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Error estimates of local energy regularization for the logarithmic Schrödinger equation

Weizhu Bao, Rémi Carles, Chunmei Su, Qinglin Tang

2021Mathematical Models and Methods in Applied Sciences18 citationsDOIOpen Access PDF

Abstract

The logarithmic nonlinearity has been used in many partial differential equations (PDEs) for modeling problems in various applications. Due to the singularity of the logarithmic function, it introduces tremendous difficulties in establishing mathematical theories, as well as in designing and analyzing numerical methods for PDEs with such nonlinearity. Here, we take the logarithmic Schrödinger equation (LogSE) as a prototype model. Instead of regularizing [Formula: see text] in the LogSE directly and globally as being done in the literature, we propose a local energy regularization (LER) for the LogSE by first regularizing [Formula: see text] locally near [Formula: see text] with a polynomial approximation in the energy functional of the LogSE and then obtaining an energy regularized logarithmic Schrödinger equation (ERLogSE) via energy variation. Linear convergence is established between the solutions of ERLogSE and LogSE in terms of a small regularization parameter [Formula: see text]. Moreover, the conserved energy of the ERLogSE converges to that of LogSE quadratically, which significantly improves the linear convergence rate of the regularization method in the literature. Error estimates are also presented for solving the ERLogSE by using Lie–Trotter splitting integrators. Numerical results are reported to confirm our error estimates of the LER and of the time-splitting integrators for the ERLogSE. Finally, our results suggest that the LER performs better than regularizing the logarithmic nonlinearity in the LogSE directly.

Topics & Concepts

LogarithmRegularization (linguistics)MathematicsApplied mathematicsRate of convergenceNonlinear systemQuadratic growthMathematical analysisPhysicsComputer scienceChannel (broadcasting)Quantum mechanicsComputer networkArtificial intelligenceNumerical methods for differential equationsAdvanced Mathematical Physics ProblemsCold Atom Physics and Bose-Einstein Condensates