Browsing by Author "Nawaz, Sidra"
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Article Citation Count: Javeed, Shumaila...et al. (2020). "Soliton Solutions of Mathematical Physics Models Using the Exponential Function Technique", Symmetry-Basel, Vol. 12, No. 1.Soliton Solutions of Mathematical Physics Models Using the Exponential Function Technique(2020) Javeed, Shumaila; Alimgeer, Khurram Saleem; Nawaz, Sidra; Waheed, Asif; Suleman, Muhammad; Baleanu, Dumitru; Atif, M.; 56389This paper is based on finding the exact solutions for Burger's equation, Zakharov-Kuznetsov (ZK) equation and Kortewegde vries (KdV) equation by utilizing exponential function method that depends on the series of exponential functions. The exponential function method utilizes the homogeneous balancing principle to find the solutions of nonlinear equations. This method is simple, wide-reaching and helpful for finding the exact solution of nonlinear conformable PDEs.Article Citation Count: Javeed, Shumaila...et al. (2021). "Soliton solutions of nonlinear Boussinesq models using the exponential function technique", Physica Scripta, Vol. 96, No. 10.Soliton solutions of nonlinear Boussinesq models using the exponential function technique(2021) Javeed, Shumaila; Baleanu, Dumitru; Nawaz, Sidra; Rezazadeh, Hadi; 56389This paper deals with the new analytical solutions of conformable nonlinear Boussinesq equations. Boussinesq equation is one of the important equation in the field of applied mathematics and engineering, particularly in optical fibers, plasma physics, fluid dynamics, signal processing, and shallow water etc. The focus of this paper is to obtain the new explicit solutions of conformable Boussinesq equations. Exponential function technique is employed to solve the considered models. The conformable properties are utilized to obtain new analytical solutions for this type of nonlinear Boussinesq equations. The new analytical solutions are acquired especially for the space-time boussinesq equation. The results are shown graphically. The obtained solutions can be useful for engineers and physicists to further analyze the phenomena. The implemented technique is valuable for finding new analytical solutions of nonlinear partial differential equations (PDEs).