New Traveling Wave Solutions and Interesting Bifurcation Phenomena of Generalized KdV-mKdV-Like Equation

Chen, Yiren and Li, Shaoyong and Mirzazadeh, Mohammad (2021) New Traveling Wave Solutions and Interesting Bifurcation Phenomena of Generalized KdV-mKdV-Like Equation. Advances in Mathematical Physics, 2021. pp. 1-6. ISSN 1687-9120

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Abstract

Using the bifurcation method of dynamical systems, we investigate the nonlinear waves and their limit properties for the generalized KdV-mKdV-like equation. We obtain the following results: (i) three types of new explicit expressions of nonlinear waves are obtained. (ii) Under different parameter conditions, we point out these expressions represent different waves, such as the solitary waves, the 1-blow-up waves, and the 2-blow-up waves. (iii) We revealed a kind of new interesting bifurcation phenomenon. The phenomenon is that the 1-blow-up waves can be bifurcated from 2-blow-up waves. Also, we gain other interesting bifurcation phenomena. We also show that our expressions include existing results.

Item Type: Article
Subjects: SCI Archives > Mathematical Science
Depositing User: Managing Editor
Date Deposited: 27 Jan 2023 05:15
Last Modified: 01 Aug 2024 05:04
URI: http://science.classicopenlibrary.com/id/eprint/437

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