AbstractIn this paper we consider for the classical airfoil equation a collocation method based on Jacobi polynomials. The error is estimated in suitable nonstandard Sobolev norms which are defined in such a way to respect the singularity structure of the exact solution. Furthermore, our numerical experiments underline our optimal theoretical error estimates
AbstractRecently, Galerkin and collocation methods have been analysed for some nonlinear boundary in...
Abstract. We obtain non-symmetric upper and lower bounds on the rate of convergence of general monot...
AbstractIn this paper we consider new error estimates under the weighted Chebyshev norm for Galerkin...
AbstractIn this paper we consider for the classical airfoil equation a collocation method based on J...
AbstractIn this paper we establish the L2 convergence of a polynomial collocation method for the sol...
We extend a collocation method for solving a nonlinear ordinar...
We will present some numerical schemes for some non classical Hamilton-Jacobi equations. We will con...
AbstractA collocation method for a first-kind integral equation with a hypersingular kernel on an in...
Abstract. We discuss an a-posteriori error estimate for the numerical solution of boundary value pro...
Previous work identified the kind of Jocobi polynomials suitable to solve boundary value problems of...
Abstract. We discuss an a-posteriori error estimate for the numerical solution of boundary value pro...
Abstract. We discuss an a-posteriori error estimate for the numerical solution of boundary value pro...
Previous work identified the kind of Jocobi polynomials suitable to solve boundary value problems of...
This thesis investigates the polynomial collocation method for the numerical solution of Cauchy type...
In this paper we propose a suitable combination of two collocation methods based on the zeros of Jac...
AbstractRecently, Galerkin and collocation methods have been analysed for some nonlinear boundary in...
Abstract. We obtain non-symmetric upper and lower bounds on the rate of convergence of general monot...
AbstractIn this paper we consider new error estimates under the weighted Chebyshev norm for Galerkin...
AbstractIn this paper we consider for the classical airfoil equation a collocation method based on J...
AbstractIn this paper we establish the L2 convergence of a polynomial collocation method for the sol...
We extend a collocation method for solving a nonlinear ordinar...
We will present some numerical schemes for some non classical Hamilton-Jacobi equations. We will con...
AbstractA collocation method for a first-kind integral equation with a hypersingular kernel on an in...
Abstract. We discuss an a-posteriori error estimate for the numerical solution of boundary value pro...
Previous work identified the kind of Jocobi polynomials suitable to solve boundary value problems of...
Abstract. We discuss an a-posteriori error estimate for the numerical solution of boundary value pro...
Abstract. We discuss an a-posteriori error estimate for the numerical solution of boundary value pro...
Previous work identified the kind of Jocobi polynomials suitable to solve boundary value problems of...
This thesis investigates the polynomial collocation method for the numerical solution of Cauchy type...
In this paper we propose a suitable combination of two collocation methods based on the zeros of Jac...
AbstractRecently, Galerkin and collocation methods have been analysed for some nonlinear boundary in...
Abstract. We obtain non-symmetric upper and lower bounds on the rate of convergence of general monot...
AbstractIn this paper we consider new error estimates under the weighted Chebyshev norm for Galerkin...
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