International audienceIn this study we present a non-overlapping Schwarz waveform relaxation (SWR) method applied to a one dimensional model problem representative of the coupling between the ocean and the atmosphere. This problem includes nonlinear interface conditions analogous to a quadratic friction law. We study the convergence of the corresponding SWR at a semi-discrete level for a linear friction and for a linearized quadratic friction at the interface. Using numerical experiments we show that the convergence properties in the linearized quadratic friction case are very close to the ones obtained with the full nonlinear problem for the range of parameter values of interest. We investigate the possibility to improve the convergence...
We design and study Schwarz Waveform relaxation algorithms for the linear Schrödinger equation with ...
This paper is dedicated to the analysis of the rate of convergence of the classical and quasi-optima...
We are interested in solving heat equations with nonlinear dynamical boundary conditions by using do...
International audienceIn this study we present a non-overlapping Schwarz waveform relaxation (SWR) m...
International audienceIn this paper, we study the problem of two linear reaction-diffusion equations...
International audienceIn this paper we present a global-in-time non-overlapping Schwarz method appli...
International audienceWe present and study an optimized Schwarz Waveform Relaxation algorithm for co...
In this article we study the convergence of the overlapping Schwarz wave form relaxation method for ...
Abstract. We are interested in numerically solving the viscous shallow water equations with a small ...
International audienceIn this paper, we investigate the effect of the space and time discretisation ...
We introduce a non-overlapping variant of the Schwarz waveform relaxation algorithm for semilinear w...
International audienceMany applications in coastal and operational oceanography require high resolut...
Schwarz waveform relaxation algorithms (SWR) are naturally parallel solvers for evolution partial di...
Model coupling is an important present problem in ocean or atmosphere modelling, where regional mode...
International audienceIn this work we are interested in the search of interface conditions to couple...
We design and study Schwarz Waveform relaxation algorithms for the linear Schrödinger equation with ...
This paper is dedicated to the analysis of the rate of convergence of the classical and quasi-optima...
We are interested in solving heat equations with nonlinear dynamical boundary conditions by using do...
International audienceIn this study we present a non-overlapping Schwarz waveform relaxation (SWR) m...
International audienceIn this paper, we study the problem of two linear reaction-diffusion equations...
International audienceIn this paper we present a global-in-time non-overlapping Schwarz method appli...
International audienceWe present and study an optimized Schwarz Waveform Relaxation algorithm for co...
In this article we study the convergence of the overlapping Schwarz wave form relaxation method for ...
Abstract. We are interested in numerically solving the viscous shallow water equations with a small ...
International audienceIn this paper, we investigate the effect of the space and time discretisation ...
We introduce a non-overlapping variant of the Schwarz waveform relaxation algorithm for semilinear w...
International audienceMany applications in coastal and operational oceanography require high resolut...
Schwarz waveform relaxation algorithms (SWR) are naturally parallel solvers for evolution partial di...
Model coupling is an important present problem in ocean or atmosphere modelling, where regional mode...
International audienceIn this work we are interested in the search of interface conditions to couple...
We design and study Schwarz Waveform relaxation algorithms for the linear Schrödinger equation with ...
This paper is dedicated to the analysis of the rate of convergence of the classical and quasi-optima...
We are interested in solving heat equations with nonlinear dynamical boundary conditions by using do...