Least-squares solution of overdetermined inconsistent linear systems using kaczmarz's relaxation

Abstract

For numerical computation of the minimal Euclidean norm (least-squares) solution of overdetermined linear systems, usually direct solvers are used (like QR decomposition, see [4]). The iterative methods for such kind of problems need special assumptions about the system (consistency, full rank of the system matrix, some parameters they use or they give not the minimal length solution, [2,3,5,8,10,13]). In the present paper we purpose two iterative algorithms which generate sequences convergent to the minimal Euclidean length solution in the general case (inconsistent system and rank deficient matrix). The algorithms use only some combinations and properties of the well-known Kaczmarz iterative method ([13]) and need no special assumptions about the system.