In this paper, we study the (1+1)-dimensional dispersive long wave equations which describe the evolution of horizontal velocity component u(x,t) of water waves of height v(x,t), and solved it numerically by successive approximation method (SAM) to compare with Adomian’s decomposition method (ADM), we found that SAM is suitable for this kind of problems also its effective and more accure than ADM. Mathematica has been used for computations.
2017-08
الاطاريح
2017
بعض الطرائق العددية لحل معادلة (1+1)-Dimensional Dispersive Long Wave Equations
The main object of this thesis is to solve (1+1)-Dimensional
Dispersive Long Wave Equations numerically, which play
important roles in nonlinear physics, that describe the evolution of
horizontal velocity component of water waves of height
propagating in both directions in an infinite narrow channel of
finite constant depth. We used Successive approximation method,
Modified successive approximation method, Variational iteration
method, Homotopy perturbation method, Variational homotopy
perturbation method and Homotopy analysis method. Mathematica
software has been used for computations.
2025
العروض التقديمية
University of Zakho
2022-04
An Introduction to the Mathematical Tools Used in Digital Image Processing
About Some Mathematical Tools Used in Digital Image Processing
2022
الدورات التدريبية
2021-09-01,2021-10-15
English language Proficiency Course with intermediate Level
In University of Duhok, Center of Languages
2021
2021-02-01,2021-03-11
English language Proficiency Course with Pre-intermediate Level
