Open AccessComparison of Numerical Methods for SWW Equations
Author(s) -
Shkelqim Hajrulla,
Leonard Bezati,
Besiana Hamzallari
Publication year - 2019
Publication title -
international journal of scientific research and management
Language(s) - English
Resource type - Journals
ISSN - 2321-3418
DOI - 10.18535/ijsrm/v7i9.m01
Subject(s) - korteweg–de vries equation , polynomial , laplace transform , decomposition method (queueing theory) , mathematics , nonlinear system , numerical approximation , numerical analysis , decomposition , wave equation , laplace's equation , mathematical analysis , physics , partial differential equation , ecology , discrete mathematics , quantum mechanics , biology
In this paper we consider three methods of approximation for the nonlinear water wave equation. In particular we are interested of KdV equation as a stationary water wave. The first is the method of approximation with a polynomial, the second method is the finite–volume method and the third method is Laplace decomposition method (LDM). A comparison between the methods is mentioned in this article.
We treat the considered methods comparing the obtained solutions with the exact ones. We give in particular the numerical results compared with the analytical results. We show that the used methods are effective and convenient for solving the water wave equations. We can propose and sure that the method of approximation with a polynomial gives accurate results.