We consider approximation of eigenvalues of integral operators with Green's function kernels using the Nystrom method and the iterated collocation method and obtain asymptotic expansions for approximate eigenvalues. We show that the Richardson extrapolation is applicable to find eigenvalue approximations of higher order and illustrate our results by numerical examples
Graduation date: 1973In this thesis we examine the approximation theory of the\ud eigenvalue problem...
Consider a nonlinear operator equation x - K(x) = f , where K is a Urysohn integral operator with a ...
The asymptotic formulas with large values of parameter for solutions of singular differential equati...
AbstractIn this paper, the eigenvalue approximation of a compact integral operator with a smooth ker...
We consider the approximation of the eigenelements of a compact integral operator defined on C[0, 1]...
Asymptotic expansions at the node points for approximate solutions of the second kind Fredholm integ...
We consider approximation of a nonlinear Hammerstein equation with a kernel of the type of Green's f...
We study approximations of eigenvalue problems for integral operators associated with kernel functio...
We consider the approximation of the eigenelements of a compact integral operator defined on C[0,1] ...
We consider the approximation of eigenfunctions of a compact integral operator with a smooth kernel ...
We consider approximation of eigenelements of an integral operator with a smooth kernel by discrete ...
In this paper, polynomially based projection and modified projection methods for approximating the s...
We propose here a new method based on projections for approximate solution of eigenvalue problems as...
International audienceThe Nyström and degenerate kernel methods, based on projections at Gauss point...
In this paper, we give some examples regarding the numbers and approximate values of eigenvalues of ...
Graduation date: 1973In this thesis we examine the approximation theory of the\ud eigenvalue problem...
Consider a nonlinear operator equation x - K(x) = f , where K is a Urysohn integral operator with a ...
The asymptotic formulas with large values of parameter for solutions of singular differential equati...
AbstractIn this paper, the eigenvalue approximation of a compact integral operator with a smooth ker...
We consider the approximation of the eigenelements of a compact integral operator defined on C[0, 1]...
Asymptotic expansions at the node points for approximate solutions of the second kind Fredholm integ...
We consider approximation of a nonlinear Hammerstein equation with a kernel of the type of Green's f...
We study approximations of eigenvalue problems for integral operators associated with kernel functio...
We consider the approximation of the eigenelements of a compact integral operator defined on C[0,1] ...
We consider the approximation of eigenfunctions of a compact integral operator with a smooth kernel ...
We consider approximation of eigenelements of an integral operator with a smooth kernel by discrete ...
In this paper, polynomially based projection and modified projection methods for approximating the s...
We propose here a new method based on projections for approximate solution of eigenvalue problems as...
International audienceThe Nyström and degenerate kernel methods, based on projections at Gauss point...
In this paper, we give some examples regarding the numbers and approximate values of eigenvalues of ...
Graduation date: 1973In this thesis we examine the approximation theory of the\ud eigenvalue problem...
Consider a nonlinear operator equation x - K(x) = f , where K is a Urysohn integral operator with a ...
The asymptotic formulas with large values of parameter for solutions of singular differential equati...
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