AbstractA solution of linear operator equations in the Hilbert space is constructed by using the best polynomial approximation of the inverse operator. This approach gives rise to certain iteration processes. Error estimates manifest that the suggested schemes may be fairly efficient
Dedicated to the centenary of S. I. Zuchovitsky. Abstract. We consider the equation Au = f, where A ...
Based upon an external approximation scheme for the underlying Banach space, a nonlinear operator eq...
AbstractThe algorithm determines a non-iteration procedure for computing the optimal solution of a l...
AbstractA solution of linear operator equations in the Hilbert space is constructed by using the bes...
.The authors consider the numerical solution of Ax=f, where A is a bounded invertible linear operato...
This volume presents a unified approach to constructing iterative methods for solving irregular oper...
. In this paper we present a method for solving problems Af = g by constructing an approximative inv...
A quadratically convergent algorithm, based upon a Newton-type iteration, is defined to approximate ...
This thesis is concerned with the solution of linear operator equations by projection methods known ...
Some perturbation results on relative errors of solutions to singular linear operator equations in H...
AbstractWe study a nonlinear operator equation and obtain a sequence of approximate solutions by ext...
Various notions of the projection method optimality are investigated in the paper aiming at the sear...
PhDMathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue.li...
Certain properties of an unknown element u in a Hilbert space are investigated. For u satisfying cer...
© 2003 Plenum Publishing CorporationIn this paper, we provide a state-of-the-art survey of some rece...
Dedicated to the centenary of S. I. Zuchovitsky. Abstract. We consider the equation Au = f, where A ...
Based upon an external approximation scheme for the underlying Banach space, a nonlinear operator eq...
AbstractThe algorithm determines a non-iteration procedure for computing the optimal solution of a l...
AbstractA solution of linear operator equations in the Hilbert space is constructed by using the bes...
.The authors consider the numerical solution of Ax=f, where A is a bounded invertible linear operato...
This volume presents a unified approach to constructing iterative methods for solving irregular oper...
. In this paper we present a method for solving problems Af = g by constructing an approximative inv...
A quadratically convergent algorithm, based upon a Newton-type iteration, is defined to approximate ...
This thesis is concerned with the solution of linear operator equations by projection methods known ...
Some perturbation results on relative errors of solutions to singular linear operator equations in H...
AbstractWe study a nonlinear operator equation and obtain a sequence of approximate solutions by ext...
Various notions of the projection method optimality are investigated in the paper aiming at the sear...
PhDMathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue.li...
Certain properties of an unknown element u in a Hilbert space are investigated. For u satisfying cer...
© 2003 Plenum Publishing CorporationIn this paper, we provide a state-of-the-art survey of some rece...
Dedicated to the centenary of S. I. Zuchovitsky. Abstract. We consider the equation Au = f, where A ...
Based upon an external approximation scheme for the underlying Banach space, a nonlinear operator eq...
AbstractThe algorithm determines a non-iteration procedure for computing the optimal solution of a l...