Add to ORKGIn this paper we investigate the attainable order of (global) convergence of collocation approximations in certain polynomial spline spaces for solution of Volterra integrodifferential equations with weakly singular kernels. While the use of quasi-uniform meshes leads, due to the nonsmooth nature of these solutions, to convergence of order less than one, regardless of the degree of the approximating spline function, collocation on suitably graded meshes will be shown to yield optimal convergence rate
We present a comprehensive convergence analysis for discontinuous piecewise polynomial approximation...
AbstractIn this paper we derive m-stage Runge-Kutta-Nyström methods for the numerical solution of ge...
We present a comprehensive convergence analysis for discontinuous piecewise polynomial approximation...
AbstractWe discuss the application of a class of spline collocation methods to a first-order Volterr...
AbstractA collocation method which uses Hermite cubic elements is proposed for the solution of Volte...
The commonly used graded piecewise polynomial collocation method for weakly singular Volterra integr...
The commonly used graded piecewise polynomial collocation method for weakly singular Volterra integr...
Neste trabalho pesquisamos a ordem de convergência atingível da aproximação num certo espaço polinom...
Neste trabalho pesquisamos a ordem de convergência atingível da aproximação num certo espaço polinom...
While the numerical solution of one-dimensional Volterra integral equations of the second kind with ...
A piecewise polynomial collocation method for solving linear weakly singular integro‐differential eq...
On the basis of product integration techniques a discrete version of a piecewise polynomial collocat...
AbstractWe consider the numerical discretization of singularly perturbed Volterra integro-differenti...
AbstractWe discuss the application of a class of spline collocation methods to a first-order Volterr...
Abstract. The discrete superconvergence properties of spline collocation solutions for a certain Vol...
We present a comprehensive convergence analysis for discontinuous piecewise polynomial approximation...
AbstractIn this paper we derive m-stage Runge-Kutta-Nyström methods for the numerical solution of ge...
We present a comprehensive convergence analysis for discontinuous piecewise polynomial approximation...
AbstractWe discuss the application of a class of spline collocation methods to a first-order Volterr...
AbstractA collocation method which uses Hermite cubic elements is proposed for the solution of Volte...
The commonly used graded piecewise polynomial collocation method for weakly singular Volterra integr...
The commonly used graded piecewise polynomial collocation method for weakly singular Volterra integr...
Neste trabalho pesquisamos a ordem de convergência atingível da aproximação num certo espaço polinom...
Neste trabalho pesquisamos a ordem de convergência atingível da aproximação num certo espaço polinom...
While the numerical solution of one-dimensional Volterra integral equations of the second kind with ...
A piecewise polynomial collocation method for solving linear weakly singular integro‐differential eq...
On the basis of product integration techniques a discrete version of a piecewise polynomial collocat...
AbstractWe consider the numerical discretization of singularly perturbed Volterra integro-differenti...
AbstractWe discuss the application of a class of spline collocation methods to a first-order Volterr...
Abstract. The discrete superconvergence properties of spline collocation solutions for a certain Vol...
We present a comprehensive convergence analysis for discontinuous piecewise polynomial approximation...
AbstractIn this paper we derive m-stage Runge-Kutta-Nyström methods for the numerical solution of ge...
We present a comprehensive convergence analysis for discontinuous piecewise polynomial approximation...