Version 1
: Received: 2 February 2024 / Approved: 2 February 2024 / Online: 2 February 2024 (15:05:12 CET)
How to cite:
Ganie, A. H.; Mallik, S.; Khan, A.; Aziz, R. M.; Ahmad, N.; Ghribi, W.; Badawy, A. S. An Efficient Analytical Approaches to Investigate Nonlinear Two-Dimensional Time-Fractional Rosenau-Hyman Equations within the Yang Transform. Preprints2024, 2024020168. https://doi.org/10.20944/preprints202402.0168.v1
Ganie, A. H.; Mallik, S.; Khan, A.; Aziz, R. M.; Ahmad, N.; Ghribi, W.; Badawy, A. S. An Efficient Analytical Approaches to Investigate Nonlinear Two-Dimensional Time-Fractional Rosenau-Hyman Equations within the Yang Transform. Preprints 2024, 2024020168. https://doi.org/10.20944/preprints202402.0168.v1
Ganie, A. H.; Mallik, S.; Khan, A.; Aziz, R. M.; Ahmad, N.; Ghribi, W.; Badawy, A. S. An Efficient Analytical Approaches to Investigate Nonlinear Two-Dimensional Time-Fractional Rosenau-Hyman Equations within the Yang Transform. Preprints2024, 2024020168. https://doi.org/10.20944/preprints202402.0168.v1
APA Style
Ganie, A. H., Mallik, S., Khan, A., Aziz, R. M., Ahmad, N., Ghribi, W., & Badawy, A. S. (2024). An Efficient Analytical Approaches to Investigate Nonlinear Two-Dimensional Time-Fractional Rosenau-Hyman Equations within the Yang Transform. Preprints. https://doi.org/10.20944/preprints202402.0168.v1
Chicago/Turabian Style
Ganie, A. H., Wade Ghribi and Ahmed Said Badawy. 2024 "An Efficient Analytical Approaches to Investigate Nonlinear Two-Dimensional Time-Fractional Rosenau-Hyman Equations within the Yang Transform" Preprints. https://doi.org/10.20944/preprints202402.0168.v1
Abstract
The goal of the current study is to analyse several nonlinear two-dimensional time-fractional Rosenau Hymanequations. The two-dimensional fractional Rosenau-Hyman equation has extensive use in engineering and applied sciences. The fractional view analysis of two-dimensional time-fractional Rosenau-Hyman equations is discussed using the homotopy perturbation approach, adomian decomposition method, and Yang transformation. Some examples involving two-dimensional time-fractional Rosenau-Hyman equations are provided in order to better understand the suggested approaches. The solutions appear as infinite series. We offer a comparison between the accurate solutions and those that are generated employing the proposed approaches in order to demonstrate the effectiveness and applicability of the proposed techniques. The results are graphically illustrated using 2D and 3D graphs. It has been noted that the obtained results and the targeted problems real solutions are quite similar. Calculated solutions at various fractional levels describe some of the problems useful dynamics. Other fractional problems that arise
in other fields of science and engineering can be solved using a modified version of the current techniques.
Computer Science and Mathematics, Computational Mathematics
Copyright:
This is an open access article distributed under the Creative Commons Attribution License which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.