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Stability analysis of the implicit finite difference schemes for nonlinear Schrödinger equationopen access
- Authors
- Lee, Eunjung; Kim, Dojin
- Issue Date
- 2022
- Publisher
- AIMS Press
- Keywords
- finite difference method; linearization scheme; nonlinear Schrödinger equation; stability
- Citation
- AIMS Mathematics, v.7, no.9, pp 16349 - 16365
- Pages
- 17
- Indexed
- SCIE
SCOPUS
- Journal Title
- AIMS Mathematics
- Volume
- 7
- Number
- 9
- Start Page
- 16349
- End Page
- 16365
- ISSN
- 2473-6988
2473-6988
- Abstract
- This paper analyzes the stability of numerical solutions for a nonlinear Schrödinger equation that is widely used in several applications in quantum physics, optical business, etc. One of the most popular approaches to solving nonlinear problems is the application of a linearization scheme. In this paper, two linearization schemes—Newton and Picard methods were utilized to construct systems of linear equations and finite difference methods. Crank-Nicolson and backward Euler methods were used to establish numerical solutions to the corresponding linearized problems. We investigated the stability of each system when a finite difference discretization is applied, and the convergence of the suggested approximation was evaluated to verify theoretical analysis. © 2022 Author(s), licensee AIMS Press.
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Related Researcher
- Kim, Do Jin
- College of Natural Science (Department of Mathematics)