AbstractIn this paper, we study the numerical solution of two-dimensional Fredholm integral equation by discrete Galerkin and iterated discrete Galerkin method. We are able to derive an asymptotic error expansion of the iterated discrete Galerkin solution. This expansion covers arbitrarily high powers of the discretization parameters if the solution of the integral equation is smooth. The expansion gives rise to Richardson-type extrapolation schemes which rapidly improve the original rate of the convergence. Numerical experiments confirm our theoretical results
The theory of integral equation is one of the major topics of applied mathematics. The main purpose...
In this paper, an expansion method based on Legendre or any orthogonal polynomials is developed to...
AbstractIn recent papers, Kumar and Sloan introduced a new collocation-type method for numerical sol...
AbstractIn this paper, we study the numerical solution of two-dimensional Fredholm integral equation...
AbstractIn this paper, we analyze the existence of asymptotic error expansion of the Nystrom solutio...
AbstractIn this paper, the eigenvalue approximation of a compact integral operator with a smooth ker...
An iterative method exploiting artificial time iteration is presented and applied to the solution of...
To find approximate solutions of Fredholm integral equations, we degenerate the kernels by discrete ...
Over the last 20 years, since the publication of Sloan's paper on the improvement by the iteration t...
AbstractThe Fredholm–Volterra integral equation of the second kind with continuous kernels with resp...
Asymptotic expansions at the node points for approximate solutions of the second kind Fredholm integ...
A novel and efficient numerical method is developed based on interpolating scaling functions to solv...
For a second kind integral equation with a kernel which is less smooth along the diagonal, an approx...
A modified approach to obtain approximate numerical solutions of Fredholin integral equations of the...
AbstractIn this paper, we propose an efficient iteration algorithm for Fredholm integral equations o...
The theory of integral equation is one of the major topics of applied mathematics. The main purpose...
In this paper, an expansion method based on Legendre or any orthogonal polynomials is developed to...
AbstractIn recent papers, Kumar and Sloan introduced a new collocation-type method for numerical sol...
AbstractIn this paper, we study the numerical solution of two-dimensional Fredholm integral equation...
AbstractIn this paper, we analyze the existence of asymptotic error expansion of the Nystrom solutio...
AbstractIn this paper, the eigenvalue approximation of a compact integral operator with a smooth ker...
An iterative method exploiting artificial time iteration is presented and applied to the solution of...
To find approximate solutions of Fredholm integral equations, we degenerate the kernels by discrete ...
Over the last 20 years, since the publication of Sloan's paper on the improvement by the iteration t...
AbstractThe Fredholm–Volterra integral equation of the second kind with continuous kernels with resp...
Asymptotic expansions at the node points for approximate solutions of the second kind Fredholm integ...
A novel and efficient numerical method is developed based on interpolating scaling functions to solv...
For a second kind integral equation with a kernel which is less smooth along the diagonal, an approx...
A modified approach to obtain approximate numerical solutions of Fredholin integral equations of the...
AbstractIn this paper, we propose an efficient iteration algorithm for Fredholm integral equations o...
The theory of integral equation is one of the major topics of applied mathematics. The main purpose...
In this paper, an expansion method based on Legendre or any orthogonal polynomials is developed to...
AbstractIn recent papers, Kumar and Sloan introduced a new collocation-type method for numerical sol...