4noMany real-world applications are addressed through a linear least-squares problem formulatio...
Linear least squares (LLS) is a classical linear algebra problem in scientific computing, arising fo...
(ABSTRACT) The Sherman Morrison iteration method is developed to solve regularized least squares pro...
AbstractFor the linear-squares problems minx||b−Ax||2, where A is large and sparse, straightforward ...
. In 1980, Han [6] described a finitely terminating algorithm for solving a system Ax b of linear ...
AbstractLinear Least Squares (LLS) problems are particularly difficult to solve because they are fre...
AbstractThree new iterative methods for the solution of the linear least squares problem with bound ...
We present a novel iterative algorithm for approximating the linear least squares solution with low ...
Abstract. An iterative method LSMR is presented for solving linear systems Ax = b and least-squares ...
This paper is concerned with the implementation and testing of an algorithm for solving constrained ...
International audienceIn this paper, we are interested in computing the solution of an overdetermine...
International audienceWe propose new iterative algorithms for solving a system of linear equations, ...
The aim of this paper is to expand the applicability of four iterative methods for solving nonlinear...
Abstract. We consider the weighted least-squares (WLS) problem with a very ill-conditioned weight ma...
This paper presents a new iterative solver for least-squares problems, which is developed based on t...
none4noMany real-world applications are addressed through a linear least-squares problem formulatio...
Linear least squares (LLS) is a classical linear algebra problem in scientific computing, arising fo...
(ABSTRACT) The Sherman Morrison iteration method is developed to solve regularized least squares pro...
AbstractFor the linear-squares problems minx||b−Ax||2, where A is large and sparse, straightforward ...
. In 1980, Han [6] described a finitely terminating algorithm for solving a system Ax b of linear ...