Browsing by Author "Aslam, Muhammad"
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Article Citation Count: Sarfraz, Naqash; Aslam, Muhammad; Jarad, Fahd (2021). "Boundedness for Commutators of Rough p-Adic Hardy Operator on p-Adic Central Morrey Spaces", Journal of Function Spaces, Vol. 2021.Boundedness for Commutators of Rough p-Adic Hardy Operator on p-Adic Central Morrey Spaces(2021) Sarfraz, Naqash; Aslam, Muhammad; Jarad, Fahd; 234808In the present article we obtain the boundedness for commutators of rough p-adic Hardy operator on p-adic central Morrey spaces. Furthermore, we also acquire the boundedness of rough p-adic Hardy operator on Lebesgue spaces.Article Citation Count: Hussain, Amjad...et al. (2021). "Commutators of the Fractional Hardy Operator on Weighted Variable Herz-Morrey Spaces", Journal of Function Spaces, Vol. 2021.Commutators of the Fractional Hardy Operator on Weighted Variable Herz-Morrey Spaces(2021) Hussain, Amjad; Asim, Muhammad; Aslam, Muhammad; Jarad, Fahd; 234808In the present paper, our aim is to establish the boundedness of commutators of the fractional Hardy operator and its adjoint operator on weighted Herz-Morrey spaces with variable exponents MKp,q⋅α⋅,λw.Article Citation Count: Sarfraz, Naqash;...et.al. (2022). "Estimates for p-adic fractional integral operator and its commutators on p-adic Morrey–Herz spaces", Journal of Inequalities and Applications, No.92.Estimates for p-adic fractional integral operator and its commutators on p-adic Morrey–Herz spaces(2022) Sarfraz, Naqash; Aslam, Muhammad; Zaman, Mir; Jarad, Fahd; 234808This research investigates the boundedness of a p-adic fractional integral operator on p-adic Morrey–Herz spaces. In particular, p-adic central bounded mean oscillations and Lipschitz estimate for commutators of the p-adic fractional integral operator are provided as well.Article Citation Count: Farman, Muhammad;...et.al. (2022). "On Solutions of the Stiff Differential Equations in Chemistry Kinetics With Fractal-Fractional Derivatives", Journal of Computational and Nonlinear Dynamics, Vol.17, No.7.On Solutions of the Stiff Differential Equations in Chemistry Kinetics With Fractal-Fractional Derivatives(2022) Farman, Muhammad; Aslam, Muhammad; Akgül, Ali; Jarad, Fahd; 234808In this paper, we consider the stiff systems of ordinary differential equations arising from chemistry kinetics. We develop the fractional order model for chemistry kinetics problems by using the new fractal operator such as fractal fractional and Atangana-Toufik scheme. Recently a deep concept of fractional differentiation with nonlocal and nonsingular kernel was introduced to extend the limitations of the conventional Riemann–Liouville and Caputo fractional derivatives. Many scientific results are presented in the paper and also prove these results by effective numerical results. These concepts are very important to use for real-life problems like Brine tank cascade, Recycled Brine tank cascade, pond pollution, home heating, and biomass transfer problem. These results are very important for solving the nonlinear model in chemistry kinetics which will be helpful to understand the chemical reactions and their actual behavior; also the observation can be developed for future kinematic chemical reactions with the help of these results.
