International audienceThe Nyström and degenerate kernel methods, based on projections at Gauss points onto the space of (discontinuous) piecewise polynomials of degree ⩽r-1, for the approximate solution of eigenvalue problems for an integral operator with a smooth kernel, exhibit order 2r. We propose new superconvergent Nyström and degenerate kernel methods that improve this convergence order to 4r for eigenvalue approximation and to 3r for spectral subspace approximation in the case where the kernel is sufficiently smooth. Moreover for a simple eigenvalue, we show that by using an iteration technique, an eigenvector approximation of order 4r can be obtained. The methods introduced here are similar to that studied by Kulkarni in [10] and ex...
Abstract. Consider a model eigenvalue problem with a piecewise constant coefficient. We split the do...
We consider approximation of eigenelements of an integral operator with a smooth kernel by discrete ...
We consider the approximation of the eigenelements of a compact integral operator defined on C[0,1] ...
We propose here a new method based on projections for approximate solution of eigenvalue problems as...
This research received no external funding and APC was funded by University of Granada.The aim of th...
We consider the approximation of eigenfunctions of a compact integral operator with a smooth kernel ...
In this paper we consider two spectral refinement schemes, elementary and double iteration, for the ...
We study approximations of eigenvalue problems for integral operators associated with kernel functio...
AbstractIn this paper, the eigenvalue approximation of a compact integral operator with a smooth ker...
AbstractWe consider the eigenvalue problem of a class of non-compact linear operators given as the s...
We consider the approximation of the eigenelements of a compact integral operator defined on C[0, 1]...
AbstractA new approach to the theory of kernel approximations is developed for the numerical solutio...
We consider approximation of eigenvalues of integral operators with Green's function kernels using t...
First, in this paper, a general theory for the iterated operator approximation is developed. Some of...
Consider a nonlinear operator equation x - K(x) = f, where K is a Urysohn integral operator with a G...
Abstract. Consider a model eigenvalue problem with a piecewise constant coefficient. We split the do...
We consider approximation of eigenelements of an integral operator with a smooth kernel by discrete ...
We consider the approximation of the eigenelements of a compact integral operator defined on C[0,1] ...
We propose here a new method based on projections for approximate solution of eigenvalue problems as...
This research received no external funding and APC was funded by University of Granada.The aim of th...
We consider the approximation of eigenfunctions of a compact integral operator with a smooth kernel ...
In this paper we consider two spectral refinement schemes, elementary and double iteration, for the ...
We study approximations of eigenvalue problems for integral operators associated with kernel functio...
AbstractIn this paper, the eigenvalue approximation of a compact integral operator with a smooth ker...
AbstractWe consider the eigenvalue problem of a class of non-compact linear operators given as the s...
We consider the approximation of the eigenelements of a compact integral operator defined on C[0, 1]...
AbstractA new approach to the theory of kernel approximations is developed for the numerical solutio...
We consider approximation of eigenvalues of integral operators with Green's function kernels using t...
First, in this paper, a general theory for the iterated operator approximation is developed. Some of...
Consider a nonlinear operator equation x - K(x) = f, where K is a Urysohn integral operator with a G...
Abstract. Consider a model eigenvalue problem with a piecewise constant coefficient. We split the do...
We consider approximation of eigenelements of an integral operator with a smooth kernel by discrete ...
We consider the approximation of the eigenelements of a compact integral operator defined on C[0,1] ...