Hina Hina’s research while affiliated with Women University Swabi and other places

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Publications (3)


2D charts displaying the precise and OAFM solution ϕα,β of the problem.
2D charts displaying the precise and OAFM solution θα,β of the problem.
Effect of η on the solution for OAFM to the problem.
Effect of ω on the solution for OAFM to the problem.
3D charts displaying the precise and OAFM solution ϕα,β of the problem.

+3

Utilizing the Optimal Auxiliary Function Method for the Approximation of a Nonlinear Long Wave System considering Caputo Fractional Order
  • Article
  • Full-text available

May 2024

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25 Reads

Aaqib Iqbal

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Rashid Nawaz

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Hina Hina

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[...]

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In this article, we explore the utilization of the Caputo derivative and the Riemann–Liouville (R–L) fractional integral to analyze the optimal auxiliary function method for approximating fractional nonlinear long waves. Approximate long wave equation with a distinct dispersion relation offers the most accurate description of shallow water wave properties. Various methods, including the Adomian decomposition technique, the variational iteration method, the optimum homotopy asymptotic method, and the new iterative technique, have been employed and compared to those obtained using the fractional-order approximate long wave equation. The results of our study indicate that the optimal auxiliary function method is highly successful and practically simple, achieving better and more rapid convergence after just one repetition. This method is recognized as an efficient approach, demonstrating high precision in solving intriguing and intricate problems. Furthermore, it proves to be more time and resource efficient than other relevant analytical techniques, leading to significant savings in both volume and time. Compared to the Adomian decomposition technique, the new iterative technique, the variational iteration method, and the optimum homotopy asymptotic method, the suggested technique is extremely accurate computationally. It is also easy to analyze and solve fractionally linked nonlinear complex phenomena that arise in science and technology. We present the numerical and graphical findings that support these conclusions.

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Mathematical modeling of cholera dynamics with intrinsic growth considering constant interventions

February 2024

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166 Reads

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4 Citations

A mathematical model that describes the dynamics of bacterium vibrio cholera within a fixed population considering intrinsic bacteria growth, therapeutic treatment, sanitation and vaccination rates is developed. The developed mathematical model is validated against real cholera data. A sensitivity analysis of some of the model parameters is also conducted. The intervention rates are found to be very important parameters in reducing the values of the basic reproduction number. The existence and stability of equilibrium solutions to the mathematical model are also carried out using analytical methods. The effect of some model parameters on the stability of equilibrium solutions, number of infected individuals, number of susceptible individuals and bacteria density is rigorously analyzed. One very important finding of this research work is that keeping the vaccination rate fixed and varying the treatment and sanitation rates provide a rapid decline of infection. The fourth order Runge–Kutta numerical scheme is implemented in MATLAB to generate the numerical solutions.


Extension of optimal auxiliary function method to non-linear fifth order lax and Swada-Kotera problem

November 2023

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54 Reads

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1 Citation

Alexandria Engineering Journal

In this article, a semi-analytical approach known as the optimal auxiliary function method is extended to the approximate solution of non-linear partial differential equations. The fifth-order lax and swada-kotera equations are taken as test examples. Utilizing the well-known least squares method, the optimal convergence control parameter values in the auxiliary function have been determined. The outcomes of the proposed method are contrasted with those of a new iterative approach and a homotopy perturbation method. It has been demonstrated that the suggested method for solving non-linear partial differential equations is straightforward and rapidly convergent. The numerical outcomes demonstrate the effectiveness and reliability of the suggested approach. Additionally, using higher-order approximations can increase the suggested method's accuracy.

Citations (2)


... Stability analysis is crucial in cholera modeling as it determines the long-term behavior of the system. It also helps evaluate the impact of interventions such as treatment, vaccination, and sanitation (Bertuzzo et al. 2021;Brhane et al. 2024). Global stability analysis expands on this by assessing the robustness of control strategies across various demographic and epidemiological settings (Eisenberg et al. 2013). ...

Reference:

Modeling cholera transmission dynamics and implications for public health interventions
Mathematical modeling of cholera dynamics with intrinsic growth considering constant interventions

... Te versatility of fractional calculus is evident in its applications across diverse felds such as bioengineering, rheology, viscoelasticity, acoustics, optics, robotics, control theory, chemical and statistical physics, and electrical and mechanical engineering [5][6][7][8]. One may even claim that fractional-order systems in general explain real-world occurrences. ...

Extension of optimal auxiliary function method to non-linear fifth order lax and Swada-Kotera problem
  • Citing Article
  • November 2023

Alexandria Engineering Journal