Add to ORKGAn iterative method exploiting artificial time iteration is presented and applied to the solution of Fredholm integral equations of the first kind, discretized by a collocation method based on Variation Diminishing Schoenberg (VDS) spline approximations. Convergence theorem of iterative method is provided. The presented iterative method is also used to solve known problems discretized by both classical Galerkin and quadrature methods. More, the choice of the linear discrete regularization operator is discussed within the context of Tikhonov regularization. Numerical results are reported to show the effectiveness of the presented approach
In this paper, we give a semi-local convergence result for an iterative process of Newton-Kantorovic...
We determine the approximation solution of first-order piecewise via polynomial collocation with fir...
AbstractThe Fredholm–Volterra integral equation of the second kind with continuous kernels with resp...
An iterative method exploiting artificial time iteration is presented and applied to the solution of...
An iterative method exploiting artificial time iteration is presented and applied to the solution of...
An iterative method exploiting artificial time iteration is presented and applied to the solution of...
In this paper we use an iterative algorithm for solving Fredholm equations of the first kind. The ba...
AbstractIn this paper, we suggest a convergence analysis for solving Fredholm integral equations of ...
In this paper we use an iterative algorithm for solving Fredholm equations of the first kind. The ba...
AbstractIn this paper, we propose an efficient iteration algorithm for Fredholm integral equations o...
Iterative processes are a powerful tool for providing numerical methods for integral equations of th...
AbstractIn this paper we consider a collocation method for solving Fredholm integral equations of th...
Abstract In this paper, we consider a variant of projected Tikhonov regularization method for solvin...
We determine the approximation solution of first-order piecewise via polynomial collocation with fir...
We determine the approximation solution of first-order piecewise via polynomial collocation with fir...
In this paper, we give a semi-local convergence result for an iterative process of Newton-Kantorovic...
We determine the approximation solution of first-order piecewise via polynomial collocation with fir...
AbstractThe Fredholm–Volterra integral equation of the second kind with continuous kernels with resp...
An iterative method exploiting artificial time iteration is presented and applied to the solution of...
An iterative method exploiting artificial time iteration is presented and applied to the solution of...
An iterative method exploiting artificial time iteration is presented and applied to the solution of...
In this paper we use an iterative algorithm for solving Fredholm equations of the first kind. The ba...
AbstractIn this paper, we suggest a convergence analysis for solving Fredholm integral equations of ...
In this paper we use an iterative algorithm for solving Fredholm equations of the first kind. The ba...
AbstractIn this paper, we propose an efficient iteration algorithm for Fredholm integral equations o...
Iterative processes are a powerful tool for providing numerical methods for integral equations of th...
AbstractIn this paper we consider a collocation method for solving Fredholm integral equations of th...
Abstract In this paper, we consider a variant of projected Tikhonov regularization method for solvin...
We determine the approximation solution of first-order piecewise via polynomial collocation with fir...
We determine the approximation solution of first-order piecewise via polynomial collocation with fir...
In this paper, we give a semi-local convergence result for an iterative process of Newton-Kantorovic...
We determine the approximation solution of first-order piecewise via polynomial collocation with fir...
AbstractThe Fredholm–Volterra integral equation of the second kind with continuous kernels with resp...