Publication:
A model of solitary waves in a nonlinear elastic circular rod: Abundant different type exact solutions and conservation laws

No Thumbnail Available

Date

2021-02-01

Authors

Çelik, Nisa
Seadawy, Aly R.
Özkan, Yeşim Sağlam
Yaşar, Emrullah

Journal Title

Journal ISSN

Volume Title

Publisher

Pergamon-Elsevier

Research Projects

Organizational Units

Journal Issue

Abstract

In this study, we have dealt with a wave equation containing 4th order nonlinear mixed derivative. This model corresponds to solitary waves in nonlinear elastic circular rod. One dimensional optimal systems corresponding to Lie symmetry generator sub-algebras, symmetry reductions, and group invariant solutions corresponding to these systems have been systematically produced by Lie symmetry analysis of this model. In addition, traveling wave solutions were obtained with the help of an useful integration scheme of the model. These solutions are structures with physical properties of hyperbolic, trigonometric and rational solution types. Numerical simulations of the obtained solutions for different values of the parameters were made. The stability property of the obtained solutions is tested to show the ability of obtained solutions. In addition, the local conservation laws of the model were obtained with the help of the multiplier homotopy method.

Description

Keywords

Nonlinear elastic circular rod, Exact solutions, Conservation laws, Physics

Citation

1

Views

0

Downloads

Search on Google Scholar