International audienceWe consider the linear Schrödinger equation and its discretization by split-step methods where the part corresponding to the Laplace operator is approximated by the midpoint rule. We show that the numerical solution coincides with the exact solution of a modified partial differential equation at each time step. This shows the existence of a modified energy preserved by the numerical scheme. This energy is close to the exact energy if the numerical solution is smooth. As a consequence, we give uniform regularity estimates for the numerical solution over arbitrary long tim
AbstractWe introduce a splitting method for the semilinear Schrödinger equation and prove its conver...
International audienceIn this work, the error behavior of operator splitting methods is analyzed for...
We propose and analyze a Strang splitting method for a cubic semilinear Schrödinger equation with fo...
International audienceWe consider the linear Schrödinger equation and its discretization by split-st...
We consider the linear Schrödinger equation and its discretization by split-step methods where the p...
We consider the linear Schrödinger equation on a one dimensional torus and its time-discretization b...
This article is devoted to the construction of new numerical methods for the semiclassical Schröding...
International audienceThis article is devoted to the construction of numerical methods which remain ...
International audienceIn this paper, we study the linear Schroedinger equation over the d-dimensiona...
We establish improved uniform error bounds for the time-splitting methods for the long-time dynamics...
We explore the applicability of splitting methods involving complex coefficients to solve numericall...
Splitting Methoden sind in der numerischen Analysis von grundlegendem Interesse, da sie die Komplexi...
This thesis provides a numerical analysis of numerical methods for partial differential equations of...
International audienceWe consider a wide class of semi linear Hamiltonian partial differential equa-...
International audienceWe consider {\em discretized} Hamiltonian PDEs associated with a Hamiltonian f...
AbstractWe introduce a splitting method for the semilinear Schrödinger equation and prove its conver...
International audienceIn this work, the error behavior of operator splitting methods is analyzed for...
We propose and analyze a Strang splitting method for a cubic semilinear Schrödinger equation with fo...
International audienceWe consider the linear Schrödinger equation and its discretization by split-st...
We consider the linear Schrödinger equation and its discretization by split-step methods where the p...
We consider the linear Schrödinger equation on a one dimensional torus and its time-discretization b...
This article is devoted to the construction of new numerical methods for the semiclassical Schröding...
International audienceThis article is devoted to the construction of numerical methods which remain ...
International audienceIn this paper, we study the linear Schroedinger equation over the d-dimensiona...
We establish improved uniform error bounds for the time-splitting methods for the long-time dynamics...
We explore the applicability of splitting methods involving complex coefficients to solve numericall...
Splitting Methoden sind in der numerischen Analysis von grundlegendem Interesse, da sie die Komplexi...
This thesis provides a numerical analysis of numerical methods for partial differential equations of...
International audienceWe consider a wide class of semi linear Hamiltonian partial differential equa-...
International audienceWe consider {\em discretized} Hamiltonian PDEs associated with a Hamiltonian f...
AbstractWe introduce a splitting method for the semilinear Schrödinger equation and prove its conver...
International audienceIn this work, the error behavior of operator splitting methods is analyzed for...
We propose and analyze a Strang splitting method for a cubic semilinear Schrödinger equation with fo...