Multiple Soliton Solutions of the Sawada-Kotera Equation with a Nonvanishing Boundary Condition and the Perturbed Korteweg de Vries Equation by Using the Multiple Exp-Function Scheme

Abdullahi Rashid Adem; Mohammad Mirzazadeh; Qin Zhou; Kamyar Hosseini

doi:10.1155/2019/3175213

Advances in Mathematical Physics (Jan 2019)

Multiple Soliton Solutions of the Sawada-Kotera Equation with a Nonvanishing Boundary Condition and the Perturbed Korteweg de Vries Equation by Using the Multiple Exp-Function Scheme

Abdullahi Rashid Adem,
Mohammad Mirzazadeh,
Qin Zhou,
Kamyar Hosseini

Affiliations

Abdullahi Rashid Adem: Department of Mathematical Sciences, North-West University, Private Bag X 2046, Mmabatho 2735, South Africa
Mohammad Mirzazadeh: Department of Engineering Sciences, Faculty of Technology and Engineering, East of Guilan, University of Guilan, Rudsar 44891-63157, Iran
Qin Zhou: School of Electronics and Information Engineering, Wuhan Donghu University, Wuhan 430212, China
Kamyar Hosseini: Department of Mathematics, Rasht Branch, Islamic Azad University, Rasht, Iran

DOI: https://doi.org/10.1155/2019/3175213
Journal volume & issue: Vol. 2019

Abstract

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The Sawada-Kotera equation with a nonvanishing boundary condition, which models the evolution of steeper waves of shorter wavelength than those depicted by the Korteweg de Vries equation, is analyzed and also the perturbed Korteweg de Vries (pKdV) equation. For this goal, a capable method known as the multiple exp-function scheme (MEFS) is formally utilized to derive the multiple soliton solutions of the models. The MEFS as a generalization of Hirota’s perturbation method actually suggests a systematic technique to handle nonlinear evolution equations (NLEEs).

Published in Advances in Mathematical Physics

ISSN: 1687-9120 (Print); 1687-9139 (Online)
Publisher: Wiley
Country of publisher: United Kingdom
LCC subjects: Science: Physics
Website: https://onlinelibrary.wiley.com/journal/3197

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