AbstractTime point relaxation methods based on direct quadrature methods and on Runge-Kutta methods for the numerical solution of Volterra integro-differential systems are proposed. The convergence of the discrete-time iterations is analyzed
AbstractWe study convergence properties of time-point relaxation (TR) Runge-Kutta methods for linear...
AbstractIn this paper the waveform methods for solving systems of second kind Volterra integral equa...
We study convergence properties of time-point relaxation (TR) Runge-Kutta methods for linear systems...
This thesis is concerned with the solution of systems Volterra integro-differential equations by the...
AbstractThe discrete-time relaxation methods based on Volterra-Runge-Kutta methods for solving large...
AbstractA general class of convergent methods for the numerical solution of ordinary differential eq...
AbstractWe investigate convergence, order, and stability properties of time-point relaxation Runge-K...
The authors present a waveform relaxation (WR)method for systems of nonlinear Volterra integral equa...
The authors present a waveform relaxation (WR)method for systems of nonlinear Volterra integral equa...
The authors present a waveform relaxation (WR)method for systems of nonlinear Volterra integral equa...
The aim of our research is the construction of efficient and accurate numerical methods for the solu...
The aim of our research is the construction of efficient and accurate numerical methods for the solu...
The aim of our research is the construction of efficient and accurate numerical methods for the solu...
The aim of our research is the construction of efficient and accurate numerical methods for the solu...
The aim of our research is the construction of efficient and accurate numerical methods for the solu...
AbstractWe study convergence properties of time-point relaxation (TR) Runge-Kutta methods for linear...
AbstractIn this paper the waveform methods for solving systems of second kind Volterra integral equa...
We study convergence properties of time-point relaxation (TR) Runge-Kutta methods for linear systems...
This thesis is concerned with the solution of systems Volterra integro-differential equations by the...
AbstractThe discrete-time relaxation methods based on Volterra-Runge-Kutta methods for solving large...
AbstractA general class of convergent methods for the numerical solution of ordinary differential eq...
AbstractWe investigate convergence, order, and stability properties of time-point relaxation Runge-K...
The authors present a waveform relaxation (WR)method for systems of nonlinear Volterra integral equa...
The authors present a waveform relaxation (WR)method for systems of nonlinear Volterra integral equa...
The authors present a waveform relaxation (WR)method for systems of nonlinear Volterra integral equa...
The aim of our research is the construction of efficient and accurate numerical methods for the solu...
The aim of our research is the construction of efficient and accurate numerical methods for the solu...
The aim of our research is the construction of efficient and accurate numerical methods for the solu...
The aim of our research is the construction of efficient and accurate numerical methods for the solu...
The aim of our research is the construction of efficient and accurate numerical methods for the solu...
AbstractWe study convergence properties of time-point relaxation (TR) Runge-Kutta methods for linear...
AbstractIn this paper the waveform methods for solving systems of second kind Volterra integral equa...
We study convergence properties of time-point relaxation (TR) Runge-Kutta methods for linear systems...
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