In this present work, we have studied new extension of the (G′/G)-expansion method for finding the solitary wave solutions of the modified Korteweg–de Vries (mKdV) equation. It has been shown that the proposed method is effective and can be used for many other nonlinear evolution equations (NLEEs) in mathematical physics. The obtained results show that the method is very powerful and convenient mathematical tool for nonlinear evolution equations in science and engineering
AbstractThe modified simple equation (MSE) method is thriving in finding exact traveling wave soluti...
AbstractA new application of the Exp-function method in combination with the dependent variable tran...
The modified simple equation (MSE) method is thriving in finding exact traveling wave solutions of n...
AbstractIn this present work, we have studied new extension of the (G′/G)-expansion method for findi...
In this article, an enhanced (G′/G)-expansion method is suggested to find the traveling wave solutio...
AbstractIn this article, new extension of the generalized and improved (G′/G)-expansion method is pr...
In this article, new extension of the generalized and improved (G′/G)-expansion method is proposed f...
The Korteweg–de Vries (KDV) equation is one of the most well-known models in nonlinear physics, such...
The Multistep Modified Reduced Differential Transform Method (MMRDTM) is proposed in this paper. It ...
WOS: 000319182800003In this paper, we establish exact solutions for nonlinear evolution equations in...
AbstractThe generalized (G′/G)-expansion method is thriving in finding exact traveling wave solution...
Traveling wave solutions, including localized and periodic structures (e.g., solitary waves, cnoidal...
This paper proposes a new approach of Ǵ/G-expansion method for constructing more general exact solu...
In this paper, we demonstrate the effectiveness of the so-called (G′/G)-expansion method by examinin...
The authors present a straightforward method for finding implicit solutions for nonlinear evolution ...
AbstractThe modified simple equation (MSE) method is thriving in finding exact traveling wave soluti...
AbstractA new application of the Exp-function method in combination with the dependent variable tran...
The modified simple equation (MSE) method is thriving in finding exact traveling wave solutions of n...
AbstractIn this present work, we have studied new extension of the (G′/G)-expansion method for findi...
In this article, an enhanced (G′/G)-expansion method is suggested to find the traveling wave solutio...
AbstractIn this article, new extension of the generalized and improved (G′/G)-expansion method is pr...
In this article, new extension of the generalized and improved (G′/G)-expansion method is proposed f...
The Korteweg–de Vries (KDV) equation is one of the most well-known models in nonlinear physics, such...
The Multistep Modified Reduced Differential Transform Method (MMRDTM) is proposed in this paper. It ...
WOS: 000319182800003In this paper, we establish exact solutions for nonlinear evolution equations in...
AbstractThe generalized (G′/G)-expansion method is thriving in finding exact traveling wave solution...
Traveling wave solutions, including localized and periodic structures (e.g., solitary waves, cnoidal...
This paper proposes a new approach of Ǵ/G-expansion method for constructing more general exact solu...
In this paper, we demonstrate the effectiveness of the so-called (G′/G)-expansion method by examinin...
The authors present a straightforward method for finding implicit solutions for nonlinear evolution ...
AbstractThe modified simple equation (MSE) method is thriving in finding exact traveling wave soluti...
AbstractA new application of the Exp-function method in combination with the dependent variable tran...
The modified simple equation (MSE) method is thriving in finding exact traveling wave solutions of n...