Sajjad Ali scite author profile

This study provides a quantitative analysis of the effects of neglecting the quadratic-gradient term in solving the diffusion equation governing the transient pressure distribution during high pressuregradient injection of compressible liquids in porous media. Mathematical solutions of the twodimensional cylindrical-symmetry nonlinear diffusion equation are derived by using the Laplace transform. A fully penetrating well bore in a homogeneous and isotropic porous medium is considered. The analysis accounts for well bore storage and incorporates a wide range of boundary conditions. Analytical early-and late-time solutions are also presented for some cases. Quantitative deviations from existing linear solutions are related to a dimensionless group, a, which is proportional to the fluid compressibility; the higher the magnitude of a, greater is the deviation of the nonlinear solutions from the linear ones. The linear pressure and rate solutions are generally within 0.5% of the corresponding nonlinear solutions for the constant pressure inner boundary. However, for the constant dischargerate condition, the error may be as high as 10% (within the ranges of a and dimensionless radius and time considered). The error may be even higher for higher injection rates in flow systems with smaller transmissivity. Stehfest, H., Numerical inversion ofLaplace transforms, Commun. ACM, 13(1), 47-49, 1970. Wang, Y., and M. B. Dusseault, The effect of quadratic gradient terms on the borehole solution in poroelastic media, Water

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On stable iterative solutions for a class of boundary value problem of nonlinear fractional order differential equations

Ali

Shah

Jarad

2018

Math Methods in App Sciences

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In this article, sufficient conditions for the existence of extremal solutions to nonlinear boundary value problem (BVP) of fractional order differential equations (FDEs) are provided. By using the method of monotone iterative technique together with upper and lower solutions, conditions for the existence and approximation of minimal and maximal solutions to the BVP under consideration are constructed. Some adequate results for different kinds of Ulam stability are investigated. Maximum error estimates for the corresponding solutions are given as well. Two examples are provided to illustrate the results. KEYWORDS fractional differential equations, monotone iterative technique, Ulam stability, upper and lower solutions extremal solutions Math Meth Appl Sci. 2019;42:969-981.wileyonlinelibrary.com/journal/mma

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Numerical treatment of fractional order Cauchy reaction diffusion equations

Ali

Bushnaq

Shah

et al. 2017

Chaos, Solitons & Fractals

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Sajjad Ali

Computation of solution to fractional order partial reaction diffusion equations

State of the Art Routing Protocols in VANETs: A Review

Analytical solutions for radial pressure distribution including the effects of the quadratic‐gradient term

On stable iterative solutions for a class of boundary value problem of nonlinear fractional order differential equations

Numerical treatment of fractional order Cauchy reaction diffusion equations

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