The dynamic iteration method with a restricted additive Schwarz splitting is investigated to co-simulate linear differential algebraic equations system coming from RLC electrical circuit with linear components. We show the pure linear convergence or divergence of the method with respect to the linear operator belonging to the restricted additive Schwarz interface. It allows us to accelerate it toward the true solution with the Aitken's technique for accelerating convergence. This provides a dynamic iteration method less sensitive to the splitting. Numerical examples with convergent and divergent splitting show the efficiency of the proposed approach. We also test it on a linear RLC circuit combining different types of circuit modeling (Tran...
The Modified Nodal Analysis leads to differential algebraic equations with properly stated leading t...
Dynamic iteration methods for treating linear systems of differential equations are considered. It i...
We apply dynamical system methods and Melnikov theory to study small amplitude perturbations of some...
The dynamic iteration method with a restricted additive Schwarz splitting is investigated to co-simu...
International audiencePower grid simulation methods need to include more components based on power e...
The network approach to the modelling of complex technical systems results frequently is a set of di...
A new technique for acceleration of convergence of static and dynamic iterations for systems of line...
AbstractWe continue the study of the convergence of dynamic iteration methods by applying them to li...
8 pages, 4 Figures, 1 Table, conferenceInternational audienceIn this paper, a Schwarz heterogeneous ...
International audienceThe Schwarz domain decomposition method [1] is a very attractive numerical met...
La résolution des équations différentielles (EDP/EDO/EDA) est au cœur de la simulation de phénomènes...
An iterative coupling algorithm based on a restricted additive Schwarz domain decomposition is inves...
. In this paper we apply a Galerkin method to solving the system of second-kind Volterra integral eq...
Dynamic iteration (waveform relaxation) is a well approved approach to the numerical solution of cou...
An iterative coupling algorithm based on restricted additive Schwarz domain decomposition is investi...
The Modified Nodal Analysis leads to differential algebraic equations with properly stated leading t...
Dynamic iteration methods for treating linear systems of differential equations are considered. It i...
We apply dynamical system methods and Melnikov theory to study small amplitude perturbations of some...
The dynamic iteration method with a restricted additive Schwarz splitting is investigated to co-simu...
International audiencePower grid simulation methods need to include more components based on power e...
The network approach to the modelling of complex technical systems results frequently is a set of di...
A new technique for acceleration of convergence of static and dynamic iterations for systems of line...
AbstractWe continue the study of the convergence of dynamic iteration methods by applying them to li...
8 pages, 4 Figures, 1 Table, conferenceInternational audienceIn this paper, a Schwarz heterogeneous ...
International audienceThe Schwarz domain decomposition method [1] is a very attractive numerical met...
La résolution des équations différentielles (EDP/EDO/EDA) est au cœur de la simulation de phénomènes...
An iterative coupling algorithm based on a restricted additive Schwarz domain decomposition is inves...
. In this paper we apply a Galerkin method to solving the system of second-kind Volterra integral eq...
Dynamic iteration (waveform relaxation) is a well approved approach to the numerical solution of cou...
An iterative coupling algorithm based on restricted additive Schwarz domain decomposition is investi...
The Modified Nodal Analysis leads to differential algebraic equations with properly stated leading t...
Dynamic iteration methods for treating linear systems of differential equations are considered. It i...
We apply dynamical system methods and Melnikov theory to study small amplitude perturbations of some...