Mohammed Al-Smadi

What is he best known for?

The fields of study he is best known for:

• Mathematical analysis
• Partial differential equation
• Differential equation

Mohammed Al-Smadi spends much of his time researching Reproducing kernel Hilbert space, Mathematical analysis, Series, Iterative method and Applied mathematics. The study incorporates disciplines such as Representer theorem, Boundary value problem, Kernel method and Differential equation in addition to Reproducing kernel Hilbert space. Mohammed Al-Smadi is studying Convergent series, which is a component of Mathematical analysis.

In his study, Numerical stability is strongly linked to Algorithm, which falls under the umbrella field of Series. His Iterative method study integrates concerns from other disciplines, such as Simulated annealing and Dirichlet boundary condition. Applied mathematics is frequently linked to Hilbert space in his study.

His most cited work include:

• Numerical solutions of fuzzy differential equations using reproducing kernel Hilbert space method (246 citations)
• Application of reproducing kernel algorithm for solving second-order, two-point fuzzy boundary value problems (193 citations)
• Atangana-Baleanu fractional approach to the solutions of Bagley-Torvik and Painlevé equations in Hilbert space (103 citations)

What are the main themes of his work throughout his whole career to date?

His primary scientific interests are in Applied mathematics, Mathematical analysis, Fractional calculus, Series and Power series. His Applied mathematics research includes themes of Numerical analysis, Partial differential equation, Hilbert space and Differential equation. His Mathematical analysis research incorporates elements of Representer theorem and Iterative method.

Mohammed Al-Smadi interconnects Range, Algorithm and Series expansion in the investigation of issues within Series. His Power series research integrates issues from Linearization, Residual, Taylor series and Convergent series. The concepts of his Reproducing kernel Hilbert space study are interwoven with issues in Space, Kernel method and Fredholm integral equation.

He most often published in these fields:

• Applied mathematics (58.06%)
• Mathematical analysis (36.56%)
• Fractional calculus (35.48%)

What were the highlights of his more recent work (between 2019-2021)?

• Applied mathematics (58.06%)
• Fractional calculus (35.48%)
• Conformable matrix (9.68%)

In recent papers he was focusing on the following fields of study:

Mohammed Al-Smadi mostly deals with Applied mathematics, Fractional calculus, Conformable matrix, Hilbert space and Sobolev space. In his study, Orthogonal functions and Numerical analysis is inextricably linked to Space, which falls within the broad field of Applied mathematics. His Fractional calculus study deals with Differentiable function intersecting with Banach fixed-point theorem and Lipschitz continuity.

His Hilbert space study frequently links to related topics such as Series. His Series research is multidisciplinary, incorporating elements of Range and Direct sum. His Sobolev space study combines topics from a wide range of disciplines, such as Orthogonalization, Rate of convergence and Fourier series.

Between 2019 and 2021, his most popular works were:

• Fuzzy conformable fractional differential equations: novel extended approach and new numerical solutions (53 citations)
• Atangana-Baleanu fractional framework of reproducing kernel technique in solving fractional population dynamics system (30 citations)
• An adaptive numerical approach for the solutions of fractional advection-diffusion and dispersion equations in singular case under Riesz's derivative operator (25 citations)

In his most recent research, the most cited papers focused on:

• Mathematical analysis
• Partial differential equation
• Differential equation

His primary areas of study are Conformable matrix, Applied mathematics, Fractional calculus, Mathematical analysis and Residual. His Applied mathematics research incorporates themes from Orthogonalization and Reproducing kernel Hilbert space, Hilbert space. His biological study spans a wide range of topics, including Differentiable function and Uniqueness.

His studies deal with areas such as Numerical analysis and Series as well as Hilbert space. His studies in Fractional calculus integrate themes in fields like Computation and Schrödinger equation. Mohammed Al-Smadi does research in Mathematical analysis, focusing on Derivative specifically.

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