Indian Journal of Science and Technology
DOI: 10.17485/ijst/2019/v12i33/146529
Year: 2019, Volume: 12, Issue: 33, Pages: 1-6
Original Article
Muhammad Afzal Soomro1* and J. Hussain2
1Department of Mathematics and Statistics, Quaid-E-Awam University of Engineering, Science and Technology Nawabshah, Sindh, Pakistan; [email protected]
2Department of Mathematics, Sukkur IBA University, Pakistan; [email protected]
*Author for correspondence
Muhammad Afzal Soomro
Department of Mathematics and Statistics, Quaid-E-Awam University of Engineering, Science and Technology Nawabshah, Sindh, Pakistan; [email protected]
Objectives: The object of the work is essentially to examine the generalization of NovikovPartial Differential Equations through differential transform algorithm. This work also shows that the method can allow us to construct explicit solutions highly nonlinear equations. We have also plotted the constructed solutions. Methods: We have constructed the approximate solutions of mentioned equation using a relatively new algorithm, known as reduced differential transform algorithm. Findings: It turns out that our solutions agree with the abstract findings known in key papers that we followed. Applications: Generalization of Novikov Partial Differential Equations models several physical phenomena such as shallow water flow, dynamics of enzymes in the human cells etc.
Keywords: Nonlinear Equations, Novikov Partial Differential Equations, Partial Differential Equations (PDE)
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