AbstractWe continue the study of the convergence of dynamic iteration methods by applying them to linear DAE systems. We show that convergence rate can be studied by similar means as for ODE's and that it is critical for convergence to preserve the structure of the DAE system when it is split for the iteration
In this note, we prove that dynamic programming value iteration converges uniformly for discrete-tim...
In this paper, we define the general framework to describe the diffusion operators associated to a p...
We provide a unified strategy to show that solutions of dynamic programming principles associated to...
AbstractWe continue the study of the convergence of dynamic iteration methods by applying them to li...
A new technique for acceleration of convergence of static and dynamic iterations for systems of line...
summary:We consider iterative schemes applied to systems of linear ordinary differential equations a...
Recently, a convergence theorem of asynchronous iterations of discrete dynamic systems partitioned i...
A common problem to all applications of linear finite dynamical systems is analyzing the dynamics wi...
Dynamic iteration methods for treating linear systems of differential equations are considered. It i...
We study convergence properties of time-point relaxation (TR) Runge-Kutta methods for linear systems...
The dynamic iteration method with a restricted additive Schwarz splitting is investigated to co-simu...
AbstractWe study convergence properties of time-point relaxation (TR) Runge-Kutta methods for linear...
The network approach to the modelling of complex technical systems results frequently is a set of di...
Dynamic iteration (waveform relaxation) is a well approved approach to the numerical solution of cou...
Considering iterative sequences that arise when the approximate solution to a numerical problem is u...
In this note, we prove that dynamic programming value iteration converges uniformly for discrete-tim...
In this paper, we define the general framework to describe the diffusion operators associated to a p...
We provide a unified strategy to show that solutions of dynamic programming principles associated to...
AbstractWe continue the study of the convergence of dynamic iteration methods by applying them to li...
A new technique for acceleration of convergence of static and dynamic iterations for systems of line...
summary:We consider iterative schemes applied to systems of linear ordinary differential equations a...
Recently, a convergence theorem of asynchronous iterations of discrete dynamic systems partitioned i...
A common problem to all applications of linear finite dynamical systems is analyzing the dynamics wi...
Dynamic iteration methods for treating linear systems of differential equations are considered. It i...
We study convergence properties of time-point relaxation (TR) Runge-Kutta methods for linear systems...
The dynamic iteration method with a restricted additive Schwarz splitting is investigated to co-simu...
AbstractWe study convergence properties of time-point relaxation (TR) Runge-Kutta methods for linear...
The network approach to the modelling of complex technical systems results frequently is a set of di...
Dynamic iteration (waveform relaxation) is a well approved approach to the numerical solution of cou...
Considering iterative sequences that arise when the approximate solution to a numerical problem is u...
In this note, we prove that dynamic programming value iteration converges uniformly for discrete-tim...
In this paper, we define the general framework to describe the diffusion operators associated to a p...
We provide a unified strategy to show that solutions of dynamic programming principles associated to...