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Error Estimation of the Relaxation Finite Difference Scheme for the Nonlinear Schrödinger Equation

Georgios E. Zouraris

2023SIAM Journal on Numerical Analysis18 citationsDOI

Abstract

.We consider an initial- and boundary-value problem for the nonlinear Schrödinger equation with homogeneous Dirichlet boundary conditions in the one space dimension case. We discretize the problem in space by a central finite difference method and in time by the Relaxation Scheme proposed by C. Besse [C. R. Acad. Sci. Paris Sér. I Math., 326 (1998), pp. 1427–1432]. We provide optimal order error estimates, in the discrete \(L_t^{\infty }(H_x^1)\)-norm, for the approximation error at the time nodes and at the intermediate time nodes. In the context of the nonlinear Schrödinger equation, this is the first time that the derivation of an error estimate, for a fully discrete method based on the Relaxation Scheme, is completely addressed.KeywordsRelaxation Schemenonlinear Schrödinger equationfinite differencesDirichlet boundary conditionsoptimal order error estimatesMSC codes65M1265M06

Topics & Concepts

MathematicsDiscretizationNonlinear systemRelaxation (psychology)Dirichlet boundary conditionMathematical analysisDimension (graph theory)Norm (philosophy)Boundary value problemFinite differenceFinite difference methodContext (archaeology)Applied mathematicsPure mathematicsQuantum mechanicsPhysicsPsychologyBiologyPaleontologySocial psychologyPolitical scienceLawNumerical methods for differential equationsElectromagnetic Simulation and Numerical MethodsAdvanced Numerical Methods in Computational Mathematics
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