AbstractWe give sharp error estimates for both function and derivative when the coefficients and right hand side of a given initial or boundary value problem for ordinary differential equations are replaced by local approximations. These estimates are given for partition points and also continuously on subintervals. Numerical examples demonstrate the accuracy of our estimates
An analysis is given of the global error due to local discretization errors. This is based on estima...
The present paper studies the sharpness of error bounds obtained for approximate solutions of initia...
summary:A numerical method for the solution of a second order boundary value problem for differentia...
AbstractHigh order error estimates are obtained for both function and derivative when the coefficien...
PhD ThesisThis thesis is concerned with an error analysis of approximate methods for second order l...
AbstractThe error estimate of an approximate solution to a nonlinear ordinary differential equations...
PhD ThesisThis thesis is mainly concerned with an error analysis of numerical methods for two poi...
AbstractThe midpoint difference method applied to boundary value problems for functional differentia...
AbstractWe give sharp error estimations for the local truncation error of polynomial methods for the...
The method of analytic continuation has been used to obtain numerical solutions of nonlinear initial...
AbstractIt is investigated how the solutions of a discretized ODE can be related to solutions of the...
summary:This paper presents a class of numerical methods for approximate solution of systems of ordi...
AbstractIn this paper two-point boundary value problems for systems of second-order differential equ...
It is the purpose of this paper to discuss some aspects of approximation theory in the context of th...
AbstractThis paper is concerned with error estimates for the numerical solution of linear ordinary d...
An analysis is given of the global error due to local discretization errors. This is based on estima...
The present paper studies the sharpness of error bounds obtained for approximate solutions of initia...
summary:A numerical method for the solution of a second order boundary value problem for differentia...
AbstractHigh order error estimates are obtained for both function and derivative when the coefficien...
PhD ThesisThis thesis is concerned with an error analysis of approximate methods for second order l...
AbstractThe error estimate of an approximate solution to a nonlinear ordinary differential equations...
PhD ThesisThis thesis is mainly concerned with an error analysis of numerical methods for two poi...
AbstractThe midpoint difference method applied to boundary value problems for functional differentia...
AbstractWe give sharp error estimations for the local truncation error of polynomial methods for the...
The method of analytic continuation has been used to obtain numerical solutions of nonlinear initial...
AbstractIt is investigated how the solutions of a discretized ODE can be related to solutions of the...
summary:This paper presents a class of numerical methods for approximate solution of systems of ordi...
AbstractIn this paper two-point boundary value problems for systems of second-order differential equ...
It is the purpose of this paper to discuss some aspects of approximation theory in the context of th...
AbstractThis paper is concerned with error estimates for the numerical solution of linear ordinary d...
An analysis is given of the global error due to local discretization errors. This is based on estima...
The present paper studies the sharpness of error bounds obtained for approximate solutions of initia...
summary:A numerical method for the solution of a second order boundary value problem for differentia...