In [14], a new method based on projections onto a space of piecewise polynomials of degree <= r - 1 has been shown to give a convergence of order 4r for second-kind integral equations. The size of the system of equations that must be solved, in implementing this method, remains the same as for the Galerkin/collocation method. In this article the solution obtained by the proposed method is shown to have an asymptotic series expansion which remains valid in the discrete version. The Richardson extrapolation can then be used to further improve the order of convergence to 4r + 2
AbstractIn this paper, we study the numerical solution of two-dimensional Fredholm integral equation...
Richardson extrapolation is a methodology for improving the order of accuracy of nu-merical solution...
AbstractThe recursive projection algorithm derived in a previous paper is related to several well-kn...
International audienceIn a recent paper (Allouch, in press) [5] on one dimensional integral equation...
Consider a nonlinear operator equation x - K(x) = f, where K is a Urysohn integral operator with a s...
For a second kind integral equation with a kernel which is less smooth along the diagonal, an approx...
International audienceConsider a nonlinear operator equation x −K(x) = f, where K is a Urysohn integ...
We consider the approximation of the eigenelements of a compact integral operator defined on C[0, 1]...
AbstractIn a recent paper (Allouch, in press) [5] on one dimensional integral equations of the secon...
In this paper we prove the existence of asymptotic expansions of the error of the spline collocation...
AbstractWe consider the numerical solution of second kind Fredholm integral equations in one dimensi...
AbstractIn recent papers, Kumar and Sloan introduced a new collocation-type method for numerical sol...
Richardson extrapolation (RE) is based on a very simple and elegant mathematical idea that has been ...
Over the last 20 years, since the publication of Sloan's paper on the improvement by the iteration t...
Approximate solutions of linear and nonlinear integral equations using methods related to an interpo...
AbstractIn this paper, we study the numerical solution of two-dimensional Fredholm integral equation...
Richardson extrapolation is a methodology for improving the order of accuracy of nu-merical solution...
AbstractThe recursive projection algorithm derived in a previous paper is related to several well-kn...
International audienceIn a recent paper (Allouch, in press) [5] on one dimensional integral equation...
Consider a nonlinear operator equation x - K(x) = f, where K is a Urysohn integral operator with a s...
For a second kind integral equation with a kernel which is less smooth along the diagonal, an approx...
International audienceConsider a nonlinear operator equation x −K(x) = f, where K is a Urysohn integ...
We consider the approximation of the eigenelements of a compact integral operator defined on C[0, 1]...
AbstractIn a recent paper (Allouch, in press) [5] on one dimensional integral equations of the secon...
In this paper we prove the existence of asymptotic expansions of the error of the spline collocation...
AbstractWe consider the numerical solution of second kind Fredholm integral equations in one dimensi...
AbstractIn recent papers, Kumar and Sloan introduced a new collocation-type method for numerical sol...
Richardson extrapolation (RE) is based on a very simple and elegant mathematical idea that has been ...
Over the last 20 years, since the publication of Sloan's paper on the improvement by the iteration t...
Approximate solutions of linear and nonlinear integral equations using methods related to an interpo...
AbstractIn this paper, we study the numerical solution of two-dimensional Fredholm integral equation...
Richardson extrapolation is a methodology for improving the order of accuracy of nu-merical solution...
AbstractThe recursive projection algorithm derived in a previous paper is related to several well-kn...