Share:


Finite‐difference scheme for one problem of nonlinear optics

    Ingrida Laukaityte Affiliation
    ; Raimondas Čiegis Affiliation

Abstract

We consider a mathematical model, which describes Q‐switching process. The finite difference scheme is developed for approximation of the given system of nonlinear PDEs. It is constructed by using the staggered grid, such a strategy enables an automatic linearization of the algorithm. The transport equations are approximated along characteristics z±t, thus no discretization error is introduced at this stage. But such algorithm puts a strong relation between time and space steps of the discrete grid. The convergence analysis of this scheme is done using the method developed in [2]. First some estimates of the boundedness of the exact solution are proved. Then the boundedness of the discrete solution is investigated. On the basis of these estimates the main stability inequality is proved. The second order convergence rate with respect the space and time coordinates follows from this estimate.


First Published Online: 14 Oct 2010

Keyword : finite difference method, nonlinear PDE, nonlinear optics, mathematical modelling

How to Cite
Laukaityte, I., & Čiegis, R. (2008). Finite‐difference scheme for one problem of nonlinear optics. Mathematical Modelling and Analysis, 13(2), 211-222. https://doi.org/10.3846/1392-6292.2008.13.211-222
Published in Issue
Jun 30, 2008
Abstract Views
392
PDF Downloads
235
Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.