Solving Some Evolution Equations with Mixed Partial Derivatives by Using Laplace Substitution - Variation Iteration Method
Main Article Content
Abstract
The aim of this paper is to investigate the application of integral transform combined with variation iteration method to solve evolution partial differential equations. The combined form of the Laplace substitution and variation iteration method is implemented efficiently in finding the analytical and numerical solutions of nonlinear evolution partial differential equations with mixed partial derivatives. The obtained solutions are compared to the exact solutions and other existing methods. Illustrative examples show the efficiency and the powerful of the used method.
Downloads
Metrics
Article Details
You are free to:
- Share — copy and redistribute the material in any medium or format for any purpose, even commercially.
- Adapt — remix, transform, and build upon the material for any purpose, even commercially.
- The licensor cannot revoke these freedoms as long as you follow the license terms.
Under the following terms:
- Attribution — You must give appropriate credit , provide a link to the license, and indicate if changes were made . You may do so in any reasonable manner, but not in any way that suggests the licensor endorses you or your use.
- No additional restrictions — You may not apply legal terms or technological measures that legally restrict others from doing anything the license permits.
Notices:
You do not have to comply with the license for elements of the material in the public domain or where your use is permitted by an applicable exception or limitation .
No warranties are given. The license may not give you all of the permissions necessary for your intended use. For example, other rights such as publicity, privacy, or moral rights may limit how you use the material.
