Browsing by Author "Iqbal, M. Ashik"
Now showing 1 - 2 of 2
- Results Per Page
- Sort Options
Article Citation - WoS: 24Citation - Scopus: 32Advanced Exact Solutions To the Nano-Ionic Currents Equation Through Mts and the Soliton Equation Containing the Rlc Transmission Line(Springer Heidelberg, 2023) Miah, M. Mamun; Iqbal, M. Ashik; Alshehri, Hashim M.; Baleanu, Dumitru; Osman, M. S.; Chowdhury, M. AkherIn this study, the double (G '/G, 1/G)-expansion method is utilized for illustrating the improved explicit integral solutions for the two of nonlinear evolution equations. To expose the importance and convenience of our assumed method, we herein presume two models, namely the nano-ionic currents equation and the soliton equation. The exact solutions are generated with the aid of our proposed method in such a manner that the solutions involve to the rational, trigonometric, and hyperbolic functions for the first presumed nonlinear equation as well as the trigonometric and hyperbolic functions for the second one with meaningful symbols that promote some unique periodic and solitary solutions. The method used here is an extension of the (G '/G)-expansion method to rediscover all known solutions. We offer 2D and 3D charts of the various recovery solutions to better highlight our findings. Finally, we compared our results with those of earlier solutions.Article Citation - WoS: 41Citation - Scopus: 47New Soliton Solutions of the Mzk Equation and the Gerdjikov-Ivanov Equation by Employing the Double (g?/G,1 Method(Elsevier, 2023) Baleanu, Dumitru; Miah, M. Mamun; Ali, H. M. Shahadat; Alshehri, Hashim M.; Osman, M. S.; Iqbal, M. AshikIn the electrical transmission lines, the processing of cable signals distribution, computer networks, high-speed computer databases and discrete networks can be investigated by the modified Zakharov-Kuznetsov (mZK) equation as a data link propagation control model in the study of nonlinear Schro center dot dinger type equations as well as in the analysis of the generalized stationary Gardner equation. The proposed Gerdjikov-Ivanov model can be used in the field of nonlinear optics, weakly nonlinear dispersion water waves, quantum field theory etc. In this work, we developed complete traveling wave solutions with specific t-type, kink type, bell-type, singular solu-tions, and periodic singular solutions to the proposed mZK equation and the Gerdjikov-Ivanov equation with the aid of the double (G '/G,1/G)-expansion method. These settled solutions are very reliable, durable, and authentic which can measure the fluid velocity and fluid density in the electrically conductive fluid and be able to analysis of the flow of current and voltage of long-distance electrical transmission lines too. These traveling wave so-lutions are available in a closed format and make them easy to use. The proposed method is consistent with the abstraction of traveling wave solutions.
