The traveling wave solutions of the newly proposed KdV-Burgers-Fisher equation, which is a dispersion-dissipation-reaction model, are investigated with the appropriate parameters. Moreover, in this paper, the new solitary wave solutions of an extended fifth-order model equation are revealed. Using one of the efficient symbolic computations, we obtain the cooperative interactions, such as soliton, anti-soliton, kink, and anti-kink wave solutions, and illustrate the long-time behavior. We believe that the proposed equations with their wave solutions can accelerate the further studies for physical and engineering models combining the different entities, such as dispersion, diffusion, convection, reaction, and nonlinearity
AbstractIn this paper, a direct and unified algorithm for constructing multiple travelling wave solu...
International audienceWe introduce a nonlinear Klein-Gordon lattice model with specific double-well ...
In this work, the extended homogeneous balance method is used to derive exact solutions of nonlinear...
The traveling wave solutions of the newly proposed KdV–Burgers–Fisher equation, which is a dispersio...
M Ali Akbar4 and Md Abdus Salam5 Abstract: Mathematical modeling of many physical systems leads to n...
Abstract In this paper, we develop the nonlinear integrable couplings of Burgers equations with time...
The study of travelling waves or fronts has become an essential part of the mathematical analysis of...
AbstractFirst of all, by using Bernoulli equations, we develop some technical lemmas. Then, we estab...
In this article, we applied two different methods namely as the (1/G′ )-expansion method and the Ber...
We present a review of our recent works directed towards discovery of a periodic, kink-like and soli...
The KdV-Burgers equation, featuring time-varying coefficients is a fundamental equation in the domai...
The work is a continuation of the research begun in previous works of the authors. At present, the t...
This report presents a comprehensive study on a nonlinear partial differentiation equation (PDE) whi...
We propose a general method to find exact travelling and standing wave solutions of reaction-diffusi...
A generalized (2+1)-dimensional variable-coefficient KdV equation is introduced, which can describe ...
AbstractIn this paper, a direct and unified algorithm for constructing multiple travelling wave solu...
International audienceWe introduce a nonlinear Klein-Gordon lattice model with specific double-well ...
In this work, the extended homogeneous balance method is used to derive exact solutions of nonlinear...
The traveling wave solutions of the newly proposed KdV–Burgers–Fisher equation, which is a dispersio...
M Ali Akbar4 and Md Abdus Salam5 Abstract: Mathematical modeling of many physical systems leads to n...
Abstract In this paper, we develop the nonlinear integrable couplings of Burgers equations with time...
The study of travelling waves or fronts has become an essential part of the mathematical analysis of...
AbstractFirst of all, by using Bernoulli equations, we develop some technical lemmas. Then, we estab...
In this article, we applied two different methods namely as the (1/G′ )-expansion method and the Ber...
We present a review of our recent works directed towards discovery of a periodic, kink-like and soli...
The KdV-Burgers equation, featuring time-varying coefficients is a fundamental equation in the domai...
The work is a continuation of the research begun in previous works of the authors. At present, the t...
This report presents a comprehensive study on a nonlinear partial differentiation equation (PDE) whi...
We propose a general method to find exact travelling and standing wave solutions of reaction-diffusi...
A generalized (2+1)-dimensional variable-coefficient KdV equation is introduced, which can describe ...
AbstractIn this paper, a direct and unified algorithm for constructing multiple travelling wave solu...
International audienceWe introduce a nonlinear Klein-Gordon lattice model with specific double-well ...
In this work, the extended homogeneous balance method is used to derive exact solutions of nonlinear...