Add to ORKGWe consider general semiiterative methods (\textbf{SIMs}) to find approximate solutions of singular linear equations of the type $x = Tx + c$, where $T$ is a bounded linear operator on a complex Banach space $X$ such that its resolvent has a pole of order $\nu_1$ at the point 1. Necessary and sufficient conditions for the convergence of \textbf{SIMs} to a solution of $x = Tx + c$, where $c$ belongs to the subspace range $\mathcal{R}(I - T)^{\nu_1}$ , are established. If $c\notin\mathcal{R}(I - T)^{\nu_1}$ sufficient conditions for the convergence to the Drazin inverse solution are described. For the class of normal operators in a Hilbert space, we analyze the convergence to the minimal norm solution and to the least squares minimal norm sol...
The regularizing equations with a vector parameter of regularization are constructed for the linear ...
AbstractIn this note, we use inexact Newton-like methods to find solutions of nonlinear operator equ...
Regularization methods aimed at finding stable approximate solutions are a necessary tool to tackle ...
Abstract. The paper defines and studies the Drazin inverse for a closed linear operator A in a Banac...
.The authors consider the numerical solution of Ax=f, where A is a bounded invertible linear operato...
Numerous three-step methods of high convergence order have been developed to produce sequences appro...
summary:In this paper is studied the equation $(^*)x=Tx+f$ in a complex Banach space $X$, its orderi...
AbstractIn this paper we develop a semi-iterative method for computing the Drazin-inverse solution o...
Under the new Hölder conditions, we consider the convergence analysis of the inverse-free Jarratt me...
We develop a general convergence analysis for a class of inexact Newton-type regularizations for sta...
AbstractConsider the linear system of equations Bx=ƒ, where B is an NxN singular matrix. In an earli...
summary:The paper defines and studies the Drazin inverse for a closed linear operator $A$ in a Bana...
summary:The weak convergence of the iterative generated by $J(u_{n+1}-u_{n})= \tau (Fu_{n}-Ju_{n})$,...
AbstractIn this report we study the convergence of the midpoint method to a solution of a nonlinear ...
AbstractKrylov subspace methods have been recently considered to solve singular linear systems Ax=b....
The regularizing equations with a vector parameter of regularization are constructed for the linear ...
AbstractIn this note, we use inexact Newton-like methods to find solutions of nonlinear operator equ...
Regularization methods aimed at finding stable approximate solutions are a necessary tool to tackle ...
Abstract. The paper defines and studies the Drazin inverse for a closed linear operator A in a Banac...
.The authors consider the numerical solution of Ax=f, where A is a bounded invertible linear operato...
Numerous three-step methods of high convergence order have been developed to produce sequences appro...
summary:In this paper is studied the equation $(^*)x=Tx+f$ in a complex Banach space $X$, its orderi...
AbstractIn this paper we develop a semi-iterative method for computing the Drazin-inverse solution o...
Under the new Hölder conditions, we consider the convergence analysis of the inverse-free Jarratt me...
We develop a general convergence analysis for a class of inexact Newton-type regularizations for sta...
AbstractConsider the linear system of equations Bx=ƒ, where B is an NxN singular matrix. In an earli...
summary:The paper defines and studies the Drazin inverse for a closed linear operator $A$ in a Bana...
summary:The weak convergence of the iterative generated by $J(u_{n+1}-u_{n})= \tau (Fu_{n}-Ju_{n})$,...
AbstractIn this report we study the convergence of the midpoint method to a solution of a nonlinear ...
AbstractKrylov subspace methods have been recently considered to solve singular linear systems Ax=b....
The regularizing equations with a vector parameter of regularization are constructed for the linear ...
AbstractIn this note, we use inexact Newton-like methods to find solutions of nonlinear operator equ...
Regularization methods aimed at finding stable approximate solutions are a necessary tool to tackle ...